Package evaluation to test StructuralIdentifiability on Julia 1.14.0-DEV.2212 (062a90bc8c*) started at 2026-05-22T01:18:01.724 ################################################################################ # Set-up # Installing PkgEval dependencies (TestEnv)... Activating project at `~/.julia/environments/v1.14` Set-up completed after 15.45s ################################################################################ # Installation # Installing StructuralIdentifiability... Resolving package versions... Updating `~/.julia/environments/v1.14/Project.toml` [220ca800] + StructuralIdentifiability v0.5.21 Updating `~/.julia/environments/v1.14/Manifest.toml` ⌅ [c3fe647b] + AbstractAlgebra v0.48.6 [a9b6321e] + Atomix v1.1.3 [861a8166] + Combinatorics v1.1.0 [864edb3b] + DataStructures v0.19.4 [e2ba6199] + ExprTools v0.1.10 [0b43b601] + Groebner v0.10.3 [18e54dd8] + IntegerMathUtils v0.1.3 [c8e1da08] + IterTools v1.10.0 [692b3bcd] + JLLWrappers v1.8.0 [1914dd2f] + MacroTools v0.5.16 ⌅ [2edaba10] + Nemo v0.54.2 [bac558e1] + OrderedCollections v1.8.1 [3e851597] + ParamPunPam v0.5.7 [aea7be01] + PrecompileTools v1.3.4 [21216c6a] + Preferences v1.5.2 [27ebfcd6] + Primes v0.5.7 [92933f4c] + ProgressMeter v1.11.0 [fb686558] + RandomExtensions v0.4.4 [73480bc8] + RationalFunctionFields v0.3.1 [220ca800] + StructuralIdentifiability v0.5.21 [a759f4b9] + TimerOutputs v0.5.29 [013be700] + UnsafeAtomics v0.3.1 ⌅ [e134572f] + FLINT_jll v301.400.1+0 [656ef2d0] + OpenBLAS32_jll v0.3.33+1 [56f22d72] + Artifacts v1.11.0 [ade2ca70] + Dates v1.11.0 [8ba89e20] + Distributed v1.11.0 [8f399da3] + Libdl v1.11.0 [37e2e46d] + LinearAlgebra v1.13.0 [56ddb016] + Logging v1.11.0 [de0858da] + Printf v1.11.0 [9a3f8284] + Random v1.11.0 [ea8e919c] + SHA v1.13.0 [9e88b42a] + Serialization v1.11.0 [6462fe0b] + Sockets v1.11.0 [2f01184e] + SparseArrays v1.13.0 [fa267f1f] + TOML v1.0.3 [4ec0a83e] + Unicode v1.11.0 [e66e0078] + CompilerSupportLibraries_jll v1.5.1+0 [781609d7] + GMP_jll v6.3.0+2 [3a97d323] + MPFR_jll v4.2.2+0 [4536629a] + OpenBLAS_jll v0.3.33+0 [bea87d4a] + SuiteSparse_jll v7.10.1+0 [8e850b90] + libblastrampoline_jll v5.15.0+0 Info Packages marked with ⌅ have new versions available but compatibility constraints restrict them from upgrading. To see why use `status --outdated -m` Installation completed after 5.93s ################################################################################ # Precompilation # Precompiling PkgEval dependencies... Precompiling package dependencies... Precompiling project... 33.1 s ✓ Nemo 138.4 s ✓ Groebner 14.9 s ✓ ParamPunPam 15.2 s ✓ RationalFunctionFields 16.1 s ✓ StructuralIdentifiability 5 dependencies successfully precompiled in 220 seconds. 72 already precompiled. Precompilation completed after 244.93s ################################################################################ # Testing # Testing StructuralIdentifiability Status `/tmp/jl_33SFWW/Project.toml` ⌅ [c3fe647b] AbstractAlgebra v0.48.6 [4c88cf16] Aqua v0.8.14 [2a0fbf3d] CPUSummary v0.2.7 [861a8166] Combinatorics v1.1.0 [864edb3b] DataStructures v0.19.4 [0b43b601] Groebner v0.10.3 [c8e1da08] IterTools v1.10.0 [1914dd2f] MacroTools v0.5.16 ⌅ [2edaba10] Nemo v0.54.2 [3e851597] ParamPunPam v0.5.7 [aea7be01] PrecompileTools v1.3.4 [27ebfcd6] Primes v0.5.7 [73480bc8] RationalFunctionFields v0.3.1 [276daf66] SpecialFunctions v2.7.2 [220ca800] StructuralIdentifiability v0.5.21 ⌅ [98d24dd4] TestSetExtensions v3.0.0 [a759f4b9] TimerOutputs v0.5.29 [ade2ca70] Dates v1.11.0 [37e2e46d] LinearAlgebra v1.13.0 [56ddb016] Logging v1.11.0 [44cfe95a] Pkg v1.14.0 [9a3f8284] Random v1.11.0 [8dfed614] Test v1.11.0 Status `/tmp/jl_33SFWW/Manifest.toml` ⌅ [c3fe647b] AbstractAlgebra v0.48.6 [4c88cf16] Aqua v0.8.14 [a9b6321e] Atomix v1.1.3 [2a0fbf3d] CPUSummary v0.2.7 [861a8166] Combinatorics v1.1.0 [f70d9fcc] CommonWorldInvalidations v1.0.0 [34da2185] Compat v4.18.1 [adafc99b] CpuId v0.3.1 [864edb3b] DataStructures v0.19.4 [ab62b9b5] DeepDiffs v1.2.0 [ffbed154] DocStringExtensions v0.9.5 [e2ba6199] ExprTools v0.1.10 [0b43b601] Groebner v0.10.3 [615f187c] IfElse v0.1.1 [18e54dd8] IntegerMathUtils v0.1.3 [92d709cd] IrrationalConstants v0.2.6 [c8e1da08] IterTools v1.10.0 [692b3bcd] JLLWrappers v1.8.0 [2ab3a3ac] LogExpFunctions v0.3.29 [1914dd2f] MacroTools v0.5.16 ⌅ [2edaba10] Nemo v0.54.2 [bac558e1] OrderedCollections v1.8.1 [3e851597] ParamPunPam v0.5.7 [aea7be01] PrecompileTools v1.3.4 [21216c6a] Preferences v1.5.2 [27ebfcd6] Primes v0.5.7 [92933f4c] ProgressMeter v1.11.0 [fb686558] RandomExtensions v0.4.4 [73480bc8] RationalFunctionFields v0.3.1 [431bcebd] SciMLPublic v1.0.1 [276daf66] SpecialFunctions v2.7.2 [aedffcd0] Static v1.4.0 [220ca800] StructuralIdentifiability v0.5.21 ⌅ [98d24dd4] TestSetExtensions v3.0.0 [a759f4b9] TimerOutputs v0.5.29 [013be700] UnsafeAtomics v0.3.1 ⌅ [e134572f] FLINT_jll v301.400.1+0 [656ef2d0] OpenBLAS32_jll v0.3.33+1 [efe28fd5] OpenSpecFun_jll v0.5.6+0 [0dad84c5] ArgTools v1.1.2 [56f22d72] Artifacts v1.11.0 [2a0f44e3] Base64 v1.11.0 [ade2ca70] Dates v1.11.0 [8ba89e20] Distributed v1.11.0 [f43a241f] Downloads v1.7.0 [7b1f6079] FileWatching v1.11.0 [b77e0a4c] InteractiveUtils v1.11.0 [ac6e5ff7] JuliaSyntaxHighlighting v1.13.0 [b27032c2] LibCURL v1.0.0 [76f85450] LibGit2 v1.11.0 [8f399da3] Libdl v1.11.0 [37e2e46d] LinearAlgebra v1.13.0 [56ddb016] Logging v1.11.0 [d6f4376e] Markdown v1.11.0 [ca575930] NetworkOptions v1.3.0 [44cfe95a] Pkg v1.14.0 [de0858da] Printf v1.11.0 [9a3f8284] Random v1.11.0 [ea8e919c] SHA v1.13.0 [9e88b42a] Serialization v1.11.0 [6462fe0b] Sockets v1.11.0 [2f01184e] SparseArrays v1.13.0 [f489334b] StyledStrings v1.13.0 [fa267f1f] TOML v1.0.3 [a4e569a6] Tar v1.10.0 [8dfed614] Test v1.11.0 [cf7118a7] UUIDs v1.11.0 [4ec0a83e] Unicode v1.11.0 [e66e0078] CompilerSupportLibraries_jll v1.5.1+0 [781609d7] GMP_jll v6.3.0+2 [deac9b47] LibCURL_jll v8.20.0+1 [e37daf67] LibGit2_jll v1.9.3+0 [29816b5a] LibSSH2_jll v1.11.101+0 [3a97d323] MPFR_jll v4.2.2+0 [14a3606d] MozillaCACerts_jll v2026.5.14 [4536629a] OpenBLAS_jll v0.3.33+0 [05823500] OpenLibm_jll v0.8.7+0 [458c3c95] OpenSSL_jll v3.5.6+0 [efcefdf7] PCRE2_jll v10.47.0+0 [bea87d4a] SuiteSparse_jll v7.10.1+0 [83775a58] Zlib_jll v1.3.2+0 [3161d3a3] Zstd_jll v1.5.7+1 [8e850b90] libblastrampoline_jll v5.15.0+0 [8e850ede] nghttp2_jll v1.69.0+0 [3f19e933] p7zip_jll v17.8.0+0 Info Packages marked with ⌅ have new versions available but compatibility constraints restrict them from upgrading. Testing Running tests... Resolving package versions... Installed StateSelection ───── v1.9.3 Installed FindFirstFunctions ─ v2.1.0 Installed ModelingToolkit ──── v11.26.5 Updating `/tmp/jl_33SFWW/Project.toml` ⌅ [861a8166] ↓ Combinatorics v1.1.0 ⇒ v1.0.2 [loaded: v1.1.0] [961ee093] + ModelingToolkit v11.26.5 Updating `/tmp/jl_33SFWW/Manifest.toml` [47edcb42] + ADTypes v1.22.0 [6e696c72] + AbstractPlutoDingetjes v1.4.0 [1520ce14] + AbstractTrees v0.4.5 [7d9f7c33] + Accessors v0.1.44 [79e6a3ab] + Adapt v4.6.0 [ec485272] + ArnoldiMethod v0.4.0 [4fba245c] + ArrayInterface v7.25.0 [4c555306] + ArrayLayouts v1.12.2 [aae01518] + BandedMatrices v1.11.0 [e2ed5e7c] + Bijections v0.2.2 [caf10ac8] + BipartiteGraphs v0.1.7 [8e7c35d0] + BlockArrays v1.9.3 [70df07ce] + BracketingNonlinearSolve v1.12.1 ⌅ [861a8166] ↓ Combinatorics v1.1.0 ⇒ v1.0.2 [loaded: v1.1.0] [38540f10] + CommonSolve v0.2.6 [bbf7d656] + CommonSubexpressions v0.3.1 [b152e2b5] + CompositeTypes v0.1.4 [a33af91c] + CompositionsBase v0.1.2 [2569d6c7] + ConcreteStructs v0.2.4 [187b0558] + ConstructionBase v1.6.0 [85a47980] + Dictionaries v0.4.6 [2b5f629d] + DiffEqBase v7.5.1 [459566f4] + DiffEqCallbacks v4.17.0 [163ba53b] + DiffResults v1.1.0 [b552c78f] + DiffRules v1.15.1 [a0c0ee7d] + DifferentiationInterface v0.7.18 ⌅ [5b8099bc] + DomainSets v0.7.18 [7c1d4256] + DynamicPolynomials v0.6.6 [4e289a0a] + EnumX v1.0.7 [f151be2c] + EnzymeCore v0.8.20 [55351af7] + ExproniconLite v0.10.14 [7034ab61] + FastBroadcast v1.3.2 [9aa1b823] + FastClosures v0.3.2 [a4df4552] + FastPower v1.3.1 [1a297f60] + FillArrays v1.16.0 [64ca27bc] + FindFirstFunctions v2.1.0 [6a86dc24] + FiniteDiff v2.31.0 [f6369f11] + ForwardDiff v1.3.3 [a85aefff] + FunctionMaps v0.1.2 [069b7b12] + FunctionWrappers v1.1.3 [77dc65aa] + FunctionWrappersWrappers v1.9.0 [46192b85] + GPUArraysCore v0.2.0 [86223c79] + Graphs v1.14.0 [3263718b] + ImplicitDiscreteSolve v2.1.0 [313cdc1a] + Indexing v1.1.1 [d25df0c9] + Inflate v0.1.5 [8197267c] + IntervalSets v0.7.14 [3587e190] + InverseFunctions v0.1.17 [82899510] + IteratorInterfaceExtensions v1.0.0 [ae98c720] + Jieko v0.2.1 [ccbc3e58] + JumpProcesses v9.28.0 [ba0b0d4f] + Krylov v0.10.6 [87fe0de2] + LineSearch v0.1.9 [7ed4a6bd] + LinearSolve v3.81.0 [e6f89c97] + LoggingExtras v1.2.0 [bb5d69b7] + MaybeInplace v0.1.4 [961ee093] + ModelingToolkit v11.26.5 [7771a370] + ModelingToolkitBase v1.37.0 [6bb917b9] + ModelingToolkitTearing v1.13.5 [2e0e35c7] + Moshi v0.3.7 [46d2c3a1] + MuladdMacro v0.2.4 [102ac46a] + MultivariatePolynomials v0.5.19 [d8a4904e] + MutableArithmetics v1.8.0 [77ba4419] + NaNMath v1.1.3 [be0214bd] + NonlinearSolveBase v2.26.0 [5959db7a] + NonlinearSolveFirstOrder v2.1.1 [6fe1bfb0] + OffsetArrays v1.17.0 [bbf590c4] + OrdinaryDiffEqCore v4.2.1 [e409e4f3] + PoissonRandom v0.4.8 [d236fae5] + PreallocationTools v1.2.0 [988b38a3] + ReadOnlyArrays v0.2.0 [795d4caa] + ReadOnlyDicts v1.0.1 [3cdcf5f2] + RecipesBase v1.3.4 [731186ca] + RecursiveArrayTools v4.3.0 [189a3867] + Reexport v1.2.2 [7e49a35a] + RuntimeGeneratedFunctions v0.5.19 [9dfe8606] + SCCNonlinearSolve v1.13.0 [1bc83da4] + SafeTestsets v0.1.0 [0bca4576] + SciMLBase v3.14.0 [19f34311] + SciMLJacobianOperators v0.1.13 [a6db7da4] + SciMLLogging v2.0.0 [c0aeaf25] + SciMLOperators v1.21.0 [53ae85a6] + SciMLStructures v1.10.0 [efcf1570] + Setfield v1.1.2 [727e6d20] + SimpleNonlinearSolve v2.11.1 [699a6c99] + SimpleTraits v0.9.6 [0c0c59c1] + StarAlgebras v0.3.0 [64909d44] + StateSelection v1.9.3 [90137ffa] + StaticArrays v1.9.18 [1e83bf80] + StaticArraysCore v1.4.4 [10745b16] + Statistics v1.11.1 [2efcf032] + SymbolicIndexingInterface v0.3.48 [19f23fe9] + SymbolicLimits v1.1.0 [d1185830] + SymbolicUtils v4.31.0 [0c5d862f] + Symbolics v7.24.2 [ed4db957] + TaskLocalValues v0.1.3 [8ea1fca8] + TermInterface v2.0.0 [781d530d] + TruncatedStacktraces v1.4.0 [3a884ed6] + UnPack v1.0.2 [d30d5f5c] + WeakCacheSets v0.1.0 [1d5cc7b8] + IntelOpenMP_jll v2025.2.0+0 [856f044c] + MKL_jll v2025.2.0+0 [1317d2d5] + oneTBB_jll v2022.3.0+0 [9fa8497b] + Future v1.11.0 [4af54fe1] + LazyArtifacts v1.11.0 [3fa0cd96] + REPL v1.11.0 Info Packages marked with ⌅ have new versions available but compatibility constraints restrict them from upgrading. To see why use `status --outdated -m` Updating `/tmp/jl_33SFWW/Project.toml` [0c5d862f] + Symbolics v7.24.2 Manifest No packages added to or removed from `/tmp/jl_33SFWW/Manifest.toml` [ Info: Testing started [ Info: Summary of the model: [ Info: State variables: x1, x2 [ Info: Parameters: a, b, c, d [ Info: Inputs: [ Info: Outputs: y1 [ Info: Summary of the model: [ Info: State variables: S, I, W, R [ Info: Parameters: a, bi, bw, gam, k, mu, xi [ Info: Inputs: [ Info: Outputs: y [ Info: Summary of the model: [ Info: State variables: S, I, W, R [ Info: Parameters: a, bi, bw, gam, k, mu, xi [ Info: Inputs: [ Info: Outputs: y, y2 [ Info: Summary of the model: [ Info: State variables: x0, x1, x2, x3 [ Info: Parameters: a1, a2, b1, b2, ka, kc, n [ Info: Inputs: [ Info: Outputs: y1 [ Info: Summary of the model: [ Info: State variables: S, E, A, I, J, C, Ninv [ Info: Parameters: alpha, b, g1, g2, k, q, r [ Info: Inputs: [ Info: Outputs: y, y2 [ Info: Summary of the model: [ Info: State variables: KS00, KS01, KS10, FS01, FS10, FS11, K, F, S00, S01, S10, S11 [ Info: Parameters: a00, a01, a10, alpha01, alpha10, alpha11, b00, b01, b10, beta01, beta10, beta11, c0001, c0010, c0011, c0111, c1011, gamma0100, gamma1000, gamma1100, gamma1101, gamma1110 [ Info: Inputs: [ Info: Outputs: y1, y2, y3, y4, y5 [ Info: Summary of the model: [ Info: State variables: KS00, KS01, KS10, FS01, FS10, FS11, K, F, S00, S01, S10, S11 [ Info: Parameters: a00, a01, a10, alpha01, alpha10, alpha11, b00, b01, b10, beta01, beta10, beta11, c0001, c0010, c0011, c0111, c1011, gamma0100, gamma1000, gamma1100, gamma1101, gamma1110 [ Info: Inputs: [ Info: Outputs: y0, y1, y2, y3, y4 [ Info: Summary of the model: [ Info: State variables: KS00, KS01, KS10, FS01, FS10, FS11, K, F, S00, S01, S10, S11 [ Info: Parameters: a00, a01, a10, alpha01, alpha10, alpha11, b00, b01, b10, beta01, beta10, beta11, c0001, c0010, c0011, c0111, c1011, gamma0100, gamma1000, gamma1100, gamma1101, gamma1110 [ Info: Inputs: [ Info: Outputs: y0, y1, y2, y3, y4, y5 [ Info: Summary of the model: [ Info: State variables: x1, x2, x3, x4 [ Info: Parameters: alpha, b, beta, c, delta, gama, sigma [ Info: Inputs: [ Info: Outputs: y [ Info: Summary of the model: [ Info: State variables: x, y, v, w, z [ Info: Parameters: a, b, beta, c, d, h, k, lm, q, u [ Info: Inputs: [ Info: Outputs: y1, y2 [ Info: Summary of the model: [ Info: State variables: s, i, r, x1, x2 [ Info: Parameters: M, b0, b1, g, mu, nu [ Info: Inputs: [ Info: Outputs: y1, y2 [ Info: Summary of the model: [ Info: State variables: x1, x2, x3, x4, x5, x6 [ Info: Parameters: k1, k2, k3, k4, k5, k6 [ Info: Inputs: [ Info: Outputs: y1, y2 [ Info: Summary of the model: [ Info: State variables: x, y, z, w [ Info: Parameters: a, b, c, d, e, f [ Info: Inputs: [ Info: Outputs: g [ Info: Summary of the model: [ Info: State variables: S, L, In, Q [ Info: Parameters: Ninv, a, b, e, g, s [ Info: Inputs: u [ Info: Outputs: y [ Info: Summary of the model: [ Info: State variables: S, R, W [ Info: Parameters: Dd, T, a, d, dr, e, g, r, rR [ Info: Inputs: [ Info: Outputs: y1, y2 [ Info: Summary of the model: [ Info: State variables: P0, P1, P2, P3, P4, P5 [ Info: Parameters: Ks, M, Mar, alpa, beta, beta_SA, beta_SI, phi, siga1, siga2 [ Info: Inputs: [ Info: Outputs: y [ Info: Summary of the model: [ Info: State variables: EGFR, pEGFR, pEGFR_Akt, Akt, pAkt, S6, pAkt_S6, pS6, EGF_EGFR [ Info: Parameters: EGFR_turnover, a1, a2, a3, reaction_1_k1, reaction_1_k2, reaction_2_k1, reaction_2_k2, reaction_3_k1, reaction_4_k1, reaction_5_k1, reaction_5_k2, reaction_6_k1, reaction_7_k1, reaction_8_k1, reaction_9_k1 [ Info: Inputs: pro_EGFR [ Info: Outputs: y1, y2, y3 [ Info: Summary of the model: [ Info: State variables: x1, x2, x3 [ Info: Parameters: p1, p2, p3, p4 [ Info: Inputs: u [ Info: Outputs: y1 [ Info: Summary of the model: [ Info: State variables: x1, x2, x3, x4 [ Info: Parameters: k01, k12, k13, k14, k21, k31, k41 [ Info: Inputs: u [ Info: Outputs: y1 [ Info: Summary of the model: [ Info: State variables: x1, x2, x3, x4 [ Info: Parameters: b, c, d, k1, k2, q1, q2, s, w1, w2 [ Info: Inputs: [ Info: Outputs: y1, y2 [ Info: Summary of the model: [ Info: State variables: x4, x5, x6, x7 [ Info: Parameters: k10, k5, k6, k7, k8, k9 [ Info: Inputs: [ Info: Outputs: y1, y2 [ Info: Summary of the model: [ Info: State variables: S, In, Tr, N [ Info: Parameters: a, b, d, g, nu [ Info: Inputs: [ Info: Outputs: y1, y2 [ Info: Summary of the model: [ Info: State variables: S, E, I, R, Q [ Info: Parameters: beta, gamma, psi, v [ Info: Inputs: [ Info: Outputs: y1 [ Info: Summary of the model: [ Info: State variables: x1, x2, x3, x4, x5, x6, x7, x8, x9, x10 [ Info: Parameters: t1, t10, t11, t12, t13, t14, t15, t16, t17, t18, t19, t2, t20, t21, t22, t3, t4, t5, t6, t7, t8, t9 [ Info: Inputs: u [ Info: Outputs: y1, y2, y3, y4, y5, y6, y7, y8 [ Info: Summary of the model: [ Info: State variables: A, S, I, R [ Info: Parameters: K, c, gamma, mu, phi [ Info: Inputs: u1 [ Info: Outputs: y1 [ Info: Summary of the model: [ Info: State variables: S, I, R, C, D [ Info: Parameters: N, beta, mu, pp, q, r [ Info: Inputs: [ Info: Outputs: y1, y2, y3 [ Info: Summary of the model: [ Info: State variables: S, I, J, R, U [ Info: Parameters: alpha, beta, eta, xi [ Info: Inputs: [ Info: Outputs: y1 [ Info: Summary of the model: [ Info: State variables: S, I [ Info: Parameters: K, N, beta, gamma [ Info: Inputs: [ Info: Outputs: y1, y2 [ Info: Summary of the model: [ Info: State variables: A, S, E, I [ Info: Parameters: K, N, beta, epsilon, gamma, mu, r [ Info: Inputs: [ Info: Outputs: y1, y2, y3 [ Info: Summary of the model: [ Info: State variables: S, E, I, De, Di, F [ Info: Parameters: N, beta, beta_d, gamma, gamma_d, mu_0, mu_d, mu_i, nu, phi, phi_e, s, s_d [ Info: Inputs: q [ Info: Outputs: y1, y2, y5, y3, y4, y6 [ Info: Summary of the model: [ Info: State variables: x, y, z, w, v [ Info: Parameters: b1, b2, b3, b4, b5, d1, k2, k3, k4, k5, m1, m3, m4, mu2, mu3, mu4, mu5, r1, r2, r3, r4 [ Info: Inputs: [ Info: Outputs: y1 [ Info: Summary of the model: [ Info: State variables: T, L, N, C, I, M [ Info: Parameters: KC, KL, KN, KT, a, alpha1, alpha2, b, beta, c1, f, g, gI, gamma, gt, h, m, muI, p, pI, pt, q, r2, ucte, w [ Info: Inputs: u1, D, u2 [ Info: Outputs: y1, y2, y3 [ Info: Summary of the model: [ Info: State variables: S, E, In, Cu [ Info: Parameters: N, a, b, nu [ Info: Inputs: [ Info: Outputs: y1, y2 [ Info: Summary of the model: [ Info: State variables: S, E, I [ Info: Parameters: N, alpha, beta, lambda [ Info: Inputs: [ Info: Outputs: y1, y2 [ Info: Summary of the model: [ Info: State variables: S, E, U, I [ Info: Parameters: N, beta, d, w, z [ Info: Inputs: [ Info: Outputs: y1 [ Info: Summary of the model: [ Info: State variables: beta, cry, zea, beta10, OHbeta10, betaio, OHbetaio [ Info: Parameters: kOHbeta10, kbeta, kbeta10, kcryOH, kcrybeta, kzea [ Info: Inputs: [ Info: Outputs: y1, y2 [ Info: Summary of the model: [ Info: State variables: mRNA, GFP, enz, mRNAenz [ Info: Parameters: b, d1, d2, d3, kTL [ Info: Inputs: [ Info: Outputs: y1 [ Info: Summary of the model: [ Info: State variables: x1, x2, x3, x4 [ Info: Parameters: p1, p10, p11, p12, p13, p14, p15, p16, p17, p18, p20, p21, p22, p23, p24, p25, p3, p4, p5, p6, p7, p8, p9 [ Info: Inputs: u1 [ Info: Outputs: y1, y2, y3, y4 [ Info: Summary of the model: [ Info: State variables: N, E, S, M, P [ Info: Parameters: delta_EL, delta_LM, delta_NE, mu_EE, mu_LE, mu_LL, mu_M, mu_N, mu_P, mu_PE, mu_PL, rho_E, rho_P [ Info: Inputs: [ Info: Outputs: y1, y2, y3 [ Info: Summary of the model: [ Info: State variables: x1, x2, x3, x4, x5, x6, x7, x8, x9, x10, x11, x12, x13, x14, x15, x16, x17, x18, x19, x20 [ Info: Parameters: km, p1, p10, p11, p12, p13, p14, p15, p16, p17, p18, p19, p2, p20, p3, p4, p5, p6, p7, p8, p9, vm [ Info: Inputs: u [ Info: Outputs: y1, y2, y3, y4, y5, y6, y7, y8, y9, y10, y11, y12, y13, y14, y15, y16, y17, y18, y19, y20 [ Info: Summary of the model: [ Info: State variables: Ca, Cb, T, Tj, Arr [ Info: Parameters: Ca0, DH, E, R, Ta, Th, UA, V, Vh, cp, cph, k0, ro, roh [ Info: Inputs: u1, u2 [ Info: Outputs: y1, y2 [ Info: Summary of the model: [ Info: State variables: q1, q3, q35, q36, q7 [ Info: Parameters: R, S, V3, V36, k3, k4, k5, k6, k7 [ Info: Inputs: u [ Info: Outputs: y1 [ Info: Summary of the model: [ Info: State variables: C, L, B, P, I [ Info: Parameters: ai, alpha, ap, beta, ks, rhob, rhoc, rhoi, rhol, rhop, taob, taoc, taoi, taop [ Info: Inputs: [ Info: Outputs: y1, y2, y3 [ Info: Summary of the model: [ Info: State variables: x1, x2, x3, x4, x5 [ Info: Parameters: k2, k3, k4 [ Info: Inputs: [ Info: Outputs: y1, y2, y3 [ Info: Summary of the model: [ Info: State variables: pi1, pi2, pi3 [ Info: Parameters: A11, A12, A13, A21, A22, A23, A31, A32, A33, B11, B21, B31, g1, g2, g3 [ Info: Inputs: u1 [ Info: Outputs: y1, y2 [ Info: Summary of the model: [ Info: State variables: pi1, pi2, pi3 [ Info: Parameters: A11, A12, A13, A21, A22, A23, A31, A32, A33, B11, B21, B31, g1, g2, g3 [ Info: Inputs: u1 [ Info: Outputs: y1 [ Info: Summary of the model: [ Info: State variables: x1, x2 [ Info: Parameters: beta11, beta12, beta21, beta22, r1, r2 [ Info: Inputs: [ Info: Outputs: y1 [ Info: Summary of the model: [ Info: State variables: x1, x2, x3 [ Info: Parameters: T0, k, k1, k2, k3, k4, r1, r3 [ Info: Inputs: [ Info: Outputs: y1 [ Info: Summary of the model: [ Info: State variables: Sd, Sn, Ad, An, I [ Info: Parameters: ba, bi, delta, ea, es, f, gai, gir, h1, h2 [ Info: Inputs: [ Info: Outputs: y1, y2 [ Info: Summary of the model: [ Info: State variables: S, I, A, Q, J, R [ Info: Parameters: b, d1, d2, d3, d4, d5, d6, ea, ej, eq, g1, g2, k1, k2, l, m1, m2 [ Info: Inputs: [ Info: Outputs: y1, y2 [ Info: Summary of the model: [ Info: State variables: S, E, I [ Info: Parameters: K, L, N, b, e, g, m, r [ Info: Inputs: [ Info: Outputs: y [ Info: Summary of the model: [ Info: State variables: Y2, Y1, Y3, Y4, Z0, Y0, Z1, Z2, Z3, w1, w2, I1, I4 [ Info: Parameters: D0, D1, D2, D3, D4, E0, E1, E2, E3, E4, J1, J2, J3, Tau, f1, m1, m2, m3, n, n1, n2, n3 [ Info: Inputs: [ Info: Outputs: O1, O2, O3, O4, O6, O7, O8, O9, O10 [ Info: Summary of the model: [ Info: State variables: U, I, V, T [ Info: Parameters: beta, c, d_I, k_T, p, r, s_T [ Info: Inputs: [ Info: Outputs: y1, y2 [ Info: Summary of the model: [ Info: State variables: U, I, V, T [ Info: Parameters: beta, c, c_T, d_I, k_T, p, r, s_T [ Info: Inputs: [ Info: Outputs: y1, y2 [ Info: Summary of the model: [ Info: State variables: U, I, V, T [ Info: Parameters: beta, c, d_I, d_T, k_T, p, r, s_T [ Info: Inputs: [ Info: Outputs: y1, y2 [ Info: Summary of the model: [ Info: State variables: U, I, V, T [ Info: Parameters: beta, c, c_T, d_I, d_T, k_T, p, r, s_T [ Info: Inputs: [ Info: Outputs: y1, y2 [ Info: Summary of the model: [ Info: State variables: U, I, V, T [ Info: Parameters: beta, c, d_I, p, r, s_T [ Info: Inputs: [ Info: Outputs: y1, y2 [ Info: Summary of the model: [ Info: State variables: U, I, V, T [ Info: Parameters: beta, c, c_T, d_I, p, r, s_T [ Info: Inputs: [ Info: Outputs: y1, y2 [ Info: Summary of the model: [ Info: State variables: U, I, V, T [ Info: Parameters: beta, c, d_I, d_T, p, r, s_T [ Info: Inputs: [ Info: Outputs: y1, y2 [ Info: Summary of the model: [ Info: State variables: U, I, V, T [ Info: Parameters: beta, c, c_T, d_I, d_T, p, r, s_T [ Info: Inputs: [ Info: Outputs: y1, y2 [ Info: Summary of the model: [ Info: State variables: A, I, H, R, D, E [ Info: Parameters: N, a, c1, c2, d, h, r1, r2, r3, s [ Info: Inputs: [ Info: Outputs: y [ Info: Summary of the model: [ Info: State variables: x1, x2, x3, x4, x5, x6, x7, x8, x9, x10, x11, x12, x13, x14, x15 [ Info: Parameters: a1, a2, a3, c1, c1a, c1c, c2, c2a, c2c, c3, c3a, c3c, c4, c4a, c5, c5a, c6a, e1a, e2a, i1, i1a, k1, k2, k3, k_deg, k_prod, kv, t1, t2 [ Info: Inputs: u [ Info: Outputs: y1, y2, y3, y4, y5, y6 Test Summary: | Total Time Benchmarks are valid | 0 44.9s [ Info: Summary of the model: [ Info: State variables: x1, x2 [ Info: Parameters: a [ Info: Inputs: [ Info: Outputs: y ┌ Warning: New variable c, treating as a scalar parameter └ @ StructuralIdentifiability ~/.julia/packages/StructuralIdentifiability/31snG/src/pb_representation.jl:94 [ Info: Summary of the model: [ Info: State variables: x1, x2, x3 [ Info: Parameters: a [ Info: Inputs: u [ Info: Outputs: y1, y2 [ Info: Summary of the model: [ Info: State variables: a [ Info: Parameters: b [ Info: Inputs: c [ Info: Outputs: y [ Info: Summary of the model: [ Info: State variables: a, b [ Info: Parameters: k1, k2 [ Info: Inputs: c [ Info: Outputs: y [ Info: Summary of the model: [ Info: State variables: x [ Info: Parameters: a [ Info: Inputs: [ Info: Outputs: y [ Info: Summary of the model: [ Info: State variables: x [ Info: Parameters: a [ Info: Inputs: [ Info: Outputs: y1, y2 [ Info: Summary of the model: [ Info: State variables: x, y [ Info: Parameters: a, b [ Info: Inputs: [ Info: Outputs: y1, y2 [ Info: Summary of the model: [ Info: State variables: x, y [ Info: Parameters: a, b [ Info: Inputs: [ Info: Outputs: y1, y2 [ Info: Summary of the model: [ Info: State variables: x, y [ Info: Parameters: a, b [ Info: Inputs: [ Info: Outputs: y1, y2 [ Info: Summary of the model: [ Info: State variables: x, y [ Info: Parameters: a, b [ Info: Inputs: [ Info: Outputs: y1, y2 [ Info: Summary of the model: [ Info: State variables: x [ Info: Parameters: a [ Info: Inputs: u [ Info: Outputs: y 1.629464 seconds (870.83 k allocations: 48.191 MiB, 99.52% compilation time) 0.001786 seconds (7.29 k allocations: 321.914 KiB) 0.002068 seconds (10.77 k allocations: 483.062 KiB) 0.001931 seconds (10.73 k allocations: 477.688 KiB) 0.002934 seconds (14.49 k allocations: 633.031 KiB) 0.001552 seconds (7.93 k allocations: 359.352 KiB) 0.001038 seconds (7.44 k allocations: 299.875 KiB) 16.388035 seconds (5.85 M allocations: 333.671 MiB, 0.77% gc time, 99.82% compilation time) [ Info: Summary of the model: [ Info: State variables: x [ Info: Parameters: a [ Info: Inputs: [ Info: Outputs: y [ Info: Summary of the model: [ Info: State variables: x1, x2 [ Info: Parameters: [ Info: Inputs: u [ Info: Outputs: y 0.342953 seconds (94.12 k allocations: 5.627 MiB, 98.37% compilation time) [ Info: Summary of the model: [ Info: State variables: x1, x2 [ Info: Parameters: [ Info: Inputs: u [ Info: Outputs: y 0.012100 seconds (9.44 k allocations: 509.367 KiB, 90.86% compilation time) [ Info: Summary of the model: [ Info: State variables: x [ Info: Parameters: a, b [ Info: Inputs: u [ Info: Outputs: y [ Info: Summary of the model: [ Info: State variables: x1, x2, x3 [ Info: Parameters: a [ Info: Inputs: u [ Info: Outputs: y1, y2 IOEQS: Dict{QQMPolyRingElem, QQMPolyRingElem}(y2(t)_1 => -a*y2(t)_0 + a*u(t)_0 + y2(t)_1 - u(t)_1, y1(t)_2 => -y1(t)_0 + y1(t)_2) [ Info: Summary of the model: [ Info: State variables: x0, x1 [ Info: Parameters: a01, a12, a21 [ Info: Inputs: [ Info: Outputs: y [ Info: Summary of the model: [ Info: State variables: x1, x2 [ Info: Parameters: [ Info: Inputs: [ Info: Outputs: y [ Info: Summary of the model: [ Info: State variables: x0, x1 [ Info: Parameters: a, b, c, d [ Info: Inputs: u [ Info: Outputs: y [ Info: Summary of the model: [ Info: State variables: S, I, W, R [ Info: Parameters: a, bi, bw, gam, k, mu, xi [ Info: Inputs: [ Info: Outputs: y [ Info: Summary of the model: [ Info: State variables: x1, x2, x3, x4 [ Info: Parameters: alpha, b, beta, c, delta, gama, sigma [ Info: Inputs: [ Info: Outputs: y [ Info: Summary of the model: [ Info: State variables: x1, x2 [ Info: Parameters: b [ Info: Inputs: [ Info: Outputs: y1, y2 [ Info: Summary of the model: [ Info: State variables: x1, x2 [ Info: Parameters: a1, a2, a21 [ Info: Inputs: [ Info: Outputs: y1 [ Info: Summary of the model: [ Info: State variables: x1, x2 [ Info: Parameters: a1, a2, a21 [ Info: Inputs: u [ Info: Outputs: y1 [ Info: Summary of the model: [ Info: State variables: x1, x2, x3 [ Info: Parameters: a01, a12, a13, a21, a31 [ Info: Inputs: u [ Info: Outputs: y [ Info: Summary of the model: [ Info: State variables: S, E, In [ Info: Parameters: N, a, b, nu [ Info: Inputs: [ Info: Outputs: y1, y2 [ Info: Assessing local identifiability [ Info: Assessing global identifiability [ Info: Computing IO-equations [ Info: Computed IO-equations in 0.005384567 seconds [ Info: Computing Wronskians [ Info: Computed Wronskians in 2.015799861 seconds [ Info: Dimensions of the Wronskians [3] [ Info: Ranks of the Wronskians computed in 0.06223512 seconds [ Info: Global identifiability assessed in 56.708549451 seconds [ Info: Assessing local identifiability [ Info: Assessing global identifiability [ Info: Functions to check involve states [ Info: Computing IO-equations [ Info: Computed IO-equations in 0.003182439 seconds [ Info: No parameters, so Wronskian computation is not needed [ Info: Global identifiability assessed in 0.946042529 seconds [ Info: Assessing local identifiability [ Info: Assessing global identifiability [ Info: Global identifiability assessed in 4.934e-5 seconds [ Info: Assessing local identifiability [ Info: Assessing global identifiability [ Info: Functions to check involve states [ Info: Computing IO-equations [ Info: Computed IO-equations in 0.036742409 seconds [ Info: Computing Wronskians [ Info: Computed Wronskians in 0.505176558 seconds [ Info: Dimensions of the Wronskians [5] [ Info: Ranks of the Wronskians computed in 3.598e-5 seconds [ Info: Simplifying generating set. Simplification level: standard ⌜ # Computing specializations.. Time: 0:00:16 ✓ # Computing specializations.. Time: 0:00:18 [ Info: Search for polynomial generators concluded in 15.413405652 [ Info: Selecting generators in 0.013215761 [ Info: Inclusion checked with probability 0.9955 in 0.064712156 seconds [ Info: Global identifiability assessed in 108.067717314 seconds [ Info: Assessing local identifiability [ Info: Assessing global identifiability [ Info: Computing IO-equations [ Info: Computed IO-equations in 3.653824424 seconds [ Info: Computing Wronskians [ Info: Computed Wronskians in 1.589561347 seconds [ Info: Dimensions of the Wronskians [676] [ Info: Ranks of the Wronskians computed in 0.105715434 seconds [ Info: Global identifiability assessed in 47.215176739 seconds [ Info: Assessing local identifiability [ Info: Assessing global identifiability [ Info: Computing IO-equations [ Info: Computed IO-equations in 0.014563677 seconds [ Info: Computing Wronskians [ Info: Computed Wronskians in 0.030366633 seconds [ Info: Dimensions of the Wronskians [69] [ Info: Ranks of the Wronskians computed in 0.000306377 seconds [ Info: Global identifiability assessed in 0.075914027 seconds [ Info: Assessing local identifiability [ Info: Assessing global identifiability [ Info: Note: the input model has nontrivial submodels. If the computation for the full model will be too heavy, you may want to try to first analyze one of the submodels. They can be produced using function `find_submodels` [ Info: Functions to check involve states [ Info: Computing IO-equations [ Info: Computed IO-equations in 7.220392713 seconds [ Info: Computing Wronskians [ Info: Computed Wronskians in 0.002629614 seconds [ Info: Dimensions of the Wronskians [2, 3, 2] [ Info: Ranks of the Wronskians computed in 3.475e-5 seconds [ Info: Simplifying generating set. Simplification level: standard [ Info: Search for polynomial generators concluded in 0.908285523 [ Info: Selecting generators in 0.000433996 [ Info: Inclusion checked with probability 0.9955 in 0.003372407 seconds [ Info: Global identifiability assessed in 9.501785446 seconds [ Info: Assessing local identifiability [ Info: Assessing global identifiability [ Info: Computing IO-equations [ Info: Computed IO-equations in 0.002321177 seconds [ Info: Computing Wronskians [ Info: Computed Wronskians in 0.001643674 seconds [ Info: Dimensions of the Wronskians [3] [ Info: Ranks of the Wronskians computed in 1.818e-5 seconds [ Info: Global identifiability assessed in 0.006926182 seconds [ Info: Assessing local identifiability [ Info: Assessing global identifiability [ Info: Computing IO-equations [ Info: Computed IO-equations in 0.002787703 seconds [ Info: Computing Wronskians [ Info: Computed Wronskians in 0.002169239 seconds [ Info: Dimensions of the Wronskians [4] [ Info: Ranks of the Wronskians computed in 2.205e-5 seconds [ Info: Global identifiability assessed in 0.008857013 seconds [ Info: Assessing local identifiability [ Info: Assessing global identifiability [ Info: Functions to check involve states [ Info: Computing IO-equations [ Info: Computed IO-equations in 0.005185259 seconds [ Info: Computing Wronskians [ Info: Computed Wronskians in 0.00412543 seconds [ Info: Dimensions of the Wronskians [6] [ Info: Ranks of the Wronskians computed in 2.389e-5 seconds [ Info: Simplifying generating set. Simplification level: standard [ Info: Search for polynomial generators concluded in 1.023915071 [ Info: Selecting generators in 0.014950903 [ Info: Inclusion checked with probability 0.9955 in 0.005534686 seconds [ Info: Global identifiability assessed in 2.267990054 seconds [ Info: Assessing local identifiability [ Info: Assessing global identifiability [ Info: Functions to check involve states [ Info: Computing IO-equations [ Info: Computed IO-equations in 0.008131261 seconds [ Info: Computing Wronskians [ Info: Computed Wronskians in 0.003719774 seconds [ Info: Dimensions of the Wronskians [2, 5] [ Info: Ranks of the Wronskians computed in 2.617e-5 seconds [ Info: Simplifying generating set. Simplification level: standard [ Info: Search for polynomial generators concluded in 0.006785734 [ Info: Selecting generators in 0.003732763 [ Info: Inclusion checked with probability 0.9955 in 0.00407892 seconds [ Info: Global identifiability assessed in 0.04999396 seconds [ Info: Summary of the model: [ Info: State variables: x [ Info: Parameters: a [ Info: Inputs: u [ Info: Outputs: y [ Info: Summary of the model: [ Info: State variables: x1, x2 [ Info: Parameters: a [ Info: Inputs: [ Info: Outputs: y [ Info: Summary of the model: [ Info: State variables: x1, x2 [ Info: Parameters: a [ Info: Inputs: [ Info: Outputs: y [ Info: Summary of the model: [ Info: State variables: x1, x2 [ Info: Parameters: Θ [ Info: Inputs: u [ Info: Outputs: y [ Info: Summary of the model: [ Info: State variables: x [ Info: Parameters: V_m, c, k01, k_m [ Info: Inputs: [ Info: Outputs: y [ Info: Summary of the model: [ Info: State variables: x [ Info: Parameters: a, b, c [ Info: Inputs: u [ Info: Outputs: y [ Info: Summary of the model: [ Info: State variables: x0, x1 [ Info: Parameters: a01, a12, a21 [ Info: Inputs: [ Info: Outputs: y [ Info: Summary of the model: [ Info: State variables: x1, x2 [ Info: Parameters: k1, k2, k3, k4 [ Info: Inputs: u [ Info: Outputs: y [ Info: Summary of the model: [ Info: State variables: x1, x2, x3 [ Info: Parameters: β1, β2, β3, λ1, λ2, λ3 [ Info: Inputs: u1, u2, u3 [ Info: Outputs: y [ Info: Summary of the model: [ Info: State variables: x1, x2, x3 [ Info: Parameters: a1, a2, b1, b2 [ Info: Inputs: u [ Info: Outputs: y [ Info: Summary of the model: [ Info: State variables: x1, x2, x3 [ Info: Parameters: a1, a2, b1, b2 [ Info: Inputs: u [ Info: Outputs: y [ Info: Summary of the model: [ Info: State variables: x1, x2 [ Info: Parameters: p1, p2, p3, p4 [ Info: Inputs: [ Info: Outputs: y [ Info: Summary of the model: [ Info: State variables: x1, x2, x3, x4 [ Info: Parameters: alpha, b, beta, c, delta, gama, sigma [ Info: Inputs: [ Info: Outputs: y [ Info: Summary of the model: [ Info: State variables: s, i, r, x1, x2 [ Info: Parameters: M, b0, b1, g, mu, nu [ Info: Inputs: [ Info: Outputs: y1, y2 [ Info: Summary of the model: [ Info: State variables: S, E, I, R, Q [ Info: Parameters: beta, gamma, psi, v [ Info: Inputs: [ Info: Outputs: y1 [ Info: Summary of the model: [ Info: State variables: x1, x2, x3, x4 [ Info: Parameters: k01, k12, k13, k14, k21, k31, k41 [ Info: Inputs: u [ Info: Outputs: y1 [ Info: Summary of the model: [ Info: State variables: x5, x7, x4, x6 [ Info: Parameters: k10, k5, k6, k7, k8, k9 [ Info: Inputs: [ Info: Outputs: y1, y2 [ Info: Summary of the model: [ Info: State variables: S, In, L, Q [ Info: Parameters: Ninv, a, b, e, g, s [ Info: Inputs: u [ Info: Outputs: y [ Info: Summary of the model: [ Info: State variables: S, R, W [ Info: Parameters: Dd, T, a, d, dr, e, g, r, rR [ Info: Inputs: [ Info: Outputs: y1, y2 [ Info: Summary of the model: [ Info: State variables: P3, P0, P5, P4, P1, P2 [ Info: Parameters: Ks, M, Mar, alpa, beta, beta_SA, beta_SI, phi, siga1, siga2 [ Info: Inputs: [ Info: Outputs: y [ Info: Summary of the model: [ Info: State variables: x [ Info: Parameters: [ Info: Inputs: [ Info: Outputs: y [ Info: Summary of the model: [ Info: State variables: x [ Info: Parameters: a [ Info: Inputs: u [ Info: Outputs: y [ Info: Summary of the model: [ Info: State variables: x1, x2 [ Info: Parameters: a, b, c, d [ Info: Inputs: [ Info: Outputs: y [ Info: Summary of the model: [ Info: State variables: x1, x2 [ Info: Parameters: a, b, c, d [ Info: Inputs: [ Info: Outputs: y [ Info: Summary of the model: [ Info: State variables: x1, x2, x3 [ Info: Parameters: β1, β2, β3, λ1, λ2, λ3 [ Info: Inputs: u1, u2, u3 [ Info: Outputs: y [ Info: Summary of the model: [ Info: State variables: x1, x2 [ Info: Parameters: Θ [ Info: Inputs: [ Info: Outputs: y [ Info: Summary of the model: [ Info: State variables: x1, x2, x3 [ Info: Parameters: C, α [ Info: Inputs: [ Info: Outputs: y [ Info: Summary of the model: [ Info: State variables: x1, x2 [ Info: Parameters: α [ Info: Inputs: [ Info: Outputs: y [ Info: Summary of the model: [ Info: State variables: x [ Info: Parameters: a, b, c [ Info: Inputs: u [ Info: Outputs: y [ Info: Summary of the model: [ Info: State variables: x1, x2, x3 [ Info: Parameters: p1, p2, p3, p4 [ Info: Inputs: u [ Info: Outputs: y1 [ Info: Summary of the model: [ Info: State variables: EGFR, pEGFR, pEGFR_Akt, Akt, pAkt, S6, pAkt_S6, pS6, EGF_EGFR [ Info: Parameters: EGFR_turnover, a1, a2, a3, reaction_1_k1, reaction_1_k2, reaction_2_k1, reaction_2_k2, reaction_3_k1, reaction_4_k1, reaction_5_k1, reaction_5_k2, reaction_6_k1, reaction_7_k1, reaction_8_k1, reaction_9_k1 [ Info: Inputs: pro_EGFR [ Info: Outputs: y1, y2, y3 [ Info: Summary of the model: [ Info: State variables: beta, cry, zea, beta10, OHbeta10, betaio, OHbetaio [ Info: Parameters: kOHbeta10, kbeta, kbeta10, kcryOH, kcrybeta, kzea [ Info: Inputs: [ Info: Outputs: y1, y2 [ Info: Summary of the model: [ Info: State variables: x1, x2, x3, x4 [ Info: Parameters: EpoR_A, k1, k2, k3, k5, k6, k7 [ Info: Inputs: [ Info: Outputs: y1, y2, y3 [ Info: Summary of the model: [ Info: State variables: x1, x2 [ Info: Parameters: [ Info: Inputs: [ Info: Outputs: y [ Info: Summary of the model: [ Info: State variables: S, E, U, I [ Info: Parameters: N, a, b, d, g [ Info: Inputs: [ Info: Outputs: y [ Info: Summary of the model: [ Info: State variables: x [ Info: Parameters: alpha [ Info: Inputs: [ Info: Outputs: y [ Info: Summary of the model: [ Info: State variables: x1, x2 [ Info: Parameters: k01, k02, k12, k21, v [ Info: Inputs: u [ Info: Outputs: y [ Info: Summary of the model: [ Info: State variables: x1, x2 [ Info: Parameters: K_M, V_M, b1, c, k02, k12, k21 [ Info: Inputs: u [ Info: Outputs: y [ Info: Summary of the model: [ Info: State variables: x1, x2, x3 [ Info: Parameters: k02, k03, k12, k13, k21, k31, v [ Info: Inputs: u [ Info: Outputs: y [ Info: Summary of the model: [ Info: State variables: x1, x2, x3, x4 [ Info: Parameters: a03, a04, a13, a24, a31, a42, a43 [ Info: Inputs: u [ Info: Outputs: y1, y2 [ Info: Summary of the model: [ Info: State variables: S, I [ Info: Parameters: N, beta, k, mu, nu [ Info: Inputs: [ Info: Outputs: y [ Info: Summary of the model: [ Info: State variables: x1, x2 [ Info: Parameters: p1, p2, p3, p4, p5 [ Info: Inputs: [ Info: Outputs: y [ Info: Summary of the model: [ Info: State variables: x1, x2, x3, x4 [ Info: Parameters: beta, c, d, k1, k2, mu1, mu2, q1, q2, s [ Info: Inputs: [ Info: Outputs: y1, y2 [ Info: Summary of the model: [ Info: State variables: A, I, H, R, D, E [ Info: Parameters: N, a, c1, c2, d, h, r1, r2, r3, s [ Info: Inputs: [ Info: Outputs: y [ Info: Summary of the model: [ Info: State variables: x1, x2 [ Info: Parameters: Km, Vm, a1, a2, b1, c, k02, k12, k21 [ Info: Inputs: u [ Info: Outputs: y [ Info: Summary of the model: [ Info: State variables: T, Tast, V [ Info: Parameters: N, beta, c, delta, lambda, rho [ Info: Inputs: [ Info: Outputs: y [ Info: Computing IO-equations [ Info: Computed IO-equations in 0.001699993 seconds [ Info: Computing Wronskians [ Info: Computed Wronskians in 0.001345107 seconds [ Info: Dimensions of the Wronskians [2] [ Info: Ranks of the Wronskians computed in 2.52e-5 seconds [ Info: Simplifying generating set. Simplification level: weak [ Info: Search for polynomial generators concluded in 9.6969e-5 [ Info: Selecting generators in 1.507976939 [ Info: Inclusion checked with probability 0.995 in 0.002227218 seconds [ Info: The search for identifiable functions concluded in 3.00262071 seconds ┌ Info: Test, result_funcs = │ AbstractAlgebra.Generic.FracFieldElem{QQMPolyRingElem}[a] │ case = │ (ode = x'(t) = x(t)*a + u(t) │ y(t) = x(t) │ , ident_funcs = QQMPolyRingElem[a]) │ simplify = :weak │ R = │ Multivariate polynomial ring in 4 variables x(t), y(t), u(t), a │ over rational field └ with_states = false [ Info: Computing IO-equations [ Info: Computed IO-equations in 0.001543275 seconds [ Info: Computing Wronskians [ Info: Computed Wronskians in 0.001129159 seconds [ Info: Dimensions of the Wronskians [2] [ Info: Ranks of the Wronskians computed in 1.7179e-5 seconds [ Info: Simplifying generating set. Simplification level: weak [ Info: Search for polynomial generators concluded in 6.897e-5 [ Info: Selecting generators in 0.000616774 [ Info: Inclusion checked with probability 0.995 in 0.001790553 seconds [ Info: The search for identifiable functions concluded in 0.009355178 seconds ┌ Info: Test, result_funcs = │ AbstractAlgebra.Generic.FracFieldElem{QQMPolyRingElem}[a] │ case = │ (ode = x'(t) = x(t)*a + u(t) │ y(t) = x(t) │ , ident_funcs = QQMPolyRingElem[a]) │ simplify = :weak │ R = │ Multivariate polynomial ring in 4 variables x(t), y(t), u(t), a │ over rational field └ with_states = false [ Info: Computing IO-equations [ Info: Computed IO-equations in 0.001212628 seconds [ Info: Computing Wronskians [ Info: Computed Wronskians in 0.00097308 seconds [ Info: Dimensions of the Wronskians [2] [ Info: Ranks of the Wronskians computed in 1.7049e-5 seconds [ Info: Simplifying generating set. Simplification level: weak [ Info: Search for polynomial generators concluded in 6.7089e-5 [ Info: Selecting generators in 0.000629754 [ Info: Inclusion checked with probability 0.995 in 0.001848852 seconds [ Info: The search for identifiable functions concluded in 0.008801474 seconds ┌ Info: Test, result_funcs = │ AbstractAlgebra.Generic.FracFieldElem{QQMPolyRingElem}[a] │ case = │ (ode = x'(t) = x(t)*a + u(t) │ y(t) = x(t) │ , ident_funcs = QQMPolyRingElem[a]) │ simplify = :weak │ R = │ Multivariate polynomial ring in 4 variables x(t), y(t), u(t), a │ over rational field └ with_states = false [ Info: Computing IO-equations [ Info: Computed IO-equations in 0.001273747 seconds [ Info: Computing Wronskians [ Info: Computed Wronskians in 0.00098822 seconds [ Info: Dimensions of the Wronskians [2] [ Info: Ranks of the Wronskians computed in 1.693e-5 seconds [ Info: Simplifying generating set. Simplification level: standard [ Info: Search for polynomial generators concluded in 0.000458285 [ Info: Selecting generators in 0.000645853 [ Info: Inclusion checked with probability 0.995 in 0.001763093 seconds [ Info: The search for identifiable functions concluded in 0.00910236 seconds ┌ Info: Test, result_funcs = │ AbstractAlgebra.Generic.FracFieldElem{QQMPolyRingElem}[a] │ case = │ (ode = x'(t) = x(t)*a + u(t) │ y(t) = x(t) │ , ident_funcs = QQMPolyRingElem[a]) │ simplify = :standard │ R = │ Multivariate polynomial ring in 4 variables x(t), y(t), u(t), a │ over rational field └ with_states = false [ Info: QQMPolyRingElem[x(t), y(t), u(t), a] [ Info: Computing IO-equations [ Info: Computed IO-equations in 0.001248778 seconds [ Info: Computing Wronskians [ Info: Computed Wronskians in 0.000982361 seconds [ Info: Dimensions of the Wronskians [2] [ Info: Ranks of the Wronskians computed in 1.682e-5 seconds [ Info: Simplifying generating set. Simplification level: standard [ Info: Search for polynomial generators concluded in 0.000382296 [ Info: Selecting generators in 0.000637954 [ Info: Inclusion checked with probability 0.995 in 0.001778523 seconds [ Info: The search for identifiable functions concluded in 0.008967963 seconds ┌ Info: Test, result_funcs = │ AbstractAlgebra.Generic.FracFieldElem{QQMPolyRingElem}[a] │ case = │ (ode = x'(t) = x(t)*a + u(t) │ y(t) = x(t) │ , ident_funcs = QQMPolyRingElem[a]) │ simplify = :standard │ R = │ Multivariate polynomial ring in 4 variables x(t), y(t), u(t), a │ over rational field └ with_states = false [ Info: QQMPolyRingElem[x(t), y(t), u(t), a] [ Info: Computing IO-equations [ Info: Computed IO-equations in 0.001267028 seconds [ Info: Computing Wronskians [ Info: Computed Wronskians in 0.00098851 seconds [ Info: Dimensions of the Wronskians [2] [ Info: Ranks of the Wronskians computed in 1.812e-5 seconds [ Info: Simplifying generating set. Simplification level: standard [ Info: Search for polynomial generators concluded in 0.000388466 [ Info: Selecting generators in 0.000613794 [ Info: Inclusion checked with probability 0.995 in 0.001759852 seconds [ Info: The search for identifiable functions concluded in 0.008845913 seconds ┌ Info: Test, result_funcs = │ AbstractAlgebra.Generic.FracFieldElem{QQMPolyRingElem}[a] │ case = │ (ode = x'(t) = x(t)*a + u(t) │ y(t) = x(t) │ , ident_funcs = QQMPolyRingElem[a]) │ simplify = :standard │ R = │ Multivariate polynomial ring in 4 variables x(t), y(t), u(t), a │ over rational field └ with_states = false [ Info: QQMPolyRingElem[x(t), y(t), u(t), a] [ Info: Computing IO-equations [ Info: Computed IO-equations in 0.001708713 seconds [ Info: Computing Wronskians [ Info: Computed Wronskians in 0.001168018 seconds [ Info: Dimensions of the Wronskians [1] [ Info: Ranks of the Wronskians computed in 1.442e-5 seconds [ Info: The search for identifiable functions concluded in 0.038385324 seconds [ Info: Computing IO-equations [ Info: Computed IO-equations in 0.002430236 seconds [ Info: Computing Wronskians [ Info: Computed Wronskians in 0.001610845 seconds [ Info: Dimensions of the Wronskians [1] [ Info: Ranks of the Wronskians computed in 1.833e-5 seconds [ Info: The search for identifiable functions concluded in 0.005062081 seconds [ Info: Computing IO-equations [ Info: Computed IO-equations in 0.001556414 seconds [ Info: Computing Wronskians [ Info: Computed Wronskians in 0.001163859 seconds [ Info: Dimensions of the Wronskians [1] [ Info: Ranks of the Wronskians computed in 1.418e-5 seconds [ Info: The search for identifiable functions concluded in 0.003318578 seconds [ Info: Computing IO-equations [ Info: Computed IO-equations in 0.001454026 seconds [ Info: Computing Wronskians [ Info: Computed Wronskians in 0.001376227 seconds [ Info: Dimensions of the Wronskians [1] [ Info: Ranks of the Wronskians computed in 1.606e-5 seconds [ Info: The search for identifiable functions concluded in 0.003553455 seconds [ Info: Computing IO-equations [ Info: Computed IO-equations in 0.001582124 seconds [ Info: Computing Wronskians [ Info: Computed Wronskians in 0.001147439 seconds [ Info: Dimensions of the Wronskians [1] [ Info: Ranks of the Wronskians computed in 1.4349e-5 seconds [ Info: The search for identifiable functions concluded in 0.003292448 seconds [ Info: Computing IO-equations [ Info: Computed IO-equations in 0.001437956 seconds [ Info: Computing Wronskians [ Info: Computed Wronskians in 0.001125569 seconds [ Info: Dimensions of the Wronskians [1] [ Info: Ranks of the Wronskians computed in 1.422e-5 seconds [ Info: The search for identifiable functions concluded in 0.003172819 seconds [ Info: Computing IO-equations [ Info: Computed IO-equations in 0.001800063 seconds [ Info: Computing Wronskians [ Info: Computed Wronskians in 0.001307018 seconds [ Info: Dimensions of the Wronskians [1] [ Info: Ranks of the Wronskians computed in 1.488e-5 seconds [ Info: The search for identifiable functions concluded in 0.003953551 seconds [ Info: Computing IO-equations [ Info: Computed IO-equations in 0.001599924 seconds [ Info: Computing Wronskians [ Info: Computed Wronskians in 0.001175589 seconds [ Info: Dimensions of the Wronskians [1] [ Info: Ranks of the Wronskians computed in 1.491e-5 seconds [ Info: The search for identifiable functions concluded in 0.003398277 seconds [ Info: Computing IO-equations [ Info: Computed IO-equations in 0.001613764 seconds [ Info: Computing Wronskians [ Info: Computed Wronskians in 0.001192099 seconds [ Info: Dimensions of the Wronskians [1] [ Info: Ranks of the Wronskians computed in 1.484e-5 seconds [ Info: The search for identifiable functions concluded in 0.003452417 seconds [ Info: Computing IO-equations [ Info: Computed IO-equations in 0.001665694 seconds [ Info: Computing Wronskians [ Info: Computed Wronskians in 0.001334167 seconds [ Info: Dimensions of the Wronskians [1] [ Info: Ranks of the Wronskians computed in 1.445e-5 seconds [ Info: The search for identifiable functions concluded in 0.003670004 seconds [ Info: Computing IO-equations [ Info: Computed IO-equations in 0.001911152 seconds [ Info: Computing Wronskians [ Info: Computed Wronskians in 0.001424016 seconds [ Info: Dimensions of the Wronskians [1] [ Info: Ranks of the Wronskians computed in 1.367e-5 seconds [ Info: The search for identifiable functions concluded in 0.004141059 seconds [ Info: Computing IO-equations [ Info: Computed IO-equations in 0.001752643 seconds [ Info: Computing Wronskians [ Info: Computed Wronskians in 0.001254298 seconds [ Info: Dimensions of the Wronskians [1] [ Info: Ranks of the Wronskians computed in 1.445e-5 seconds [ Info: The search for identifiable functions concluded in 0.003672585 seconds [ Info: Computing IO-equations [ Info: Computed IO-equations in 0.302855384 seconds [ Info: Computing Wronskians [ Info: Computed Wronskians in 0.00199521 seconds [ Info: Dimensions of the Wronskians [2] [ Info: Ranks of the Wronskians computed in 1.694e-5 seconds [ Info: Simplifying generating set. Simplification level: weak [ Info: Search for polynomial generators concluded in 0.000108399 [ Info: Selecting generators in 0.000649304 [ Info: Inclusion checked with probability 0.995 in 0.002460836 seconds [ Info: The search for identifiable functions concluded in 0.31351995 seconds ┌ Info: Test, result_funcs = │ AbstractAlgebra.Generic.FracFieldElem{QQMPolyRingElem}[Θ] │ case = │ (ode = x1'(t) = x2(t)^2*Θ │ x2'(t) = u(t) │ y(t) = x1(t) │ , ident_funcs = QQMPolyRingElem[Θ]) │ simplify = :weak │ R = │ Multivariate polynomial ring in 5 variables x1(t), x2(t), y(t), u(t), Θ │ over rational field └ with_states = false [ Info: Computing IO-equations [ Info: Computed IO-equations in 0.002701334 seconds [ Info: Computing Wronskians [ Info: Computed Wronskians in 0.001796223 seconds [ Info: Dimensions of the Wronskians [2] [ Info: Ranks of the Wronskians computed in 1.786e-5 seconds [ Info: Simplifying generating set. Simplification level: weak [ Info: Search for polynomial generators concluded in 7.0529e-5 [ Info: Selecting generators in 0.000599115 [ Info: Inclusion checked with probability 0.995 in 0.001893552 seconds [ Info: The search for identifiable functions concluded in 0.011261819 seconds ┌ Info: Test, result_funcs = │ AbstractAlgebra.Generic.FracFieldElem{QQMPolyRingElem}[Θ] │ case = │ (ode = x1'(t) = x2(t)^2*Θ │ x2'(t) = u(t) │ y(t) = x1(t) │ , ident_funcs = QQMPolyRingElem[Θ]) │ simplify = :weak │ R = │ Multivariate polynomial ring in 5 variables x1(t), x2(t), y(t), u(t), Θ │ over rational field └ with_states = false [ Info: Computing IO-equations [ Info: Computed IO-equations in 0.002491455 seconds [ Info: Computing Wronskians [ Info: Computed Wronskians in 0.001675073 seconds [ Info: Dimensions of the Wronskians [2] [ Info: Ranks of the Wronskians computed in 1.727e-5 seconds [ Info: Simplifying generating set. Simplification level: weak [ Info: Search for polynomial generators concluded in 6.8309e-5 [ Info: Selecting generators in 0.000622554 [ Info: Inclusion checked with probability 0.995 in 0.001887372 seconds [ Info: The search for identifiable functions concluded in 0.011054661 seconds ┌ Info: Test, result_funcs = │ AbstractAlgebra.Generic.FracFieldElem{QQMPolyRingElem}[Θ] │ case = │ (ode = x1'(t) = x2(t)^2*Θ │ x2'(t) = u(t) │ y(t) = x1(t) │ , ident_funcs = QQMPolyRingElem[Θ]) │ simplify = :weak │ R = │ Multivariate polynomial ring in 5 variables x1(t), x2(t), y(t), u(t), Θ │ over rational field └ with_states = false [ Info: Computing IO-equations [ Info: Computed IO-equations in 0.002493716 seconds [ Info: Computing Wronskians [ Info: Computed Wronskians in 0.001560305 seconds [ Info: Dimensions of the Wronskians [2] [ Info: Ranks of the Wronskians computed in 1.707e-5 seconds [ Info: Simplifying generating set. Simplification level: standard [ Info: Search for polynomial generators concluded in 0.000510165 [ Info: Selecting generators in 0.000613894 [ Info: Inclusion checked with probability 0.995 in 0.001806613 seconds [ Info: The search for identifiable functions concluded in 0.011093251 seconds ┌ Info: Test, result_funcs = │ AbstractAlgebra.Generic.FracFieldElem{QQMPolyRingElem}[Θ] │ case = │ (ode = x1'(t) = x2(t)^2*Θ │ x2'(t) = u(t) │ y(t) = x1(t) │ , ident_funcs = QQMPolyRingElem[Θ]) │ simplify = :standard │ R = │ Multivariate polynomial ring in 5 variables x1(t), x2(t), y(t), u(t), Θ │ over rational field └ with_states = false [ Info: QQMPolyRingElem[x1(t), x2(t), y(t), u(t), Θ] [ Info: Computing IO-equations [ Info: Computed IO-equations in 0.002606974 seconds [ Info: Computing Wronskians [ Info: Computed Wronskians in 0.001646994 seconds [ Info: Dimensions of the Wronskians [2] [ Info: Ranks of the Wronskians computed in 1.834e-5 seconds [ Info: Simplifying generating set. Simplification level: standard [ Info: Search for polynomial generators concluded in 0.000444286 [ Info: Selecting generators in 0.000691003 [ Info: Inclusion checked with probability 0.995 in 0.001999181 seconds [ Info: The search for identifiable functions concluded in 0.011933603 seconds ┌ Info: Test, result_funcs = │ AbstractAlgebra.Generic.FracFieldElem{QQMPolyRingElem}[Θ] │ case = │ (ode = x1'(t) = x2(t)^2*Θ │ x2'(t) = u(t) │ y(t) = x1(t) │ , ident_funcs = QQMPolyRingElem[Θ]) │ simplify = :standard │ R = │ Multivariate polynomial ring in 5 variables x1(t), x2(t), y(t), u(t), Θ │ over rational field └ with_states = false [ Info: QQMPolyRingElem[x1(t), x2(t), y(t), u(t), Θ] [ Info: Computing IO-equations [ Info: Computed IO-equations in 0.002823762 seconds [ Info: Computing Wronskians [ Info: Computed Wronskians in 0.001722323 seconds [ Info: Dimensions of the Wronskians [2] [ Info: Ranks of the Wronskians computed in 1.855e-5 seconds [ Info: Simplifying generating set. Simplification level: standard [ Info: Search for polynomial generators concluded in 0.000425936 [ Info: Selecting generators in 0.000703933 [ Info: Inclusion checked with probability 0.995 in 0.001978051 seconds [ Info: The search for identifiable functions concluded in 0.012145451 seconds ┌ Info: Test, result_funcs = │ AbstractAlgebra.Generic.FracFieldElem{QQMPolyRingElem}[Θ] │ case = │ (ode = x1'(t) = x2(t)^2*Θ │ x2'(t) = u(t) │ y(t) = x1(t) │ , ident_funcs = QQMPolyRingElem[Θ]) │ simplify = :standard │ R = │ Multivariate polynomial ring in 5 variables x1(t), x2(t), y(t), u(t), Θ │ over rational field └ with_states = false [ Info: QQMPolyRingElem[x1(t), x2(t), y(t), u(t), Θ] [ Info: Computing IO-equations [ Info: Computed IO-equations in 0.001449886 seconds [ Info: Computing Wronskians [ Info: Computed Wronskians in 0.001323377 seconds [ Info: Dimensions of the Wronskians [4] [ Info: Ranks of the Wronskians computed in 2.519e-5 seconds [ Info: Simplifying generating set. Simplification level: weak [ Info: Search for polynomial generators concluded in 0.000108899 [ Info: Selecting generators in 0.002205538 [ Info: Inclusion checked with probability 0.995 in 0.003772903 seconds [ Info: The search for identifiable functions concluded in 0.017885515 seconds ┌ Info: Test, result_funcs = │ AbstractAlgebra.Generic.FracFieldElem{QQMPolyRingElem}[k01, c*k_m, V_m//k_m] │ case = │ (ode = x'(t) = (x(t)^2*k01 - x(t)*V_m + x(t)*k01*k_m)//(x(t) + k_m) │ y(t) = x(t)*c │ , ident_funcs = QQMPolyRingElem[k01, c*k_m, V_m*c]) │ simplify = :weak │ R = │ Multivariate polynomial ring in 6 variables x(t), y(t), V_m, c, ..., k_m │ over rational field └ with_states = false [ Info: Computing IO-equations [ Info: Computed IO-equations in 0.001480805 seconds [ Info: Computing Wronskians [ Info: Computed Wronskians in 0.001327257 seconds [ Info: Dimensions of the Wronskians [4] [ Info: Ranks of the Wronskians computed in 2.119e-5 seconds [ Info: Simplifying generating set. Simplification level: weak [ Info: Search for polynomial generators concluded in 0.000100689 [ Info: Selecting generators in 0.002120649 [ Info: Inclusion checked with probability 0.995 in 0.003898362 seconds [ Info: The search for identifiable functions concluded in 0.018175612 seconds ┌ Info: Test, result_funcs = │ AbstractAlgebra.Generic.FracFieldElem{QQMPolyRingElem}[k01, c*k_m, V_m//k_m] │ case = │ (ode = x'(t) = (x(t)^2*k01 - x(t)*V_m + x(t)*k01*k_m)//(x(t) + k_m) │ y(t) = x(t)*c │ , ident_funcs = QQMPolyRingElem[k01, c*k_m, V_m*c]) │ simplify = :weak │ R = │ Multivariate polynomial ring in 6 variables x(t), y(t), V_m, c, ..., k_m │ over rational field └ with_states = false [ Info: Computing IO-equations [ Info: Computed IO-equations in 0.001424086 seconds [ Info: Computing Wronskians [ Info: Computed Wronskians in 0.001269038 seconds [ Info: Dimensions of the Wronskians [4] [ Info: Ranks of the Wronskians computed in 2.195e-5 seconds [ Info: Simplifying generating set. Simplification level: weak [ Info: Search for polynomial generators concluded in 0.000108229 [ Info: Selecting generators in 0.002258067 [ Info: Inclusion checked with probability 0.995 in 0.004490096 seconds [ Info: The search for identifiable functions concluded in 0.018653937 seconds ┌ Info: Test, result_funcs = │ AbstractAlgebra.Generic.FracFieldElem{QQMPolyRingElem}[k01, c*k_m, V_m//k_m] │ case = │ (ode = x'(t) = (x(t)^2*k01 - x(t)*V_m + x(t)*k01*k_m)//(x(t) + k_m) │ y(t) = x(t)*c │ , ident_funcs = QQMPolyRingElem[k01, c*k_m, V_m*c]) │ simplify = :weak │ R = │ Multivariate polynomial ring in 6 variables x(t), y(t), V_m, c, ..., k_m │ over rational field └ with_states = false [ Info: Computing IO-equations [ Info: Computed IO-equations in 0.001490295 seconds [ Info: Computing Wronskians [ Info: Computed Wronskians in 0.001388126 seconds [ Info: Dimensions of the Wronskians [4] [ Info: Ranks of the Wronskians computed in 2.0219e-5 seconds [ Info: Simplifying generating set. Simplification level: standard [ Info: Search for polynomial generators concluded in 0.268193433 [ Info: Selecting generators in 0.003958471 [ Info: Inclusion checked with probability 0.995 in 0.003729113 seconds [ Info: The search for identifiable functions concluded in 0.288109948 seconds ┌ Info: Test, result_funcs = │ AbstractAlgebra.Generic.FracFieldElem{QQMPolyRingElem}[k01, c*k_m, V_m*c] │ case = │ (ode = x'(t) = (x(t)^2*k01 - x(t)*V_m + x(t)*k01*k_m)//(x(t) + k_m) │ y(t) = x(t)*c │ , ident_funcs = QQMPolyRingElem[k01, c*k_m, V_m*c]) │ simplify = :standard │ R = │ Multivariate polynomial ring in 6 variables x(t), y(t), V_m, c, ..., k_m │ over rational field └ with_states = false [ Info: QQMPolyRingElem[x(t), y(t), V_m, c, k01, k_m] [ Info: Computing IO-equations [ Info: Computed IO-equations in 0.001638594 seconds [ Info: Computing Wronskians [ Info: Computed Wronskians in 0.001390287 seconds [ Info: Dimensions of the Wronskians [4] [ Info: Ranks of the Wronskians computed in 2.312e-5 seconds [ Info: Simplifying generating set. Simplification level: standard [ Info: Search for polynomial generators concluded in 0.015821365 [ Info: Selecting generators in 0.003394537 [ Info: Inclusion checked with probability 0.995 in 0.003669354 seconds [ Info: The search for identifiable functions concluded in 0.035192285 seconds ┌ Info: Test, result_funcs = │ AbstractAlgebra.Generic.FracFieldElem{QQMPolyRingElem}[k01, c*k_m, V_m*c] │ case = │ (ode = x'(t) = (x(t)^2*k01 - x(t)*V_m + x(t)*k01*k_m)//(x(t) + k_m) │ y(t) = x(t)*c │ , ident_funcs = QQMPolyRingElem[k01, c*k_m, V_m*c]) │ simplify = :standard │ R = │ Multivariate polynomial ring in 6 variables x(t), y(t), V_m, c, ..., k_m │ over rational field └ with_states = false [ Info: QQMPolyRingElem[x(t), y(t), V_m, c, k01, k_m] [ Info: Computing IO-equations [ Info: Computed IO-equations in 0.001466106 seconds [ Info: Computing Wronskians [ Info: Computed Wronskians in 0.001331797 seconds [ Info: Dimensions of the Wronskians [4] [ Info: Ranks of the Wronskians computed in 2.002e-5 seconds [ Info: Simplifying generating set. Simplification level: standard [ Info: Search for polynomial generators concluded in 0.015065133 [ Info: Selecting generators in 0.00311137 [ Info: Inclusion checked with probability 0.995 in 0.003262928 seconds [ Info: The search for identifiable functions concluded in 0.033528611 seconds ┌ Info: Test, result_funcs = │ AbstractAlgebra.Generic.FracFieldElem{QQMPolyRingElem}[k01, c*k_m, V_m*c] │ case = │ (ode = x'(t) = (x(t)^2*k01 - x(t)*V_m + x(t)*k01*k_m)//(x(t) + k_m) │ y(t) = x(t)*c │ , ident_funcs = QQMPolyRingElem[k01, c*k_m, V_m*c]) │ simplify = :standard │ R = │ Multivariate polynomial ring in 6 variables x(t), y(t), V_m, c, ..., k_m │ over rational field └ with_states = false [ Info: QQMPolyRingElem[x(t), y(t), V_m, c, k01, k_m] [ Info: Computing IO-equations [ Info: Computed IO-equations in 0.001456876 seconds [ Info: Computing Wronskians [ Info: Computed Wronskians in 0.001133889 seconds [ Info: Dimensions of the Wronskians [3] [ Info: Ranks of the Wronskians computed in 1.818e-5 seconds [ Info: Simplifying generating set. Simplification level: weak [ Info: Search for polynomial generators concluded in 8.6809e-5 [ Info: Selecting generators in 0.001954701 [ Info: Inclusion checked with probability 0.995 in 0.002885002 seconds [ Info: The search for identifiable functions concluded in 1.058375944 seconds ┌ Info: Test, result_funcs = │ AbstractAlgebra.Generic.FracFieldElem{QQMPolyRingElem}[a, b*c] │ case = │ (ode = x'(t) = x(t)*a + u(t)*b │ y(t) = x(t)*c │ , ident_funcs = QQMPolyRingElem[b*c, a]) │ simplify = :weak │ R = │ Multivariate polynomial ring in 6 variables x(t), y(t), u(t), a, ..., c │ over rational field └ with_states = false [ Info: Computing IO-equations [ Info: Computed IO-equations in 0.001316758 seconds [ Info: Computing Wronskians [ Info: Computed Wronskians in 0.00108325 seconds [ Info: Dimensions of the Wronskians [3] [ Info: Ranks of the Wronskians computed in 1.624e-5 seconds [ Info: Simplifying generating set. Simplification level: weak [ Info: Search for polynomial generators concluded in 8.9679e-5 [ Info: Selecting generators in 0.001810123 [ Info: Inclusion checked with probability 0.995 in 0.002383036 seconds [ Info: The search for identifiable functions concluded in 0.012124511 seconds ┌ Info: Test, result_funcs = │ AbstractAlgebra.Generic.FracFieldElem{QQMPolyRingElem}[a, b*c] │ case = │ (ode = x'(t) = x(t)*a + u(t)*b │ y(t) = x(t)*c │ , ident_funcs = QQMPolyRingElem[b*c, a]) │ simplify = :weak │ R = │ Multivariate polynomial ring in 6 variables x(t), y(t), u(t), a, ..., c │ over rational field └ with_states = false [ Info: Computing IO-equations [ Info: Computed IO-equations in 0.001229818 seconds [ Info: Computing Wronskians [ Info: Computed Wronskians in 0.000949431 seconds [ Info: Dimensions of the Wronskians [3] [ Info: Ranks of the Wronskians computed in 1.714e-5 seconds [ Info: Simplifying generating set. Simplification level: weak [ Info: Search for polynomial generators concluded in 7.5359e-5 [ Info: Selecting generators in 0.001834922 [ Info: Inclusion checked with probability 0.995 in 0.002562085 seconds [ Info: The search for identifiable functions concluded in 0.012125051 seconds ┌ Info: Test, result_funcs = │ AbstractAlgebra.Generic.FracFieldElem{QQMPolyRingElem}[a, b*c] │ case = │ (ode = x'(t) = x(t)*a + u(t)*b │ y(t) = x(t)*c │ , ident_funcs = QQMPolyRingElem[b*c, a]) │ simplify = :weak │ R = │ Multivariate polynomial ring in 6 variables x(t), y(t), u(t), a, ..., c │ over rational field └ with_states = false [ Info: Computing IO-equations [ Info: Computed IO-equations in 0.001330167 seconds [ Info: Computing Wronskians [ Info: Computed Wronskians in 0.00099147 seconds [ Info: Dimensions of the Wronskians [3] [ Info: Ranks of the Wronskians computed in 1.67e-5 seconds [ Info: Simplifying generating set. Simplification level: standard [ Info: Search for polynomial generators concluded in 0.222901197 [ Info: Selecting generators in 0.002175909 [ Info: Inclusion checked with probability 0.995 in 0.002585675 seconds [ Info: The search for identifiable functions concluded in 0.235336295 seconds ┌ Info: Test, result_funcs = │ AbstractAlgebra.Generic.FracFieldElem{QQMPolyRingElem}[a, b*c] │ case = │ (ode = x'(t) = x(t)*a + u(t)*b │ y(t) = x(t)*c │ , ident_funcs = QQMPolyRingElem[b*c, a]) │ simplify = :standard │ R = │ Multivariate polynomial ring in 6 variables x(t), y(t), u(t), a, ..., c │ over rational field └ with_states = false [ Info: QQMPolyRingElem[x(t), y(t), u(t), a, b, c] [ Info: Computing IO-equations [ Info: Computed IO-equations in 0.001226398 seconds [ Info: Computing Wronskians [ Info: Computed Wronskians in 0.00103159 seconds [ Info: Dimensions of the Wronskians [3] [ Info: Ranks of the Wronskians computed in 1.891e-5 seconds [ Info: Simplifying generating set. Simplification level: standard [ Info: Search for polynomial generators concluded in 0.005014861 [ Info: Selecting generators in 0.001914591 [ Info: Inclusion checked with probability 0.995 in 0.002420936 seconds [ Info: The search for identifiable functions concluded in 0.017186142 seconds ┌ Info: Test, result_funcs = │ AbstractAlgebra.Generic.FracFieldElem{QQMPolyRingElem}[a, b*c] │ case = │ (ode = x'(t) = x(t)*a + u(t)*b │ y(t) = x(t)*c │ , ident_funcs = QQMPolyRingElem[b*c, a]) │ simplify = :standard │ R = │ Multivariate polynomial ring in 6 variables x(t), y(t), u(t), a, ..., c │ over rational field └ with_states = false [ Info: QQMPolyRingElem[x(t), y(t), u(t), a, b, c] [ Info: Computing IO-equations [ Info: Computed IO-equations in 0.001214138 seconds [ Info: Computing Wronskians [ Info: Computed Wronskians in 0.00096305 seconds [ Info: Dimensions of the Wronskians [3] [ Info: Ranks of the Wronskians computed in 1.628e-5 seconds [ Info: Simplifying generating set. Simplification level: standard [ Info: Search for polynomial generators concluded in 0.005593035 [ Info: Selecting generators in 0.00213098 [ Info: Inclusion checked with probability 0.995 in 0.002776163 seconds [ Info: The search for identifiable functions concluded in 0.01837603 seconds ┌ Info: Test, result_funcs = │ AbstractAlgebra.Generic.FracFieldElem{QQMPolyRingElem}[a, b*c] │ case = │ (ode = x'(t) = x(t)*a + u(t)*b │ y(t) = x(t)*c │ , ident_funcs = QQMPolyRingElem[b*c, a]) │ simplify = :standard │ R = │ Multivariate polynomial ring in 6 variables x(t), y(t), u(t), a, ..., c │ over rational field └ with_states = false [ Info: QQMPolyRingElem[x(t), y(t), u(t), a, b, c] [ Info: Computing IO-equations [ Info: Computed IO-equations in 0.002149238 seconds [ Info: Computing Wronskians [ Info: Computed Wronskians in 0.001398887 seconds [ Info: Dimensions of the Wronskians [3] [ Info: Ranks of the Wronskians computed in 1.53e-5 seconds [ Info: Simplifying generating set. Simplification level: weak [ Info: Search for polynomial generators concluded in 7.5909e-5 [ Info: Selecting generators in 0.000514335 [ Info: Inclusion checked with probability 0.995 in 0.002781922 seconds [ Info: The search for identifiable functions concluded in 0.015751456 seconds ┌ Info: Test, result_funcs = │ AbstractAlgebra.Generic.FracFieldElem{QQMPolyRingElem}[a01 + a12 + a21, a01*a12] │ case = │ (ode = x0'(t) = -x0(t)*a01 - x0(t)*a21 + x1(t)*a12 │ x1'(t) = x0(t)*a21 - x1(t)*a12 │ y(t) = x0(t) │ , ident_funcs = QQMPolyRingElem[a01*a12, a01 + a12 + a21]) │ simplify = :weak │ R = │ Multivariate polynomial ring in 6 variables x0(t), x1(t), y(t), a01, ..., a21 │ over rational field └ with_states = false [ Info: Computing IO-equations [ Info: Computed IO-equations in 0.002212389 seconds [ Info: Computing Wronskians [ Info: Computed Wronskians in 0.001454976 seconds [ Info: Dimensions of the Wronskians [3] [ Info: Ranks of the Wronskians computed in 1.517e-5 seconds [ Info: Simplifying generating set. Simplification level: weak [ Info: Search for polynomial generators concluded in 9.598e-5 [ Info: Selecting generators in 0.000445945 [ Info: Inclusion checked with probability 0.995 in 0.002547995 seconds [ Info: The search for identifiable functions concluded in 0.015173291 seconds ┌ Info: Test, result_funcs = │ AbstractAlgebra.Generic.FracFieldElem{QQMPolyRingElem}[a01 + a12 + a21, a01*a12] │ case = │ (ode = x0'(t) = -x0(t)*a01 - x0(t)*a21 + x1(t)*a12 │ x1'(t) = x0(t)*a21 - x1(t)*a12 │ y(t) = x0(t) │ , ident_funcs = QQMPolyRingElem[a01*a12, a01 + a12 + a21]) │ simplify = :weak │ R = │ Multivariate polynomial ring in 6 variables x0(t), x1(t), y(t), a01, ..., a21 │ over rational field └ with_states = false [ Info: Computing IO-equations [ Info: Computed IO-equations in 0.002120509 seconds [ Info: Computing Wronskians [ Info: Computed Wronskians in 0.001415496 seconds [ Info: Dimensions of the Wronskians [3] [ Info: Ranks of the Wronskians computed in 1.463e-5 seconds [ Info: Simplifying generating set. Simplification level: weak [ Info: Search for polynomial generators concluded in 7.797e-5 [ Info: Selecting generators in 0.000489295 [ Info: Inclusion checked with probability 0.995 in 0.002648905 seconds [ Info: The search for identifiable functions concluded in 0.015722566 seconds ┌ Info: Test, result_funcs = │ AbstractAlgebra.Generic.FracFieldElem{QQMPolyRingElem}[a01 + a12 + a21, a01*a12] │ case = │ (ode = x0'(t) = -x0(t)*a01 - x0(t)*a21 + x1(t)*a12 │ x1'(t) = x0(t)*a21 - x1(t)*a12 │ y(t) = x0(t) │ , ident_funcs = QQMPolyRingElem[a01*a12, a01 + a12 + a21]) │ simplify = :weak │ R = │ Multivariate polynomial ring in 6 variables x0(t), x1(t), y(t), a01, ..., a21 │ over rational field └ with_states = false [ Info: Computing IO-equations [ Info: Computed IO-equations in 0.00208605 seconds [ Info: Computing Wronskians [ Info: Computed Wronskians in 0.001454136 seconds [ Info: Dimensions of the Wronskians [3] [ Info: Ranks of the Wronskians computed in 1.6889e-5 seconds [ Info: Simplifying generating set. Simplification level: standard [ Info: Search for polynomial generators concluded in 0.006474167 [ Info: Selecting generators in 0.000607844 [ Info: Inclusion checked with probability 0.995 in 0.002619745 seconds [ Info: The search for identifiable functions concluded in 0.021738347 seconds ┌ Info: Test, result_funcs = │ AbstractAlgebra.Generic.FracFieldElem{QQMPolyRingElem}[a01 + a12 + a21, a01*a12] │ case = │ (ode = x0'(t) = -x0(t)*a01 - x0(t)*a21 + x1(t)*a12 │ x1'(t) = x0(t)*a21 - x1(t)*a12 │ y(t) = x0(t) │ , ident_funcs = QQMPolyRingElem[a01*a12, a01 + a12 + a21]) │ simplify = :standard │ R = │ Multivariate polynomial ring in 6 variables x0(t), x1(t), y(t), a01, ..., a21 │ over rational field └ with_states = false [ Info: QQMPolyRingElem[x0(t), x1(t), y(t), a01, a12, a21] [ Info: Computing IO-equations [ Info: Computed IO-equations in 0.001921252 seconds [ Info: Computing Wronskians [ Info: Computed Wronskians in 0.001382557 seconds [ Info: Dimensions of the Wronskians [3] [ Info: Ranks of the Wronskians computed in 1.637e-5 seconds [ Info: Simplifying generating set. Simplification level: standard [ Info: Search for polynomial generators concluded in 0.006395887 [ Info: Selecting generators in 0.000627754 [ Info: Inclusion checked with probability 0.995 in 0.002713583 seconds [ Info: The search for identifiable functions concluded in 0.021786666 seconds ┌ Info: Test, result_funcs = │ AbstractAlgebra.Generic.FracFieldElem{QQMPolyRingElem}[a01 + a12 + a21, a01*a12] │ case = │ (ode = x0'(t) = -x0(t)*a01 - x0(t)*a21 + x1(t)*a12 │ x1'(t) = x0(t)*a21 - x1(t)*a12 │ y(t) = x0(t) │ , ident_funcs = QQMPolyRingElem[a01*a12, a01 + a12 + a21]) │ simplify = :standard │ R = │ Multivariate polynomial ring in 6 variables x0(t), x1(t), y(t), a01, ..., a21 │ over rational field └ with_states = false [ Info: QQMPolyRingElem[x0(t), x1(t), y(t), a01, a12, a21] [ Info: Computing IO-equations [ Info: Computed IO-equations in 0.002089819 seconds [ Info: Computing Wronskians [ Info: Computed Wronskians in 0.001454295 seconds [ Info: Dimensions of the Wronskians [3] [ Info: Ranks of the Wronskians computed in 1.502e-5 seconds [ Info: Simplifying generating set. Simplification level: standard [ Info: Search for polynomial generators concluded in 0.007032811 [ Info: Selecting generators in 0.000774473 [ Info: Inclusion checked with probability 0.995 in 0.003359157 seconds [ Info: The search for identifiable functions concluded in 0.023937925 seconds ┌ Info: Test, result_funcs = │ AbstractAlgebra.Generic.FracFieldElem{QQMPolyRingElem}[a01 + a12 + a21, a01*a12] │ case = │ (ode = x0'(t) = -x0(t)*a01 - x0(t)*a21 + x1(t)*a12 │ x1'(t) = x0(t)*a21 - x1(t)*a12 │ y(t) = x0(t) │ , ident_funcs = QQMPolyRingElem[a01*a12, a01 + a12 + a21]) │ simplify = :standard │ R = │ Multivariate polynomial ring in 6 variables x0(t), x1(t), y(t), a01, ..., a21 │ over rational field └ with_states = false [ Info: QQMPolyRingElem[x0(t), x1(t), y(t), a01, a12, a21] [ Info: Computing IO-equations [ Info: Computed IO-equations in 0.002728964 seconds [ Info: Computing Wronskians [ Info: Computed Wronskians in 0.001839752 seconds [ Info: Dimensions of the Wronskians [4] [ Info: Ranks of the Wronskians computed in 1.659e-5 seconds [ Info: Simplifying generating set. Simplification level: weak [ Info: Search for polynomial generators concluded in 9.5119e-5 [ Info: Selecting generators in 0.002956261 [ Info: Inclusion checked with probability 0.995 in 0.003421307 seconds [ Info: The search for identifiable functions concluded in 0.020738647 seconds ┌ Info: Test, result_funcs = │ AbstractAlgebra.Generic.FracFieldElem{QQMPolyRingElem}[k3 + k4, k1 + k2, k2*k3] │ case = │ (ode = x1'(t) = -x1(t)*k1 - x1(t)*k2 + x2(t)*k3 + u(t) │ x2'(t) = x1(t)*k2 - x2(t)*k3 - x2(t)*k4 │ y(t) = x1(t) │ , ident_funcs = QQMPolyRingElem[k1 + k2, k3 + k4, k2*k3]) │ simplify = :weak │ R = │ Multivariate polynomial ring in 8 variables x1(t), x2(t), y(t), u(t), ..., k4 │ over rational field └ with_states = false [ Info: Computing IO-equations [ Info: Computed IO-equations in 0.002817663 seconds [ Info: Computing Wronskians [ Info: Computed Wronskians in 0.001793672 seconds [ Info: Dimensions of the Wronskians [4] [ Info: Ranks of the Wronskians computed in 1.6479e-5 seconds [ Info: Simplifying generating set. Simplification level: weak [ Info: Search for polynomial generators concluded in 9.2469e-5 [ Info: Selecting generators in 0.00300624 [ Info: Inclusion checked with probability 0.995 in 0.003392397 seconds [ Info: The search for identifiable functions concluded in 0.020764307 seconds ┌ Info: Test, result_funcs = │ AbstractAlgebra.Generic.FracFieldElem{QQMPolyRingElem}[k3 + k4, k1 + k2, k2*k3] │ case = │ (ode = x1'(t) = -x1(t)*k1 - x1(t)*k2 + x2(t)*k3 + u(t) │ x2'(t) = x1(t)*k2 - x2(t)*k3 - x2(t)*k4 │ y(t) = x1(t) │ , ident_funcs = QQMPolyRingElem[k1 + k2, k3 + k4, k2*k3]) │ simplify = :weak │ R = │ Multivariate polynomial ring in 8 variables x1(t), x2(t), y(t), u(t), ..., k4 │ over rational field └ with_states = false [ Info: Computing IO-equations [ Info: Computed IO-equations in 0.002595524 seconds [ Info: Computing Wronskians [ Info: Computed Wronskians in 0.001795323 seconds [ Info: Dimensions of the Wronskians [4] [ Info: Ranks of the Wronskians computed in 1.691e-5 seconds [ Info: Simplifying generating set. Simplification level: weak [ Info: Search for polynomial generators concluded in 8.9219e-5 [ Info: Selecting generators in 0.002969301 [ Info: Inclusion checked with probability 0.995 in 0.003561265 seconds [ Info: The search for identifiable functions concluded in 0.020964074 seconds ┌ Info: Test, result_funcs = │ AbstractAlgebra.Generic.FracFieldElem{QQMPolyRingElem}[k3 + k4, k1 + k2, k2*k3] │ case = │ (ode = x1'(t) = -x1(t)*k1 - x1(t)*k2 + x2(t)*k3 + u(t) │ x2'(t) = x1(t)*k2 - x2(t)*k3 - x2(t)*k4 │ y(t) = x1(t) │ , ident_funcs = QQMPolyRingElem[k1 + k2, k3 + k4, k2*k3]) │ simplify = :weak │ R = │ Multivariate polynomial ring in 8 variables x1(t), x2(t), y(t), u(t), ..., k4 │ over rational field └ with_states = false [ Info: Computing IO-equations [ Info: Computed IO-equations in 0.002756653 seconds [ Info: Computing Wronskians [ Info: Computed Wronskians in 0.001807013 seconds [ Info: Dimensions of the Wronskians [4] [ Info: Ranks of the Wronskians computed in 1.809e-5 seconds [ Info: Simplifying generating set. Simplification level: standard [ Info: Search for polynomial generators concluded in 0.014078972 [ Info: Selecting generators in 0.003532945 [ Info: Inclusion checked with probability 0.995 in 0.003551325 seconds [ Info: The search for identifiable functions concluded in 0.036143486 seconds ┌ Info: Test, result_funcs = │ AbstractAlgebra.Generic.FracFieldElem{QQMPolyRingElem}[k3 + k4, k1 + k2, k2*k3] │ case = │ (ode = x1'(t) = -x1(t)*k1 - x1(t)*k2 + x2(t)*k3 + u(t) │ x2'(t) = x1(t)*k2 - x2(t)*k3 - x2(t)*k4 │ y(t) = x1(t) │ , ident_funcs = QQMPolyRingElem[k1 + k2, k3 + k4, k2*k3]) │ simplify = :standard │ R = │ Multivariate polynomial ring in 8 variables x1(t), x2(t), y(t), u(t), ..., k4 │ over rational field └ with_states = false [ Info: QQMPolyRingElem[x1(t), x2(t), y(t), u(t), k1, k2, k3, k4] [ Info: Computing IO-equations [ Info: Computed IO-equations in 0.002518206 seconds [ Info: Computing Wronskians [ Info: Computed Wronskians in 0.001839892 seconds [ Info: Dimensions of the Wronskians [4] [ Info: Ranks of the Wronskians computed in 1.805e-5 seconds [ Info: Simplifying generating set. Simplification level: standard [ Info: Search for polynomial generators concluded in 0.013549377 [ Info: Selecting generators in 0.003122739 [ Info: Inclusion checked with probability 0.995 in 0.003301478 seconds [ Info: The search for identifiable functions concluded in 0.034067376 seconds ┌ Info: Test, result_funcs = │ AbstractAlgebra.Generic.FracFieldElem{QQMPolyRingElem}[k3 + k4, k1 + k2, k2*k3] │ case = │ (ode = x1'(t) = -x1(t)*k1 - x1(t)*k2 + x2(t)*k3 + u(t) │ x2'(t) = x1(t)*k2 - x2(t)*k3 - x2(t)*k4 │ y(t) = x1(t) │ , ident_funcs = QQMPolyRingElem[k1 + k2, k3 + k4, k2*k3]) │ simplify = :standard │ R = │ Multivariate polynomial ring in 8 variables x1(t), x2(t), y(t), u(t), ..., k4 │ over rational field └ with_states = false [ Info: QQMPolyRingElem[x1(t), x2(t), y(t), u(t), k1, k2, k3, k4] [ Info: Computing IO-equations [ Info: Computed IO-equations in 0.002417556 seconds [ Info: Computing Wronskians [ Info: Computed Wronskians in 0.001724393 seconds [ Info: Dimensions of the Wronskians [4] [ Info: Ranks of the Wronskians computed in 1.647e-5 seconds [ Info: Simplifying generating set. Simplification level: standard [ Info: Search for polynomial generators concluded in 0.013369379 [ Info: Selecting generators in 0.003128439 [ Info: Inclusion checked with probability 0.995 in 0.00412076 seconds [ Info: The search for identifiable functions concluded in 0.034368123 seconds ┌ Info: Test, result_funcs = │ AbstractAlgebra.Generic.FracFieldElem{QQMPolyRingElem}[k3 + k4, k1 + k2, k2*k3] │ case = │ (ode = x1'(t) = -x1(t)*k1 - x1(t)*k2 + x2(t)*k3 + u(t) │ x2'(t) = x1(t)*k2 - x2(t)*k3 - x2(t)*k4 │ y(t) = x1(t) │ , ident_funcs = QQMPolyRingElem[k1 + k2, k3 + k4, k2*k3]) │ simplify = :standard │ R = │ Multivariate polynomial ring in 8 variables x1(t), x2(t), y(t), u(t), ..., k4 │ over rational field └ with_states = false [ Info: QQMPolyRingElem[x1(t), x2(t), y(t), u(t), k1, k2, k3, k4] [ Info: Computing IO-equations [ Info: Computed IO-equations in 0.014193491 seconds [ Info: Computing Wronskians [ Info: Computed Wronskians in 0.004478796 seconds [ Info: Dimensions of the Wronskians [13] [ Info: Ranks of the Wronskians computed in 2.434e-5 seconds [ Info: Simplifying generating set. Simplification level: weak [ Info: Search for polynomial generators concluded in 0.000115509 [ Info: Selecting generators in 0.008643946 [ Info: Inclusion checked with probability 0.995 in 0.005608176 seconds [ Info: The search for identifiable functions concluded in 0.290654403 seconds ┌ Info: Test, result_funcs = │ AbstractAlgebra.Generic.FracFieldElem{QQMPolyRingElem}[λ3, λ2, λ1, β3, β2, β1] │ case = │ (ode = x1'(t) = x1(t)*λ1 + u1(t)*β1 │ x2'(t) = x2(t)*λ2 + u2(t)*β2 │ x3'(t) = x3(t)*λ3 + u3(t)*β3 │ y(t) = x1(t) + x2(t) + x3(t) │ , ident_funcs = QQMPolyRingElem[λ1, λ2, λ3, β1, β2, β3]) │ simplify = :weak │ R = │ Multivariate polynomial ring in 13 variables x1(t), x2(t), x3(t), y(t), ..., λ3 │ over rational field └ with_states = false [ Info: Computing IO-equations [ Info: Computed IO-equations in 0.008028441 seconds [ Info: Computing Wronskians [ Info: Computed Wronskians in 0.005004451 seconds [ Info: Dimensions of the Wronskians [13] [ Info: Ranks of the Wronskians computed in 2.629e-5 seconds [ Info: Simplifying generating set. Simplification level: weak [ Info: Search for polynomial generators concluded in 0.000107519 [ Info: Selecting generators in 0.008864553 [ Info: Inclusion checked with probability 0.995 in 0.006197919 seconds [ Info: The search for identifiable functions concluded in 0.045379395 seconds ┌ Info: Test, result_funcs = │ AbstractAlgebra.Generic.FracFieldElem{QQMPolyRingElem}[λ3, λ2, λ1, β3, β2, β1] │ case = │ (ode = x1'(t) = x1(t)*λ1 + u1(t)*β1 │ x2'(t) = x2(t)*λ2 + u2(t)*β2 │ x3'(t) = x3(t)*λ3 + u3(t)*β3 │ y(t) = x1(t) + x2(t) + x3(t) │ , ident_funcs = QQMPolyRingElem[λ1, λ2, λ3, β1, β2, β3]) │ simplify = :weak │ R = │ Multivariate polynomial ring in 13 variables x1(t), x2(t), x3(t), y(t), ..., λ3 │ over rational field └ with_states = false [ Info: Computing IO-equations [ Info: Computed IO-equations in 0.006985442 seconds [ Info: Computing Wronskians [ Info: Computed Wronskians in 0.004827163 seconds [ Info: Dimensions of the Wronskians [13] [ Info: Ranks of the Wronskians computed in 2.6389e-5 seconds [ Info: Simplifying generating set. Simplification level: weak [ Info: Search for polynomial generators concluded in 0.000135159 [ Info: Selecting generators in 0.009407808 [ Info: Inclusion checked with probability 0.995 in 0.00615789 seconds [ Info: The search for identifiable functions concluded in 0.045286416 seconds ┌ Info: Test, result_funcs = │ AbstractAlgebra.Generic.FracFieldElem{QQMPolyRingElem}[λ3, λ2, λ1, β3, β2, β1] │ case = │ (ode = x1'(t) = x1(t)*λ1 + u1(t)*β1 │ x2'(t) = x2(t)*λ2 + u2(t)*β2 │ x3'(t) = x3(t)*λ3 + u3(t)*β3 │ y(t) = x1(t) + x2(t) + x3(t) │ , ident_funcs = QQMPolyRingElem[λ1, λ2, λ3, β1, β2, β3]) │ simplify = :weak │ R = │ Multivariate polynomial ring in 13 variables x1(t), x2(t), x3(t), y(t), ..., λ3 │ over rational field └ with_states = false [ Info: Computing IO-equations [ Info: Computed IO-equations in 0.00713419 seconds [ Info: Computing Wronskians [ Info: Computed Wronskians in 0.004845372 seconds [ Info: Dimensions of the Wronskians [13] [ Info: Ranks of the Wronskians computed in 2.5379e-5 seconds [ Info: Simplifying generating set. Simplification level: standard [ Info: Search for polynomial generators concluded in 0.002403626 [ Info: Selecting generators in 0.009444548 [ Info: Inclusion checked with probability 0.995 in 0.005923673 seconds [ Info: The search for identifiable functions concluded in 0.048902051 seconds ┌ Info: Test, result_funcs = │ AbstractAlgebra.Generic.FracFieldElem{QQMPolyRingElem}[λ3, λ2, λ1, β3, β2, β1] │ case = │ (ode = x1'(t) = x1(t)*λ1 + u1(t)*β1 │ x2'(t) = x2(t)*λ2 + u2(t)*β2 │ x3'(t) = x3(t)*λ3 + u3(t)*β3 │ y(t) = x1(t) + x2(t) + x3(t) │ , ident_funcs = QQMPolyRingElem[λ1, λ2, λ3, β1, β2, β3]) │ simplify = :standard │ R = │ Multivariate polynomial ring in 13 variables x1(t), x2(t), x3(t), y(t), ..., λ3 │ over rational field └ with_states = false [ Info: QQMPolyRingElem[x1(t), x2(t), x3(t), y(t), u1(t), u2(t), u3(t), β1, β2, β3, λ1, λ2, λ3] [ Info: Computing IO-equations [ Info: Computed IO-equations in 0.007555926 seconds [ Info: Computing Wronskians [ Info: Computed Wronskians in 0.005300708 seconds [ Info: Dimensions of the Wronskians [13] [ Info: Ranks of the Wronskians computed in 3.171e-5 seconds [ Info: Simplifying generating set. Simplification level: standard [ Info: Search for polynomial generators concluded in 0.002292448 [ Info: Selecting generators in 0.009862103 [ Info: Inclusion checked with probability 0.995 in 0.006892063 seconds [ Info: The search for identifiable functions concluded in 0.051208879 seconds ┌ Info: Test, result_funcs = │ AbstractAlgebra.Generic.FracFieldElem{QQMPolyRingElem}[λ3, λ2, λ1, β3, β2, β1] │ case = │ (ode = x1'(t) = x1(t)*λ1 + u1(t)*β1 │ x2'(t) = x2(t)*λ2 + u2(t)*β2 │ x3'(t) = x3(t)*λ3 + u3(t)*β3 │ y(t) = x1(t) + x2(t) + x3(t) │ , ident_funcs = QQMPolyRingElem[λ1, λ2, λ3, β1, β2, β3]) │ simplify = :standard │ R = │ Multivariate polynomial ring in 13 variables x1(t), x2(t), x3(t), y(t), ..., λ3 │ over rational field └ with_states = false [ Info: QQMPolyRingElem[x1(t), x2(t), x3(t), y(t), u1(t), u2(t), u3(t), β1, β2, β3, λ1, λ2, λ3] [ Info: Computing IO-equations [ Info: Computed IO-equations in 0.007755004 seconds [ Info: Computing Wronskians [ Info: Computed Wronskians in 0.004908762 seconds [ Info: Dimensions of the Wronskians [13] [ Info: Ranks of the Wronskians computed in 2.7949e-5 seconds [ Info: Simplifying generating set. Simplification level: standard [ Info: Search for polynomial generators concluded in 0.002401096 [ Info: Selecting generators in 0.009865253 [ Info: Inclusion checked with probability 0.995 in 0.006264539 seconds [ Info: The search for identifiable functions concluded in 0.050781172 seconds ┌ Info: Test, result_funcs = │ AbstractAlgebra.Generic.FracFieldElem{QQMPolyRingElem}[λ3, λ2, λ1, β3, β2, β1] │ case = │ (ode = x1'(t) = x1(t)*λ1 + u1(t)*β1 │ x2'(t) = x2(t)*λ2 + u2(t)*β2 │ x3'(t) = x3(t)*λ3 + u3(t)*β3 │ y(t) = x1(t) + x2(t) + x3(t) │ , ident_funcs = QQMPolyRingElem[λ1, λ2, λ3, β1, β2, β3]) │ simplify = :standard │ R = │ Multivariate polynomial ring in 13 variables x1(t), x2(t), x3(t), y(t), ..., λ3 │ over rational field └ with_states = false [ Info: QQMPolyRingElem[x1(t), x2(t), x3(t), y(t), u1(t), u2(t), u3(t), β1, β2, β3, λ1, λ2, λ3] [ Info: Computing IO-equations [ Info: Computed IO-equations in 0.00511814 seconds [ Info: Computing Wronskians [ Info: Computed Wronskians in 0.002927612 seconds [ Info: Dimensions of the Wronskians [5] [ Info: Ranks of the Wronskians computed in 1.962e-5 seconds [ Info: Simplifying generating set. Simplification level: weak [ Info: Search for polynomial generators concluded in 0.000101449 [ Info: Selecting generators in 0.00194397 [ Info: Inclusion checked with probability 0.995 in 0.004052361 seconds [ Info: The search for identifiable functions concluded in 0.024720648 seconds ┌ Info: Test, result_funcs = │ AbstractAlgebra.Generic.FracFieldElem{QQMPolyRingElem}[b2, b1, a2, a1] │ case = │ (ode = x1'(t) = -x1(t)*a1 + x2(t)*b1 + u(t) │ x2'(t) = x1(t)*a1 - x2(t)*a2 - x2(t)*b1 + x3(t)*b2 │ x3'(t) = x2(t)*a2 - x3(t)*b2 │ y(t) = x1(t) │ , ident_funcs = QQMPolyRingElem[a1, a2, b1, b2]) │ simplify = :weak │ R = │ Multivariate polynomial ring in 9 variables x1(t), x2(t), x3(t), y(t), ..., b2 │ over rational field └ with_states = false [ Info: Computing IO-equations [ Info: Computed IO-equations in 0.005340098 seconds [ Info: Computing Wronskians [ Info: Computed Wronskians in 0.003047851 seconds [ Info: Dimensions of the Wronskians [5] [ Info: Ranks of the Wronskians computed in 2.116e-5 seconds [ Info: Simplifying generating set. Simplification level: weak [ Info: Search for polynomial generators concluded in 8.9519e-5 [ Info: Selecting generators in 0.001850262 [ Info: Inclusion checked with probability 0.995 in 0.003849893 seconds [ Info: The search for identifiable functions concluded in 0.024986475 seconds ┌ Info: Test, result_funcs = │ AbstractAlgebra.Generic.FracFieldElem{QQMPolyRingElem}[b2, b1, a2, a1] │ case = │ (ode = x1'(t) = -x1(t)*a1 + x2(t)*b1 + u(t) │ x2'(t) = x1(t)*a1 - x2(t)*a2 - x2(t)*b1 + x3(t)*b2 │ x3'(t) = x2(t)*a2 - x3(t)*b2 │ y(t) = x1(t) │ , ident_funcs = QQMPolyRingElem[a1, a2, b1, b2]) │ simplify = :weak │ R = │ Multivariate polynomial ring in 9 variables x1(t), x2(t), x3(t), y(t), ..., b2 │ over rational field └ with_states = false [ Info: Computing IO-equations [ Info: Computed IO-equations in 0.004912682 seconds [ Info: Computing Wronskians [ Info: Computed Wronskians in 0.002920971 seconds [ Info: Dimensions of the Wronskians [5] [ Info: Ranks of the Wronskians computed in 1.907e-5 seconds [ Info: Simplifying generating set. Simplification level: weak [ Info: Search for polynomial generators concluded in 0.000106359 [ Info: Selecting generators in 0.001913122 [ Info: Inclusion checked with probability 0.995 in 0.003843282 seconds [ Info: The search for identifiable functions concluded in 0.024016455 seconds ┌ Info: Test, result_funcs = │ AbstractAlgebra.Generic.FracFieldElem{QQMPolyRingElem}[b2, b1, a2, a1] │ case = │ (ode = x1'(t) = -x1(t)*a1 + x2(t)*b1 + u(t) │ x2'(t) = x1(t)*a1 - x2(t)*a2 - x2(t)*b1 + x3(t)*b2 │ x3'(t) = x2(t)*a2 - x3(t)*b2 │ y(t) = x1(t) │ , ident_funcs = QQMPolyRingElem[a1, a2, b1, b2]) │ simplify = :weak │ R = │ Multivariate polynomial ring in 9 variables x1(t), x2(t), x3(t), y(t), ..., b2 │ over rational field └ with_states = false [ Info: Computing IO-equations [ Info: Computed IO-equations in 0.004947632 seconds [ Info: Computing Wronskians [ Info: Computed Wronskians in 0.002804852 seconds [ Info: Dimensions of the Wronskians [5] [ Info: Ranks of the Wronskians computed in 1.943e-5 seconds [ Info: Simplifying generating set. Simplification level: standard [ Info: Search for polynomial generators concluded in 0.001195538 [ Info: Selecting generators in 0.001909471 [ Info: Inclusion checked with probability 0.995 in 0.003953361 seconds [ Info: The search for identifiable functions concluded in 0.025042805 seconds ┌ Info: Test, result_funcs = │ AbstractAlgebra.Generic.FracFieldElem{QQMPolyRingElem}[b2, b1, a2, a1] │ case = │ (ode = x1'(t) = -x1(t)*a1 + x2(t)*b1 + u(t) │ x2'(t) = x1(t)*a1 - x2(t)*a2 - x2(t)*b1 + x3(t)*b2 │ x3'(t) = x2(t)*a2 - x3(t)*b2 │ y(t) = x1(t) │ , ident_funcs = QQMPolyRingElem[a1, a2, b1, b2]) │ simplify = :standard │ R = │ Multivariate polynomial ring in 9 variables x1(t), x2(t), x3(t), y(t), ..., b2 │ over rational field └ with_states = false [ Info: QQMPolyRingElem[x1(t), x2(t), x3(t), y(t), u(t), a1, a2, b1, b2] [ Info: Computing IO-equations [ Info: Computed IO-equations in 0.004951011 seconds [ Info: Computing Wronskians [ Info: Computed Wronskians in 0.002966651 seconds [ Info: Dimensions of the Wronskians [5] [ Info: Ranks of the Wronskians computed in 1.884e-5 seconds [ Info: Simplifying generating set. Simplification level: standard [ Info: Search for polynomial generators concluded in 0.001146588 [ Info: Selecting generators in 0.001815422 [ Info: Inclusion checked with probability 0.995 in 0.003760553 seconds [ Info: The search for identifiable functions concluded in 0.024974276 seconds ┌ Info: Test, result_funcs = │ AbstractAlgebra.Generic.FracFieldElem{QQMPolyRingElem}[b2, b1, a2, a1] │ case = │ (ode = x1'(t) = -x1(t)*a1 + x2(t)*b1 + u(t) │ x2'(t) = x1(t)*a1 - x2(t)*a2 - x2(t)*b1 + x3(t)*b2 │ x3'(t) = x2(t)*a2 - x3(t)*b2 │ y(t) = x1(t) │ , ident_funcs = QQMPolyRingElem[a1, a2, b1, b2]) │ simplify = :standard │ R = │ Multivariate polynomial ring in 9 variables x1(t), x2(t), x3(t), y(t), ..., b2 │ over rational field └ with_states = false [ Info: QQMPolyRingElem[x1(t), x2(t), x3(t), y(t), u(t), a1, a2, b1, b2] [ Info: Computing IO-equations [ Info: Computed IO-equations in 0.004998711 seconds [ Info: Computing Wronskians [ Info: Computed Wronskians in 0.002961201 seconds [ Info: Dimensions of the Wronskians [5] [ Info: Ranks of the Wronskians computed in 1.665e-5 seconds [ Info: Simplifying generating set. Simplification level: standard [ Info: Search for polynomial generators concluded in 0.001214519 [ Info: Selecting generators in 0.001923611 [ Info: Inclusion checked with probability 0.995 in 0.003838202 seconds [ Info: The search for identifiable functions concluded in 0.025425051 seconds ┌ Info: Test, result_funcs = │ AbstractAlgebra.Generic.FracFieldElem{QQMPolyRingElem}[b2, b1, a2, a1] │ case = │ (ode = x1'(t) = -x1(t)*a1 + x2(t)*b1 + u(t) │ x2'(t) = x1(t)*a1 - x2(t)*a2 - x2(t)*b1 + x3(t)*b2 │ x3'(t) = x2(t)*a2 - x3(t)*b2 │ y(t) = x1(t) │ , ident_funcs = QQMPolyRingElem[a1, a2, b1, b2]) │ simplify = :standard │ R = │ Multivariate polynomial ring in 9 variables x1(t), x2(t), x3(t), y(t), ..., b2 │ over rational field └ with_states = false [ Info: QQMPolyRingElem[x1(t), x2(t), x3(t), y(t), u(t), a1, a2, b1, b2] [ Info: Computing IO-equations [ Info: Computed IO-equations in 0.004916002 seconds [ Info: Computing Wronskians [ Info: Computed Wronskians in 0.002886612 seconds [ Info: Dimensions of the Wronskians [4] [ Info: Ranks of the Wronskians computed in 2.0669e-5 seconds [ Info: Simplifying generating set. Simplification level: weak [ Info: Search for polynomial generators concluded in 9.2459e-5 [ Info: Selecting generators in 0.002314808 [ Info: Inclusion checked with probability 0.995 in 0.003626264 seconds [ Info: The search for identifiable functions concluded in 0.027633719 seconds ┌ Info: Test, result_funcs = │ AbstractAlgebra.Generic.FracFieldElem{QQMPolyRingElem}[a1 + a2 + b1 + b2, b1*b2, a1*a2 + a1*b2 + b1*b2] │ case = │ (ode = x1'(t) = -x1(t)*a1 + x2(t)*b1 │ x2'(t) = x1(t)*a1 - x2(t)*a2 - x2(t)*b1 + x3(t)*b2 │ x3'(t) = x2(t)*a2 - x3(t)*b2 + u(t) │ y(t) = x1(t) │ , ident_funcs = QQMPolyRingElem[b1*b2, a1 + a2 + b1 + b2, a1*a2 + a1*b2]) │ simplify = :weak │ R = │ Multivariate polynomial ring in 9 variables x1(t), x2(t), x3(t), y(t), ..., b2 │ over rational field └ with_states = false [ Info: Computing IO-equations [ Info: Computed IO-equations in 0.004827843 seconds [ Info: Computing Wronskians [ Info: Computed Wronskians in 0.002888282 seconds [ Info: Dimensions of the Wronskians [4] [ Info: Ranks of the Wronskians computed in 1.8909e-5 seconds [ Info: Simplifying generating set. Simplification level: weak [ Info: Search for polynomial generators concluded in 9.0379e-5 [ Info: Selecting generators in 0.002321948 [ Info: Inclusion checked with probability 0.995 in 0.003725773 seconds [ Info: The search for identifiable functions concluded in 0.027904017 seconds ┌ Info: Test, result_funcs = │ AbstractAlgebra.Generic.FracFieldElem{QQMPolyRingElem}[a1 + a2 + b1 + b2, b1*b2, a1*a2 + a1*b2 + b1*b2] │ case = │ (ode = x1'(t) = -x1(t)*a1 + x2(t)*b1 │ x2'(t) = x1(t)*a1 - x2(t)*a2 - x2(t)*b1 + x3(t)*b2 │ x3'(t) = x2(t)*a2 - x3(t)*b2 + u(t) │ y(t) = x1(t) │ , ident_funcs = QQMPolyRingElem[b1*b2, a1 + a2 + b1 + b2, a1*a2 + a1*b2]) │ simplify = :weak │ R = │ Multivariate polynomial ring in 9 variables x1(t), x2(t), x3(t), y(t), ..., b2 │ over rational field └ with_states = false [ Info: Computing IO-equations [ Info: Computed IO-equations in 0.005313458 seconds [ Info: Computing Wronskians [ Info: Computed Wronskians in 0.003080459 seconds [ Info: Dimensions of the Wronskians [4] [ Info: Ranks of the Wronskians computed in 1.968e-5 seconds [ Info: Simplifying generating set. Simplification level: weak [ Info: Search for polynomial generators concluded in 9.5539e-5 [ Info: Selecting generators in 0.002376367 [ Info: Inclusion checked with probability 0.995 in 0.003771713 seconds [ Info: The search for identifiable functions concluded in 0.029152284 seconds ┌ Info: Test, result_funcs = │ AbstractAlgebra.Generic.FracFieldElem{QQMPolyRingElem}[a1 + a2 + b1 + b2, b1*b2, a1*a2 + a1*b2 + b1*b2] │ case = │ (ode = x1'(t) = -x1(t)*a1 + x2(t)*b1 │ x2'(t) = x1(t)*a1 - x2(t)*a2 - x2(t)*b1 + x3(t)*b2 │ x3'(t) = x2(t)*a2 - x3(t)*b2 + u(t) │ y(t) = x1(t) │ , ident_funcs = QQMPolyRingElem[b1*b2, a1 + a2 + b1 + b2, a1*a2 + a1*b2]) │ simplify = :weak │ R = │ Multivariate polynomial ring in 9 variables x1(t), x2(t), x3(t), y(t), ..., b2 │ over rational field └ with_states = false [ Info: Computing IO-equations [ Info: Computed IO-equations in 0.005482057 seconds [ Info: Computing Wronskians [ Info: Computed Wronskians in 0.003307107 seconds [ Info: Dimensions of the Wronskians [4] [ Info: Ranks of the Wronskians computed in 2.161e-5 seconds [ Info: Simplifying generating set. Simplification level: standard [ Info: Search for polynomial generators concluded in 0.0164113 [ Info: Selecting generators in 0.003421147 [ Info: Inclusion checked with probability 0.995 in 0.003425926 seconds [ Info: The search for identifiable functions concluded in 0.046576973 seconds ┌ Info: Test, result_funcs = │ AbstractAlgebra.Generic.FracFieldElem{QQMPolyRingElem}[a1 + a2 + b1 + b2, b1*b2, a1*a2 + a1*b2] │ case = │ (ode = x1'(t) = -x1(t)*a1 + x2(t)*b1 │ x2'(t) = x1(t)*a1 - x2(t)*a2 - x2(t)*b1 + x3(t)*b2 │ x3'(t) = x2(t)*a2 - x3(t)*b2 + u(t) │ y(t) = x1(t) │ , ident_funcs = QQMPolyRingElem[b1*b2, a1 + a2 + b1 + b2, a1*a2 + a1*b2]) │ simplify = :standard │ R = │ Multivariate polynomial ring in 9 variables x1(t), x2(t), x3(t), y(t), ..., b2 │ over rational field └ with_states = false [ Info: QQMPolyRingElem[x1(t), x2(t), x3(t), y(t), u(t), a1, a2, b1, b2] [ Info: Computing IO-equations [ Info: Computed IO-equations in 0.005453377 seconds [ Info: Computing Wronskians [ Info: Computed Wronskians in 0.003286028 seconds [ Info: Dimensions of the Wronskians [4] [ Info: Ranks of the Wronskians computed in 1.86e-5 seconds [ Info: Simplifying generating set. Simplification level: standard [ Info: Search for polynomial generators concluded in 0.016448049 [ Info: Selecting generators in 0.003730653 [ Info: Inclusion checked with probability 0.995 in 0.003524006 seconds [ Info: The search for identifiable functions concluded in 0.045763922 seconds ┌ Info: Test, result_funcs = │ AbstractAlgebra.Generic.FracFieldElem{QQMPolyRingElem}[a1 + a2 + b1 + b2, b1*b2, a1*a2 + a1*b2] │ case = │ (ode = x1'(t) = -x1(t)*a1 + x2(t)*b1 │ x2'(t) = x1(t)*a1 - x2(t)*a2 - x2(t)*b1 + x3(t)*b2 │ x3'(t) = x2(t)*a2 - x3(t)*b2 + u(t) │ y(t) = x1(t) │ , ident_funcs = QQMPolyRingElem[b1*b2, a1 + a2 + b1 + b2, a1*a2 + a1*b2]) │ simplify = :standard │ R = │ Multivariate polynomial ring in 9 variables x1(t), x2(t), x3(t), y(t), ..., b2 │ over rational field └ with_states = false [ Info: QQMPolyRingElem[x1(t), x2(t), x3(t), y(t), u(t), a1, a2, b1, b2] [ Info: Computing IO-equations [ Info: Computed IO-equations in 0.005022281 seconds [ Info: Computing Wronskians [ Info: Computed Wronskians in 0.003254838 seconds [ Info: Dimensions of the Wronskians [4] [ Info: Ranks of the Wronskians computed in 1.849e-5 seconds [ Info: Simplifying generating set. Simplification level: standard [ Info: Search for polynomial generators concluded in 0.016962934 [ Info: Selecting generators in 0.003570015 [ Info: Inclusion checked with probability 0.995 in 0.003437676 seconds [ Info: The search for identifiable functions concluded in 0.045310546 seconds ┌ Info: Test, result_funcs = │ AbstractAlgebra.Generic.FracFieldElem{QQMPolyRingElem}[a1 + a2 + b1 + b2, b1*b2, a1*a2 + a1*b2] │ case = │ (ode = x1'(t) = -x1(t)*a1 + x2(t)*b1 │ x2'(t) = x1(t)*a1 - x2(t)*a2 - x2(t)*b1 + x3(t)*b2 │ x3'(t) = x2(t)*a2 - x3(t)*b2 + u(t) │ y(t) = x1(t) │ , ident_funcs = QQMPolyRingElem[b1*b2, a1 + a2 + b1 + b2, a1*a2 + a1*b2]) │ simplify = :standard │ R = │ Multivariate polynomial ring in 9 variables x1(t), x2(t), x3(t), y(t), ..., b2 │ over rational field └ with_states = false [ Info: QQMPolyRingElem[x1(t), x2(t), x3(t), y(t), u(t), a1, a2, b1, b2] [ Info: Computing IO-equations [ Info: Computed IO-equations in 0.002440816 seconds [ Info: Computing Wronskians [ Info: Computed Wronskians in 0.001853351 seconds [ Info: Dimensions of the Wronskians [3] [ Info: Ranks of the Wronskians computed in 1.5029e-5 seconds [ Info: Simplifying generating set. Simplification level: weak [ Info: Search for polynomial generators concluded in 8.7879e-5 [ Info: Selecting generators in 0.001713673 [ Info: Inclusion checked with probability 0.995 in 0.003137859 seconds [ Info: The search for identifiable functions concluded in 0.017750356 seconds ┌ Info: Test, result_funcs = │ AbstractAlgebra.Generic.FracFieldElem{QQMPolyRingElem}[p1 + p4, p1*p4 - p2*p3] │ case = │ (ode = x1'(t) = x1(t)^2*p1 + x1(t)*x2(t)*p2 │ x2'(t) = x1(t)^2*p3 + x1(t)*x2(t)*p4 │ y(t) = x1(t) │ , ident_funcs = QQMPolyRingElem[p1 + p4, p1*p4 - p2*p3]) │ simplify = :weak │ R = │ Multivariate polynomial ring in 7 variables x1(t), x2(t), y(t), p1, ..., p4 │ over rational field └ with_states = false [ Info: Computing IO-equations [ Info: Computed IO-equations in 0.002491605 seconds [ Info: Computing Wronskians [ Info: Computed Wronskians in 0.001905011 seconds [ Info: Dimensions of the Wronskians [3] [ Info: Ranks of the Wronskians computed in 3.894e-5 seconds [ Info: Simplifying generating set. Simplification level: weak [ Info: Search for polynomial generators concluded in 8.8779e-5 [ Info: Selecting generators in 0.001600845 [ Info: Inclusion checked with probability 0.995 in 0.0030851 seconds [ Info: The search for identifiable functions concluded in 2.722396165 seconds ┌ Info: Test, result_funcs = │ AbstractAlgebra.Generic.FracFieldElem{QQMPolyRingElem}[p1 + p4, p1*p4 - p2*p3] │ case = │ (ode = x1'(t) = x1(t)^2*p1 + x1(t)*x2(t)*p2 │ x2'(t) = x1(t)^2*p3 + x1(t)*x2(t)*p4 │ y(t) = x1(t) │ , ident_funcs = QQMPolyRingElem[p1 + p4, p1*p4 - p2*p3]) │ simplify = :weak │ R = │ Multivariate polynomial ring in 7 variables x1(t), x2(t), y(t), p1, ..., p4 │ over rational field └ with_states = false [ Info: Computing IO-equations [ Info: Computed IO-equations in 0.002704233 seconds [ Info: Computing Wronskians [ Info: Computed Wronskians in 0.002161579 seconds [ Info: Dimensions of the Wronskians [3] [ Info: Ranks of the Wronskians computed in 2.03e-5 seconds [ Info: Simplifying generating set. Simplification level: weak [ Info: Search for polynomial generators concluded in 0.000115518 [ Info: Selecting generators in 0.001954121 [ Info: Inclusion checked with probability 0.995 in 0.003749283 seconds [ Info: The search for identifiable functions concluded in 0.020486249 seconds ┌ Info: Test, result_funcs = │ AbstractAlgebra.Generic.FracFieldElem{QQMPolyRingElem}[p1 + p4, p1*p4 - p2*p3] │ case = │ (ode = x1'(t) = x1(t)^2*p1 + x1(t)*x2(t)*p2 │ x2'(t) = x1(t)^2*p3 + x1(t)*x2(t)*p4 │ y(t) = x1(t) │ , ident_funcs = QQMPolyRingElem[p1 + p4, p1*p4 - p2*p3]) │ simplify = :weak │ R = │ Multivariate polynomial ring in 7 variables x1(t), x2(t), y(t), p1, ..., p4 │ over rational field └ with_states = false [ Info: Computing IO-equations [ Info: Computed IO-equations in 0.002884561 seconds [ Info: Computing Wronskians [ Info: Computed Wronskians in 0.002183568 seconds [ Info: Dimensions of the Wronskians [3] [ Info: Ranks of the Wronskians computed in 2.047e-5 seconds [ Info: Simplifying generating set. Simplification level: standard [ Info: Search for polynomial generators concluded in 0.014854615 [ Info: Selecting generators in 0.003345737 [ Info: Inclusion checked with probability 0.995 in 0.003745533 seconds [ Info: The search for identifiable functions concluded in 0.036888199 seconds ┌ Info: Test, result_funcs = │ AbstractAlgebra.Generic.FracFieldElem{QQMPolyRingElem}[p1 + p4, p1*p4 - p2*p3] │ case = │ (ode = x1'(t) = x1(t)^2*p1 + x1(t)*x2(t)*p2 │ x2'(t) = x1(t)^2*p3 + x1(t)*x2(t)*p4 │ y(t) = x1(t) │ , ident_funcs = QQMPolyRingElem[p1 + p4, p1*p4 - p2*p3]) │ simplify = :standard │ R = │ Multivariate polynomial ring in 7 variables x1(t), x2(t), y(t), p1, ..., p4 │ over rational field └ with_states = false [ Info: QQMPolyRingElem[x1(t), x2(t), y(t), p1, p2, p3, p4] [ Info: Computing IO-equations [ Info: Computed IO-equations in 0.002800252 seconds [ Info: Computing Wronskians [ Info: Computed Wronskians in 0.002160708 seconds [ Info: Dimensions of the Wronskians [3] [ Info: Ranks of the Wronskians computed in 2.017e-5 seconds [ Info: Simplifying generating set. Simplification level: standard [ Info: Search for polynomial generators concluded in 0.013478498 [ Info: Selecting generators in 0.003618614 [ Info: Inclusion checked with probability 0.995 in 0.003705464 seconds [ Info: The search for identifiable functions concluded in 0.034984558 seconds ┌ Info: Test, result_funcs = │ AbstractAlgebra.Generic.FracFieldElem{QQMPolyRingElem}[p1 + p4, p1*p4 - p2*p3] │ case = │ (ode = x1'(t) = x1(t)^2*p1 + x1(t)*x2(t)*p2 │ x2'(t) = x1(t)^2*p3 + x1(t)*x2(t)*p4 │ y(t) = x1(t) │ , ident_funcs = QQMPolyRingElem[p1 + p4, p1*p4 - p2*p3]) │ simplify = :standard │ R = │ Multivariate polynomial ring in 7 variables x1(t), x2(t), y(t), p1, ..., p4 │ over rational field └ with_states = false [ Info: QQMPolyRingElem[x1(t), x2(t), y(t), p1, p2, p3, p4] [ Info: Computing IO-equations [ Info: Computed IO-equations in 0.002911532 seconds [ Info: Computing Wronskians [ Info: Computed Wronskians in 0.0020721 seconds [ Info: Dimensions of the Wronskians [3] [ Info: Ranks of the Wronskians computed in 1.934e-5 seconds [ Info: Simplifying generating set. Simplification level: standard [ Info: Search for polynomial generators concluded in 0.013790005 [ Info: Selecting generators in 0.003376087 [ Info: Inclusion checked with probability 0.995 in 0.003745373 seconds [ Info: The search for identifiable functions concluded in 0.03570731 seconds ┌ Info: Test, result_funcs = │ AbstractAlgebra.Generic.FracFieldElem{QQMPolyRingElem}[p1 + p4, p1*p4 - p2*p3] │ case = │ (ode = x1'(t) = x1(t)^2*p1 + x1(t)*x2(t)*p2 │ x2'(t) = x1(t)^2*p3 + x1(t)*x2(t)*p4 │ y(t) = x1(t) │ , ident_funcs = QQMPolyRingElem[p1 + p4, p1*p4 - p2*p3]) │ simplify = :standard │ R = │ Multivariate polynomial ring in 7 variables x1(t), x2(t), y(t), p1, ..., p4 │ over rational field └ with_states = false [ Info: QQMPolyRingElem[x1(t), x2(t), y(t), p1, p2, p3, p4] [ Info: Computing IO-equations [ Info: Computed IO-equations in 0.015756305 seconds [ Info: Computing Wronskians [ Info: Computed Wronskians in 0.034146456 seconds [ Info: Dimensions of the Wronskians [69] [ Info: Ranks of the Wronskians computed in 0.000282037 seconds [ Info: Simplifying generating set. Simplification level: weak ⌜ # Computing specializations.. Time: 0:00:10 ✓ # Computing specializations.. Time: 0:00:10 [ Info: Search for polynomial generators concluded in 0.000166369 [ Info: Selecting generators in 0.014925364 [ Info: Inclusion checked with probability 0.995 in 0.026213993 seconds [ Info: The search for identifiable functions concluded in 18.201996275 seconds ┌ Info: Test, result_funcs = │ AbstractAlgebra.Generic.FracFieldElem{QQMPolyRingElem}[sigma, c, b, beta + delta, beta*delta] │ case = │ (ode = x1'(t) = (-x1(t)*x4(t)*b - x1(t)*b*c + 1)//(x4(t) + c) │ x2'(t) = x1(t)*alpha - x2(t)*beta │ x3'(t) = x2(t)*gama - x3(t)*delta │ x4'(t) = (x2(t)*x4(t)*gama*sigma - x3(t)*x4(t)*delta*sigma)//x3(t) │ y(t) = x1(t) │ , ident_funcs = QQMPolyRingElem[sigma, beta + delta, c, b, beta*delta]) │ simplify = :weak │ R = │ Multivariate polynomial ring in 12 variables x1(t), x2(t), x3(t), x4(t), ..., sigma │ over rational field └ with_states = false [ Info: Computing IO-equations [ Info: Computed IO-equations in 0.01431252 seconds [ Info: Computing Wronskians [ Info: Computed Wronskians in 0.02756046 seconds [ Info: Dimensions of the Wronskians [69] [ Info: Ranks of the Wronskians computed in 0.000315757 seconds [ Info: Simplifying generating set. Simplification level: weak [ Info: Search for polynomial generators concluded in 0.000105189 [ Info: Selecting generators in 0.014994883 [ Info: Inclusion checked with probability 0.995 in 0.026011615 seconds [ Info: The search for identifiable functions concluded in 0.151244269 seconds ┌ Info: Test, result_funcs = │ AbstractAlgebra.Generic.FracFieldElem{QQMPolyRingElem}[sigma, c, b, beta + delta, beta*delta] │ case = │ (ode = x1'(t) = (-x1(t)*x4(t)*b - x1(t)*b*c + 1)//(x4(t) + c) │ x2'(t) = x1(t)*alpha - x2(t)*beta │ x3'(t) = x2(t)*gama - x3(t)*delta │ x4'(t) = (x2(t)*x4(t)*gama*sigma - x3(t)*x4(t)*delta*sigma)//x3(t) │ y(t) = x1(t) │ , ident_funcs = QQMPolyRingElem[sigma, beta + delta, c, b, beta*delta]) │ simplify = :weak │ R = │ Multivariate polynomial ring in 12 variables x1(t), x2(t), x3(t), x4(t), ..., sigma │ over rational field └ with_states = false [ Info: Computing IO-equations [ Info: Computed IO-equations in 0.013078111 seconds [ Info: Computing Wronskians [ Info: Computed Wronskians in 0.028432561 seconds [ Info: Dimensions of the Wronskians [69] [ Info: Ranks of the Wronskians computed in 0.000326917 seconds [ Info: Simplifying generating set. Simplification level: weak [ Info: Search for polynomial generators concluded in 0.000105579 [ Info: Selecting generators in 0.014935424 [ Info: Inclusion checked with probability 0.995 in 0.025154303 seconds [ Info: The search for identifiable functions concluded in 0.14906738 seconds ┌ Info: Test, result_funcs = │ AbstractAlgebra.Generic.FracFieldElem{QQMPolyRingElem}[sigma, c, b, beta + delta, beta*delta] │ case = │ (ode = x1'(t) = (-x1(t)*x4(t)*b - x1(t)*b*c + 1)//(x4(t) + c) │ x2'(t) = x1(t)*alpha - x2(t)*beta │ x3'(t) = x2(t)*gama - x3(t)*delta │ x4'(t) = (x2(t)*x4(t)*gama*sigma - x3(t)*x4(t)*delta*sigma)//x3(t) │ y(t) = x1(t) │ , ident_funcs = QQMPolyRingElem[sigma, beta + delta, c, b, beta*delta]) │ simplify = :weak │ R = │ Multivariate polynomial ring in 12 variables x1(t), x2(t), x3(t), x4(t), ..., sigma │ over rational field └ with_states = false [ Info: Computing IO-equations [ Info: Computed IO-equations in 0.012870564 seconds [ Info: Computing Wronskians [ Info: Computed Wronskians in 0.028182924 seconds [ Info: Dimensions of the Wronskians [69] [ Info: Ranks of the Wronskians computed in 0.000300857 seconds [ Info: Simplifying generating set. Simplification level: standard [ Info: Search for polynomial generators concluded in 1.283796827 [ Info: Selecting generators in 0.019023734 [ Info: Inclusion checked with probability 0.995 in 0.032021606 seconds [ Info: The search for identifiable functions concluded in 1.441550791 seconds ┌ Info: Test, result_funcs = │ AbstractAlgebra.Generic.FracFieldElem{QQMPolyRingElem}[sigma, c, b, beta + delta, beta*delta] │ case = │ (ode = x1'(t) = (-x1(t)*x4(t)*b - x1(t)*b*c + 1)//(x4(t) + c) │ x2'(t) = x1(t)*alpha - x2(t)*beta │ x3'(t) = x2(t)*gama - x3(t)*delta │ x4'(t) = (x2(t)*x4(t)*gama*sigma - x3(t)*x4(t)*delta*sigma)//x3(t) │ y(t) = x1(t) │ , ident_funcs = QQMPolyRingElem[sigma, beta + delta, c, b, beta*delta]) │ simplify = :standard │ R = │ Multivariate polynomial ring in 12 variables x1(t), x2(t), x3(t), x4(t), ..., sigma │ over rational field └ with_states = false [ Info: QQMPolyRingElem[x1(t), x2(t), x3(t), x4(t), y(t), alpha, b, beta, c, delta, gama, sigma] [ Info: Computing IO-equations [ Info: Computed IO-equations in 0.016989904 seconds [ Info: Computing Wronskians [ Info: Computed Wronskians in 0.034252125 seconds [ Info: Dimensions of the Wronskians [69] [ Info: Ranks of the Wronskians computed in 0.000294157 seconds [ Info: Simplifying generating set. Simplification level: standard [ Info: Search for polynomial generators concluded in 0.056997932 [ Info: Selecting generators in 0.018433819 [ Info: Inclusion checked with probability 0.995 in 0.029896577 seconds [ Info: The search for identifiable functions concluded in 0.641569986 seconds ┌ Info: Test, result_funcs = │ AbstractAlgebra.Generic.FracFieldElem{QQMPolyRingElem}[sigma, c, b, beta + delta, beta*delta] │ case = │ (ode = x1'(t) = (-x1(t)*x4(t)*b - x1(t)*b*c + 1)//(x4(t) + c) │ x2'(t) = x1(t)*alpha - x2(t)*beta │ x3'(t) = x2(t)*gama - x3(t)*delta │ x4'(t) = (x2(t)*x4(t)*gama*sigma - x3(t)*x4(t)*delta*sigma)//x3(t) │ y(t) = x1(t) │ , ident_funcs = QQMPolyRingElem[sigma, beta + delta, c, b, beta*delta]) │ simplify = :standard │ R = │ Multivariate polynomial ring in 12 variables x1(t), x2(t), x3(t), x4(t), ..., sigma │ over rational field └ with_states = false [ Info: QQMPolyRingElem[x1(t), x2(t), x3(t), x4(t), y(t), alpha, b, beta, c, delta, gama, sigma] [ Info: Computing IO-equations [ Info: Computed IO-equations in 0.015641277 seconds [ Info: Computing Wronskians [ Info: Computed Wronskians in 0.030761579 seconds [ Info: Dimensions of the Wronskians [69] [ Info: Ranks of the Wronskians computed in 0.000339967 seconds [ Info: Simplifying generating set. Simplification level: standard [ Info: Search for polynomial generators concluded in 0.052920112 [ Info: Selecting generators in 0.01738175 [ Info: Inclusion checked with probability 0.995 in 0.029115445 seconds [ Info: The search for identifiable functions concluded in 0.225896767 seconds ┌ Info: Test, result_funcs = │ AbstractAlgebra.Generic.FracFieldElem{QQMPolyRingElem}[sigma, c, b, beta + delta, beta*delta] │ case = │ (ode = x1'(t) = (-x1(t)*x4(t)*b - x1(t)*b*c + 1)//(x4(t) + c) │ x2'(t) = x1(t)*alpha - x2(t)*beta │ x3'(t) = x2(t)*gama - x3(t)*delta │ x4'(t) = (x2(t)*x4(t)*gama*sigma - x3(t)*x4(t)*delta*sigma)//x3(t) │ y(t) = x1(t) │ , ident_funcs = QQMPolyRingElem[sigma, beta + delta, c, b, beta*delta]) │ simplify = :standard │ R = │ Multivariate polynomial ring in 12 variables x1(t), x2(t), x3(t), x4(t), ..., sigma │ over rational field └ with_states = false [ Info: QQMPolyRingElem[x1(t), x2(t), x3(t), x4(t), y(t), alpha, b, beta, c, delta, gama, sigma] [ Info: Computing IO-equations [ Info: Computed IO-equations in 3.617636449 seconds [ Info: Computing Wronskians [ Info: Computed Wronskians in 8.99156102 seconds [ Info: Dimensions of the Wronskians [830, 3] [ Info: Ranks of the Wronskians computed in 0.206210871 seconds [ Info: Simplifying generating set. Simplification level: weak ⌜ # Computing specializations.. Time: 0:00:00 ✓ # Computing specializations.. Time: 0:00:00 ⌜ # Computing specializations.. Time: 0:00:00 ⌝ # Computing specializations.. Time: 0:00:00 ✓ # Computing specializations.. Time: 0:00:00 ⌜ # Computing specializations.. Time: 0:00:00 Points: 7   ✓ # Computing specializations.. Time: 0:00:00 ====================================================================================== Information request received. A stacktrace will print followed by a 1.0 second profile. --trace-compile is enabled during profile collection. ====================================================================================== cmd: /opt/julia/bin/julia 28 running 1 of 1 signal (10): User defined signal 1 getindex at ./essentials.jl:1040:10 [inlined] monom_is_divisible at /home/pkgeval/.julia/packages/Groebner/Q7HGS/src/monomials/exponent_vector.jl:311:33 [inlined] monom_is_divisible! at /home/pkgeval/.julia/packages/Groebner/Q7HGS/src/monomials/exponent_vector.jl:325:28 f4_find_multiplied_reducer! at /home/pkgeval/.julia/packages/Groebner/Q7HGS/src/f4/f4.jl:266:63 f4_symbolic_preprocessing! at /home/pkgeval/.julia/packages/Groebner/Q7HGS/src/f4/f4.jl:84:53 f4_normalform! at /home/pkgeval/.julia/packages/Groebner/Q7HGS/src/f4/f4.jl:488:24 _normalform2 at /home/pkgeval/.julia/packages/Groebner/Q7HGS/src/groebner/normalform.jl:140:17 normalform2 at /home/pkgeval/.julia/packages/Groebner/Q7HGS/src/groebner/normalform.jl:119:67 unknown function (ip: 0x7a6afb2777ff) at (unknown file) _jl_invoke at /source/src/gf.c:4127:23 [inlined] ijl_apply_generic at /source/src/gf.c:4353:12 __normalform1 at /home/pkgeval/.julia/packages/Groebner/Q7HGS/src/groebner/normalform.jl:79:62 unknown function (ip: 0x7a6afb273bc7) at (unknown file) _jl_invoke at /source/src/gf.c:4127:23 [inlined] ijl_apply_generic at /source/src/gf.c:4353:12 _normalform1 at /home/pkgeval/.julia/packages/Groebner/Q7HGS/src/groebner/normalform.jl:49:5 unknown function (ip: 0x7a6afb2735fd) at (unknown file) _jl_invoke at /source/src/gf.c:4127:23 [inlined] ijl_apply_generic at /source/src/gf.c:4353:12 normalform0 at /home/pkgeval/.julia/packages/Groebner/Q7HGS/src/groebner/normalform.jl:16:40 #normalform#212 at /home/pkgeval/.julia/packages/Groebner/Q7HGS/src/interface.jl:580:5 [inlined] normalform at /home/pkgeval/.julia/packages/Groebner/Q7HGS/src/interface.jl:578:4 unknown function (ip: 0x7a6afb2728d6) at (unknown file) _jl_invoke at /source/src/gf.c:4127:23 [inlined] ijl_apply_generic at /source/src/gf.c:4353:12 field_contains_algebraic_mod_p at /home/pkgeval/.julia/packages/RationalFunctionFields/E2pFC/src/Field.jl:232:42 issubfield_mod_p at /home/pkgeval/.julia/packages/RationalFunctionFields/E2pFC/src/Field.jl:287:15 issubfield_mod_p at /home/pkgeval/.julia/packages/RationalFunctionFields/E2pFC/src/Field.jl:284:7 [inlined] #groebner_basis_coeffs#135 at /home/pkgeval/.julia/packages/RationalFunctionFields/E2pFC/src/simplification.jl:147:487 groebner_basis_coeffs at /home/pkgeval/.julia/packages/RationalFunctionFields/E2pFC/src/simplification.jl:147:46 unknown function (ip: 0x7a6afb300091) at (unknown file) _jl_invoke at /source/src/gf.c:4127:23 [inlined] ijl_apply_generic at /source/src/gf.c:4353:12 #simplified_generating_set#137 at /home/pkgeval/.julia/packages/RationalFunctionFields/E2pFC/src/simplification.jl:319:261 simplified_generating_set at /home/pkgeval/.julia/packages/RationalFunctionFields/E2pFC/src/simplification.jl:319:66 unknown function (ip: 0x7a6af7261bb4) at (unknown file) _jl_invoke at /source/src/gf.c:4127:23 [inlined] ijl_apply_generic at /source/src/gf.c:4353:12 [ Info: Search for polynomial generators concluded in 0.000161908 #_find_identifiable_functions#243 at /home/pkgeval/.julia/packages/StructuralIdentifiability/31snG/src/identifiable_functions.jl:119:162 _find_identifiable_functions at /home/pkgeval/.julia/packages/StructuralIdentifiability/31snG/src/identifiable_functions.jl:85:53 [inlined] #241 at /home/pkgeval/.julia/packages/StructuralIdentifiability/31snG/src/identifiable_functions.jl:62:16 with_logstate at ./logging/logging.jl:542:15 with_logger at ./logging/logging.jl:653:5 [inlined] #find_identifiable_functions#239 at /home/pkgeval/.julia/packages/StructuralIdentifiability/31snG/src/identifiable_functions.jl:60:23 [inlined] find_identifiable_functions at /home/pkgeval/.julia/packages/StructuralIdentifiability/31snG/src/identifiable_functions.jl:48:95 unknown function (ip: 0x7a6af7260fc0) at (unknown file) _jl_invoke at /source/src/gf.c:4127:23 [inlined] ijl_apply_generic at /source/src/gf.c:4353:12 jl_apply at /source/src/julia.h:2328:12 [inlined] do_call at /source/src/interpreter.c:123:26 eval_value at /source/src/interpreter.c:243:16 eval_body at /source/src/interpreter.c:594:35 eval_body at /source/src/interpreter.c:563:21 eval_body at /source/src/interpreter.c:571:21 eval_body at /source/src/interpreter.c:571:21 eval_body at /source/src/interpreter.c:571:21 jl_interpret_toplevel_thunk at /source/src/interpreter.c:897:21 ijl_eval_thunk at /source/src/toplevel.c:768:18 jl_toplevel_eval_flex at /source/src/toplevel.c:712:26 jl_eval_toplevel_stmts at /source/src/toplevel.c:602:15 jl_toplevel_eval_flex at /source/src/toplevel.c:684:27 ijl_toplevel_eval at /source/src/toplevel.c:782:12 ijl_toplevel_eval_in at /source/src/toplevel.c:827:13 eval at ./boot.jl:517:3 include_string at ./loading.jl:3113:125 _jl_invoke at /source/src/gf.c:4127:23 [inlined] ijl_apply_generic at /source/src/gf.c:4353:12 _include at ./loading.jl:3173:35 include at ./Base.jl:327:3 IncludeInto at ./Base.jl:328:4 unknown function (ip: 0x7a6ac4bb8362) at (unknown file) _jl_invoke at /source/src/gf.c:4127:23 [inlined] ijl_apply_generic at /source/src/gf.c:4353:12 macro expansion at /home/pkgeval/.julia/packages/StructuralIdentifiability/31snG/test/runtests.jl:157:3 [inlined] macro expansion at /source/usr/share/julia/stdlib/v1.14/Test/src/Test.jl:2246:17 [inlined] macro expansion at /home/pkgeval/.julia/packages/StructuralIdentifiability/31snG/test/runtests.jl:155:17 [inlined] macro expansion at ./timing.jl:739:25 [inlined] top-level scope at /home/pkgeval/.julia/packages/StructuralIdentifiability/31snG/test/runtests.jl:154:439 jl_invoke_oneshot at /source/src/gf.c:4162:23 ijl_eval_thunk at /source/src/toplevel.c:760:18 jl_toplevel_eval_flex at /source/src/toplevel.c:712:26 jl_eval_toplevel_stmts at /source/src/toplevel.c:602:15 jl_toplevel_eval_flex at /source/src/toplevel.c:684:27 ijl_toplevel_eval at /source/src/toplevel.c:782:12 ijl_toplevel_eval_in at /source/src/toplevel.c:827:13 eval at ./boot.jl:517:3 include_string at ./loading.jl:3113:125 _jl_invoke at /source/src/gf.c:4127:23 [inlined] ijl_apply_generic at /source/src/gf.c:4353:12 _include at ./loading.jl:3173:35 include at ./Base.jl:327:3 IncludeInto at ./Base.jl:328:4 jfptr_IncludeInto_1.1 at /opt/julia/lib/julia/sys.so (unknown line) _jl_invoke at /source/src/gf.c:4127:23 [inlined] ijl_apply_generic at /source/src/gf.c:4353:12 jl_apply at /source/src/julia.h:2328:12 [inlined] do_call at /source/src/interpreter.c:123:26 eval_value at /source/src/interpreter.c:243:16 eval_stmt_value at /source/src/interpreter.c:194:23 [inlined] eval_body at /source/src/interpreter.c:706:13 jl_interpret_toplevel_thunk at /source/src/interpreter.c:897:21 ijl_eval_thunk at /source/src/toplevel.c:768:18 jl_toplevel_eval_flex at /source/src/toplevel.c:712:26 jl_eval_toplevel_stmts at /source/src/toplevel.c:602:15 jl_toplevel_eval_flex at /source/src/toplevel.c:684:27 ijl_toplevel_eval at /source/src/toplevel.c:782:12 ijl_toplevel_eval_in at /source/src/toplevel.c:827:13 eval at ./boot.jl:517:3 exec_options at ./client.jl:321:353 _start at ./client.jl:596:35 jfptr__start_0.1 at /opt/julia/lib/julia/sys.so (unknown line) _jl_invoke at /source/src/gf.c:4127:23 [inlined] ijl_apply_generic at /source/src/gf.c:4353:12 jl_apply at /source/src/julia.h:2328:12 [inlined] true_main at /source/src/jlapi.c:971:29 jl_repl_entrypoint at /source/src/jlapi.c:1138:15 main at /source/cli/loader_exe.c:58:15 unknown function (ip: 0x7a6b17421249) at /lib/x86_64-linux-gnu/libc.so.6 __libc_start_main at /lib/x86_64-linux-gnu/libc.so.6 (unknown line) unknown function (ip: 0x4010b8) at /workspace/srcdir/glibc-2.17/csu/../sysdeps/x86_64/start.S unknown function (ip: (nil)) at (unknown file) ============================================================== Profile collected. A report will print at the next yield point. Disabling --trace-compile ============================================================== [ Info: Selecting generators in 1.007933789 ====================================================================================== Information request received. A stacktrace will print followed by a 1.0 second profile. --trace-compile is enabled during profile collection. ====================================================================================== cmd: /opt/julia/bin/julia 1 running 0 of 1 signal (10): User defined signal 1 epoll_pwait at /lib/x86_64-linux-gnu/libc.so.6 (unknown line) uv__io_poll at /workspace/srcdir/libuv/src/unix/linux.c:1404 uv_run at /workspace/srcdir/libuv/src/unix/core.c:430 ijl_task_get_next at /source/src/scheduler.c:457:34 wait at ./task.jl:1246:44 wait_forever at ./task.jl:1168:5 jfptr_wait_forever_0.1 at /opt/julia/lib/julia/sys.so (unknown line) _jl_invoke at /source/src/gf.c:4127:23 [inlined] ijl_apply_generic at /source/src/gf.c:4353:12 jl_apply at /source/src/julia.h:2328:12 [inlined] start_task at /source/src/task.c:1275:19 unknown function (ip: (nil)) at (unknown file) ============================================================== Profile collected. A report will print at the next yield point. Disabling --trace-compile ============================================================== ┌ Warning: There were no samples collected in one or more groups. │ This may be due to idle threads, or you may need to run your │ program longer (perhaps by running it multiple times), │ or adjust the delay between samples with `Profile.init()`. └ @ Profile /opt/julia/share/julia/stdlib/v1.14/Profile/src/Profile.jl:1361 Overhead ╎ [+additional indent] Count File:Line Function ========================================================= Thread 1 (default) Task 0x00007a6afcbfc010 Total snapshots: 97. Utilization: 100% ╎87 @Base/client.jl:596 _start() ╎ 87 @Base/client.jl:321 exec_options(opts::Base.JLOptions) ╎ 87 @Base/boot.jl:517 eval(m::Module, e::Any) ╎ 87 @Base/Base.jl:328 (::Base.IncludeInto)(fname::String) ╎ 87 @Base/Base.jl:327 include(mapexpr::Function, mod::Module, _path::Str… ╎ 87 @Base/loading.jl:3173 _include(mapexpr::Function, mod::Module, _pat… ╎ ╎ 87 @Base/loading.jl:3113 include_string(mapexpr::typeof(identity), mo… ╎ ╎ 87 @Base/boot.jl:517 eval(m::Module, e::Any) ╎ ╎ 87 @StructuralIdentifiability/…:154 top-level scope ╎ ╎ 87 @Base/timing.jl:739 macro expansion ╎ ╎ 87 @StructuralIdentifiability/…:155 macro expansion ╎ ╎ ╎ 87 @Test/src/Test.jl:2246 macro expansion ╎ ╎ ╎ 87 @StructuralIdentifiability/…:157 macro expansion ╎ ╎ ╎ 87 @Base/Base.jl:328 (::Base.IncludeInto)(fname::String) ╎ ╎ ╎ 87 @Base/Base.jl:327 include(mapexpr::Function, mod::Module, … ╎ ╎ ╎ 87 @Base/loading.jl:3173 _include(mapexpr::Function, mod::Mo… ╎ ╎ ╎ ╎ 87 @Base/loading.jl:3113 include_string(mapexpr::typeof(ide… ╎ ╎ ╎ ╎ 87 @Base/boot.jl:517 eval(m::Module, e::Any) ╎ ╎ ╎ ╎ 87 @StructuralIdentifiability/…:48 kwcall(::@NamedTuple{s… ╎ ╎ ╎ ╎ 87 @StructuralIdentifiability/…:60 #find_identifiable_fu… ╎ ╎ ╎ ╎ 87 @Base/…ogging.jl:653 with_logger ╎ ╎ ╎ ╎ ╎ 87 @Base/…ogging.jl:542 with_logstate(f::StructuralIde… ╎ ╎ ╎ ╎ ╎ 87 @StructuralIdentifiability/…:62 (::StructuralIdent… ╎ ╎ ╎ ╎ ╎ 87 @StructuralIdentifiability/…:85 _find_identifiabl… ╎ ╎ ╎ ╎ ╎ 87 @StructuralIdentifiability/…:119 _find_identifia… ╎ ╎ ╎ ╎ ╎ 87 @RationalFunctionFields/…:319 kwcall(::@NamedTu… ╎ ╎ ╎ ╎ ╎ ╎ 87 @RationalFunctionFields/…:319 simplified_gener… ╎ ╎ ╎ ╎ ╎ ╎ 87 @Base/sort.jl:1734 kwcall(::@NamedTuple{lt::t… ╎ ╎ ╎ ╎ ╎ ╎ 87 @Base/…rt.jl:1741 #sort!#24 ╎ ╎ ╎ ╎ ╎ ╎ 87 @Base/…rt.jl:1594 _sort! ╎ ╎ ╎ ╎ ╎ ╎ 87 @Base/…rt.jl:561 _sort! ╎ ╎ ╎ ╎ ╎ ╎ ╎ 87 @Base/…rt.jl:686 _sort! ╎ ╎ ╎ ╎ ╎ ╎ ╎ 87 @Base/…rt.jl:747 _sort! ╎ ╎ ╎ ╎ ╎ ╎ ╎ 87 @Base/…rt.jl:802 _sort! ╎ ╎ ╎ ╎ ╎ ╎ ╎ 87 @Base/…rt.jl:731 _sort! ╎ ╎ ╎ ╎ ╎ ╎ ╎ 87 @Base/…rt.jl:780 _sort! ╎ ╎ ╎ ╎ ╎ ╎ ╎ ╎ 87 @Base/…rt.jl:1380 _sort!(v::Vector{A… ╎ ╎ ╎ ╎ ╎ ╎ ╎ ╎ 87 @Base/…rt.jl:1123 _issorted(v::Vect… ╎ ╎ ╎ ╎ ╎ ╎ ╎ ╎ 87 @Base/…rt.jl:1158 _sort!(v::Vector… ╎ ╎ ╎ ╎ ╎ ╎ ╎ ╎ 87 @Base/…rt.jl:1123 _sort! ╎ ╎ ╎ ╎ ╎ ╎ ╎ ╎ 8 @Base/…rt.jl:1135 _sort!(v::Vect… ╎ ╎ ╎ ╎ ╎ ╎ ╎ ╎ +1 2 @Base/…rt.jl:1099 partition!(t::… ╎ ╎ ╎ ╎ ╎ ╎ ╎ ╎ +2 2 @Base/…ng.jl:121 mod(i::UInt64, … ╎ ╎ ╎ ╎ ╎ ╎ ╎ ╎ +3 2 @RationalFunctionFields/…:55 -(a… ╎ ╎ ╎ ╎ ╎ ╎ ╎ ╎ +4 2 @RationalFunctionFields/…:57 rat… ╎ ╎ ╎ ╎ ╎ ╎ ╎ ╎ +5 1 @RationalFunctionFields/…:281 co… ╎ ╎ ╎ ╎ ╎ ╎ ╎ ╎ +6 1 @RationalFunctionFields/…:181 un… ╎ ╎ ╎ ╎ ╎ ╎ ╎ ╎ +7 1 @AbstractAlgebra/…:28 numerator(… ╎ ╎ ╎ ╎ ╎ ╎ ╎ ╎ +8 1 @AbstractAlgebra/…:30 numerator(… ╎ ╎ ╎ ╎ ╎ ╎ ╎ ╎ +9 1 @Nemo/…ly.jl:288 divexact ╎ ╎ ╎ ╎ ╎ ╎ ╎ ╎ +10 1 @Nemo/…ly.jl:288 divexact(a::QQM… 1╎ ╎ ╎ ╎ ╎ ╎ ╎ ╎ +11 1 @Nemo/…ly.jl:745 (::QQMPolyRing)… ╎ ╎ ╎ ╎ ╎ ╎ ╎ ╎ +5 1 @RationalFunctionFields/…:284 co… 1╎ ╎ ╎ ╎ ╎ ╎ ╎ ╎ +6 1 @Nemo/…ly.jl:199 total_degree(a:… ╎ ╎ ╎ ╎ ╎ ╎ ╎ ╎ +1 6 @Base/…rt.jl:1106 partition!(t::… ╎ ╎ ╎ ╎ ╎ ╎ ╎ ╎ +2 6 @Base/…ng.jl:121 getindex(A::Vec… ╎ ╎ ╎ ╎ ╎ ╎ ╎ ╎ +3 6 @RationalFunctionFields/…:55 rat… ╎ ╎ ╎ ╎ ╎ ╎ ╎ ╎ +4 6 @RationalFunctionFields/…:57 rat… ╎ ╎ ╎ ╎ ╎ ╎ ╎ ╎ +5 1 @RationalFunctionFields/…:282 co… ╎ ╎ ╎ ╎ ╎ ╎ ╎ ╎ +6 1 @RationalFunctionFields/…:181 un… ╎ ╎ ╎ ╎ ╎ ╎ ╎ ╎ +7 1 @AbstractAlgebra/…:37 numerator(… ╎ ╎ ╎ ╎ ╎ ╎ ╎ ╎ +8 1 @AbstractAlgebra/…:39 numerator(… ╎ ╎ ╎ ╎ ╎ ╎ ╎ ╎ +9 1 @Nemo/…ly.jl:288 divexact ╎ ╎ ╎ ╎ ╎ ╎ ╎ ╎ +10 1 @Nemo/…ly.jl:288 divexact(a::QQM… 1╎ ╎ ╎ ╎ ╎ ╎ ╎ ╎ +11 1 @Nemo/…ly.jl:745 (::QQMPolyRing)… ╎ ╎ ╎ ╎ ╎ ╎ ╎ ╎ +5 2 @RationalFunctionFields/…:283 co… 2╎ ╎ ╎ ╎ ╎ ╎ ╎ ╎ +6 2 @Nemo/…ly.jl:199 total_degree(a:… ╎ ╎ ╎ ╎ ╎ ╎ ╎ ╎ +5 3 @RationalFunctionFields/…:284 co… 3╎ ╎ ╎ ╎ ╎ ╎ ╎ ╎ +6 3 @Nemo/…ly.jl:199 total_degree(a:… ╎ ╎ ╎ ╎ ╎ ╎ ╎ ╎ 15 @Base/…rt.jl:1137 _sort!(v::Vect… ╎ ╎ ╎ ╎ ╎ ╎ ╎ ╎ +1 4 @Base/…rt.jl:1099 partition!(t::… ╎ ╎ ╎ ╎ ╎ ╎ ╎ ╎ +2 4 @Base/…ng.jl:121 mod(i::UInt64, … ╎ ╎ ╎ ╎ ╎ ╎ ╎ ╎ +3 4 @RationalFunctionFields/…:55 -(a… ╎ ╎ ╎ ╎ ╎ ╎ ╎ ╎ +4 4 @RationalFunctionFields/…:57 rat… ╎ ╎ ╎ ╎ ╎ ╎ ╎ ╎ +5 3 @RationalFunctionFields/…:281 co… ╎ ╎ ╎ ╎ ╎ ╎ ╎ ╎ +6 3 @RationalFunctionFields/…:181 un… ╎ ╎ ╎ ╎ ╎ ╎ ╎ ╎ +7 1 @AbstractAlgebra/…:37 numerator(… ╎ ╎ ╎ ╎ ╎ ╎ ╎ ╎ +8 1 @AbstractAlgebra/…:39 numerator(… ╎ ╎ ╎ ╎ ╎ ╎ ╎ ╎ +9 1 @Nemo/…ly.jl:288 divexact ╎ ╎ ╎ ╎ ╎ ╎ ╎ ╎ +10 1 @Nemo/…ly.jl:288 divexact(a::QQM… 1╎ ╎ ╎ ╎ ╎ ╎ ╎ ╎ +11 1 @Nemo/…ly.jl:745 (::QQMPolyRing)… ╎ ╎ ╎ ╎ ╎ ╎ ╎ ╎ +7 2 @AbstractAlgebra/…:28 numerator(… ╎ ╎ ╎ ╎ ╎ ╎ ╎ ╎ +8 2 @AbstractAlgebra/…:30 numerator(… ╎ ╎ ╎ ╎ ╎ ╎ ╎ ╎ +9 2 @Nemo/…ly.jl:288 divexact ╎ ╎ ╎ ╎ ╎ ╎ ╎ ╎ +10 2 @Nemo/…ly.jl:288 divexact(a::QQM… 2╎ ╎ ╎ ╎ ╎ ╎ ╎ ╎ +11 2 @Nemo/…ly.jl:745 (::QQMPolyRing)… ╎ ╎ ╎ ╎ ╎ ╎ ╎ ╎ +5 1 @RationalFunctionFields/…:282 co… ╎ ╎ ╎ ╎ ╎ ╎ ╎ ╎ +6 1 @RationalFunctionFields/…:181 un… ╎ ╎ ╎ ╎ ╎ ╎ ╎ ╎ +7 1 @AbstractAlgebra/…:37 numerator(… ╎ ╎ ╎ ╎ ╎ ╎ ╎ ╎ +8 1 @AbstractAlgebra/…:39 numerator(… ╎ ╎ ╎ ╎ ╎ ╎ ╎ ╎ +9 1 @Nemo/…ly.jl:288 divexact ╎ ╎ ╎ ╎ ╎ ╎ ╎ ╎ +10 1 @Nemo/…ly.jl:288 divexact(a::QQM… 1╎ ╎ ╎ ╎ ╎ ╎ ╎ ╎ +11 1 @Nemo/…ly.jl:745 (::QQMPolyRing)… ╎ ╎ ╎ ╎ ╎ ╎ ╎ ╎ +1 11 @Base/…rt.jl:1106 partition!(t::… ╎ ╎ ╎ ╎ ╎ ╎ ╎ ╎ +2 11 @Base/…ng.jl:121 getindex(A::Vec… ╎ ╎ ╎ ╎ ╎ ╎ ╎ ╎ +3 11 @RationalFunctionFields/…:55 rat… ╎ ╎ ╎ ╎ ╎ ╎ ╎ ╎ +4 11 @RationalFunctionFields/…:57 rat… ╎ ╎ ╎ ╎ ╎ ╎ ╎ ╎ +5 1 @RationalFunctionFields/…:281 co… ╎ ╎ ╎ ╎ ╎ ╎ ╎ ╎ +6 1 @RationalFunctionFields/…:181 un… ╎ ╎ ╎ ╎ ╎ ╎ ╎ ╎ +7 1 @AbstractAlgebra/…:28 numerator(… ╎ ╎ ╎ ╎ ╎ ╎ ╎ ╎ +8 1 @AbstractAlgebra/…:30 numerator(… ╎ ╎ ╎ ╎ ╎ ╎ ╎ ╎ +9 1 @Nemo/…ly.jl:288 divexact ╎ ╎ ╎ ╎ ╎ ╎ ╎ ╎ +10 1 @Nemo/…ly.jl:288 divexact(a::QQM… 1╎ ╎ ╎ ╎ ╎ ╎ ╎ ╎ +11 1 @Nemo/…ly.jl:745 (::QQMPolyRing)… ╎ ╎ ╎ ╎ ╎ ╎ ╎ ╎ +5 8 @RationalFunctionFields/…:283 co… ╎ ╎ ╎ ╎ ╎ ╎ ╎ ╎ +6 7 @Nemo/…ly.jl:196 total_degree(a:… 6╎ ╎ ╎ ╎ ╎ ╎ ╎ ╎ +7 7 @Nemo/…ly.jl:190 total_degree_fi… 1╎ ╎ ╎ ╎ ╎ ╎ ╎ ╎ +6 1 @Nemo/…ly.jl:199 total_degree(a:… ╎ ╎ ╎ ╎ ╎ ╎ ╎ ╎ +5 2 @RationalFunctionFields/…:284 co… 2╎ ╎ ╎ ╎ ╎ ╎ ╎ ╎ +6 2 @Nemo/…ly.jl:199 total_degree(a:… ╎ ╎ ╎ ╎ ╎ ╎ ╎ ╎ 19 @Base/…rt.jl:1154 _sort!(v::Vect… ╎ ╎ ╎ ╎ ╎ ╎ ╎ ╎ +1 19 @Base/…rt.jl:1123 kwcall(::@Name… ╎ ╎ ╎ ╎ ╎ ╎ ╎ ╎ +2 3 @Base/…rt.jl:1135 _sort!(v::Vect… ╎ ╎ ╎ ╎ ╎ ╎ ╎ ╎ +3 3 @Base/…rt.jl:1099 partition!(t::… ╎ ╎ ╎ ╎ ╎ ╎ ╎ ╎ +4 3 @Base/…ng.jl:121 mod(i::UInt64, … ╎ ╎ ╎ ╎ ╎ ╎ ╎ ╎ +5 3 @RationalFunctionFields/…:55 -(a… ╎ ╎ ╎ ╎ ╎ ╎ ╎ ╎ +6 1 @RationalFunctionFields/…:63 rat… ╎ ╎ ╎ ╎ ╎ ╎ ╎ ╎ +7 1 @RationalFunctionFields/…:281 co… ╎ ╎ ╎ ╎ ╎ ╎ ╎ ╎ +8 1 @RationalFunctionFields/…:181 un… ╎ ╎ ╎ ╎ ╎ ╎ ╎ ╎ +9 1 @AbstractAlgebra/…:28 numerator(… ╎ ╎ ╎ ╎ ╎ ╎ ╎ ╎ +10 1 @AbstractAlgebra/…:30 numerator(… ╎ ╎ ╎ ╎ ╎ ╎ ╎ ╎ +11 1 @Nemo/…ly.jl:288 divexact ╎ ╎ ╎ ╎ ╎ ╎ ╎ ╎ +12 1 @Nemo/…ly.jl:288 divexact(a::QQM… 1╎ ╎ ╎ ╎ ╎ ╎ ╎ ╎ +13 1 @Nemo/…ly.jl:745 (::QQMPolyRing)… ╎ ╎ ╎ ╎ ╎ ╎ ╎ ╎ +6 1 @RationalFunctionFields/…:67 rat… ╎ ╎ ╎ ╎ ╎ ╎ ╎ ╎ +7 1 @RationalFunctionFields/…:282 co… ╎ ╎ ╎ ╎ ╎ ╎ ╎ ╎ +8 1 @RationalFunctionFields/…:181 un… ╎ ╎ ╎ ╎ ╎ ╎ ╎ ╎ +9 1 @AbstractAlgebra/…:37 numerator(… ╎ ╎ ╎ ╎ ╎ ╎ ╎ ╎ +10 1 @AbstractAlgebra/…:39 numerator(… ╎ ╎ ╎ ╎ ╎ ╎ ╎ ╎ +11 1 @Nemo/…ly.jl:288 divexact ╎ ╎ ╎ ╎ ╎ ╎ ╎ ╎ +12 1 @Nemo/…ly.jl:288 divexact(a::QQM… 1╎ ╎ ╎ ╎ ╎ ╎ ╎ ╎ +13 1 @Nemo/…ly.jl:745 (::QQMPolyRing)… 1╎ ╎ ╎ ╎ ╎ ╎ ╎ ╎ +6 1 @RationalFunctionFields/…:279 co… ╎ ╎ ╎ ╎ ╎ ╎ ╎ ╎ +2 6 @Base/…rt.jl:1137 _sort!(v::Vect… ╎ ╎ ╎ ╎ ╎ ╎ ╎ ╎ +3 3 @Base/…rt.jl:1099 partition!(t::… ╎ ╎ ╎ ╎ ╎ ╎ ╎ ╎ +4 3 @Base/…ng.jl:121 mod(i::UInt64, … ╎ ╎ ╎ ╎ ╎ ╎ ╎ ╎ +5 3 @RationalFunctionFields/…:55 -(a… ╎ ╎ ╎ ╎ ╎ ╎ ╎ ╎ +6 2 @RationalFunctionFields/…:57 rat… ╎ ╎ ╎ ╎ ╎ ╎ ╎ ╎ +7 2 @RationalFunctionFields/…:283 co… ╎ ╎ ╎ ╎ ╎ ╎ ╎ ╎ +8 1 @Nemo/…ly.jl:196 total_degree(a:… 1╎ ╎ ╎ ╎ ╎ ╎ ╎ ╎ +9 1 @Nemo/…ly.jl:190 total_degree_fi… 1╎ ╎ ╎ ╎ ╎ ╎ ╎ ╎ +8 1 @Nemo/…ly.jl:199 total_degree(a:… ╎ ╎ ╎ ╎ ╎ ╎ ╎ ╎ +6 1 @RationalFunctionFields/…:70 rat… ╎ ╎ ╎ ╎ ╎ ╎ ╎ ╎ +7 1 @RationalFunctionFields/…:281 co… ╎ ╎ ╎ ╎ ╎ ╎ ╎ ╎ +8 1 @RationalFunctionFields/…:284 co… ╎ ╎ ╎ ╎ ╎ ╎ ╎ ╎ +9 1 @Base/…rs.jl:1104 (::ComposedFun… ╎ ╎ ╎ ╎ ╎ ╎ ╎ ╎ +10 1 @Base/…rs.jl:1104 (::ComposedFun… ╎ ╎ ╎ ╎ ╎ ╎ ╎ ╎ +11 1 @Base/…rs.jl:1107 call_composed(… ╎ ╎ ╎ ╎ ╎ ╎ ╎ ╎ +12 1 @Base/…ay.jl:764 collect(itr::Ab… ╎ ╎ ╎ ╎ ╎ ╎ ╎ ╎ +13 1 @Base/…ay.jl:770 _collect ╎ ╎ ╎ ╎ ╎ ╎ ╎ ╎ +14 1 @Base/…ay.jl:949 copyto!(dest::V… ╎ ╎ ╎ ╎ ╎ ╎ ╎ ╎ +15 1 @AbstractAlgebra/…:881 iterate(x… 1╎ ╎ ╎ ╎ ╎ ╎ ╎ ╎ +16 1 @Nemo/…ly.jl:959 monomial(a::QQM… ╎ ╎ ╎ ╎ ╎ ╎ ╎ ╎ +3 3 @Base/…rt.jl:1106 partition!(t::… ╎ ╎ ╎ ╎ ╎ ╎ ╎ ╎ +4 3 @Base/…ng.jl:121 getindex(A::Vec… ╎ ╎ ╎ ╎ ╎ ╎ ╎ ╎ +5 3 @RationalFunctionFields/…:55 rat… ╎ ╎ ╎ ╎ ╎ ╎ ╎ ╎ +6 1 @RationalFunctionFields/…:57 rat… ╎ ╎ ╎ ╎ ╎ ╎ ╎ ╎ +7 1 @RationalFunctionFields/…:283 co… 1╎ ╎ ╎ ╎ ╎ ╎ ╎ ╎ +8 1 @Nemo/…ly.jl:199 total_degree(a:… ╎ ╎ ╎ ╎ ╎ ╎ ╎ ╎ +6 1 @RationalFunctionFields/…:60 rat… ╎ ╎ ╎ ╎ ╎ ╎ ╎ ╎ +7 1 @RationalFunctionFields/…:281 co… ╎ ╎ ╎ ╎ ╎ ╎ ╎ ╎ +8 1 @RationalFunctionFields/…:181 un… ╎ ╎ ╎ ╎ ╎ ╎ ╎ ╎ +9 1 @AbstractAlgebra/…:28 numerator(… ╎ ╎ ╎ ╎ ╎ ╎ ╎ ╎ +10 1 @AbstractAlgebra/…:29 numerator(… 1╎ ╎ ╎ ╎ ╎ ╎ ╎ ╎ +11 1 @AbstractAlgebra/…:46 canonical_… ╎ ╎ ╎ ╎ ╎ ╎ ╎ ╎ +6 1 @RationalFunctionFields/…:70 rat… ╎ ╎ ╎ ╎ ╎ ╎ ╎ ╎ +7 1 @RationalFunctionFields/…:281 co… ╎ ╎ ╎ ╎ ╎ ╎ ╎ ╎ +8 1 @RationalFunctionFields/…:283 co… ╎ ╎ ╎ ╎ ╎ ╎ ╎ ╎ +9 1 @Base/…rs.jl:1104 unpack_fractio… ╎ ╎ ╎ ╎ ╎ ╎ ╎ ╎ +10 1 @Base/…rs.jl:1104 denominator(a:… ╎ ╎ ╎ ╎ ╎ ╎ ╎ ╎ +11 1 @Base/…rs.jl:1107 call_composed ╎ ╎ ╎ ╎ ╎ ╎ ╎ ╎ +12 1 @Base/…ay.jl:764 collect ╎ ╎ ╎ ╎ ╎ ╎ ╎ ╎ +13 1 @Base/…ay.jl:770 _collect ╎ ╎ ╎ ╎ ╎ ╎ ╎ ╎ +14 1 @Base/…ay.jl:949 copyto!(dest::V… 1╎ ╎ ╎ ╎ ╎ ╎ ╎ ╎ +15 1 @AbstractAlgebra/…:881 iterate(x… ╎ ╎ ╎ ╎ ╎ ╎ ╎ ╎ +2 2 @Base/…rt.jl:1154 _sort!(v::Vect… ╎ ╎ ╎ ╎ ╎ ╎ ╎ ╎ +3 2 @Base/…rt.jl:1123 kwcall(::@Name… ╎ ╎ ╎ ╎ ╎ ╎ ╎ ╎ +4 2 @Base/…rt.jl:1165 _sort!(v::Vect… ╎ ╎ ╎ ╎ ╎ ╎ ╎ ╎ +5 2 @Base/…rt.jl:845 _sort!(v::Vecto… ╎ ╎ ╎ ╎ ╎ ╎ ╎ ╎ +6 2 @Base/…ng.jl:121 -(x::Int64, y::… ╎ ╎ ╎ ╎ ╎ ╎ ╎ ╎ +7 2 @RationalFunctionFields/…:55 rat… ╎ ╎ ╎ ╎ ╎ ╎ ╎ ╎ +8 2 @RationalFunctionFields/…:70 rat… ╎ ╎ ╎ ╎ ╎ ╎ ╎ ╎ +9 2 @RationalFunctionFields/…:281 co… ╎ ╎ ╎ ╎ ╎ ╎ ╎ ╎ +10 1 @RationalFunctionFields/…:284 co… ╎ ╎ ╎ ╎ ╎ ╎ ╎ ╎ +11 1 @Base/…rs.jl:1104 (::ComposedFun… ╎ ╎ ╎ ╎ ╎ ╎ ╎ ╎ +12 1 @Base/…rs.jl:1104 (::ComposedFun… ╎ ╎ ╎ ╎ ╎ ╎ ╎ ╎ +13 1 @Base/…rs.jl:1107 call_composed(… ╎ ╎ ╎ ╎ ╎ ╎ ╎ ╎ +14 1 @Base/…ay.jl:764 collect(itr::Ab… ╎ ╎ ╎ ╎ ╎ ╎ ╎ ╎ +15 1 @Base/…ay.jl:770 _collect ╎ ╎ ╎ ╎ ╎ ╎ ╎ ╎ +16 1 @Base/…ay.jl:949 copyto!(dest::V… ╎ ╎ ╎ ╎ ╎ ╎ ╎ ╎ +17 1 @AbstractAlgebra/…:881 iterate(x… 1╎ ╎ ╎ ╎ ╎ ╎ ╎ ╎ +18 1 @Nemo/…ly.jl:959 monomial(a::QQM… ╎ ╎ ╎ ╎ ╎ ╎ ╎ ╎ +10 1 @RationalFunctionFields/…:287 co… ╎ ╎ ╎ ╎ ╎ ╎ ╎ ╎ +11 1 @Base/…rs.jl:424 (::ComposedFunc… ╎ ╎ ╎ ╎ ╎ ╎ ╎ ╎ +12 1 @Base/…rs.jl:398 (::ComposedFunc… ╎ ╎ ╎ ╎ ╎ ╎ ╎ ╎ +13 1 @Base/…ay.jl:3124 call_composed(… 1╎ ╎ ╎ ╎ ╎ ╎ ╎ ╎ +14 1 @Nemo/…ly.jl:402 ==(a::QQMPolyRi… ╎ ╎ ╎ ╎ ╎ ╎ ╎ ╎ +2 7 @Base/…rt.jl:1158 _sort!(v::Vect… ╎ ╎ ╎ ╎ ╎ ╎ ╎ ╎ +3 7 @Base/…rt.jl:1123 kwcall(::@Name… ╎ ╎ ╎ ╎ ╎ ╎ ╎ ╎ +4 2 @Base/…rt.jl:1135 _sort!(v::Vect… ╎ ╎ ╎ ╎ ╎ ╎ ╎ ╎ +5 2 @Base/…rt.jl:1106 partition!(t::… ╎ ╎ ╎ ╎ ╎ ╎ ╎ ╎ +6 2 @Base/…ng.jl:121 getindex(A::Vec… ╎ ╎ ╎ ╎ ╎ ╎ ╎ ╎ +7 2 @RationalFunctionFields/…:55 rat… ╎ ╎ ╎ ╎ ╎ ╎ ╎ ╎ +8 1 @RationalFunctionFields/…:57 rat… ╎ ╎ ╎ ╎ ╎ ╎ ╎ ╎ +9 1 @RationalFunctionFields/…:283 co… 1╎ ╎ ╎ ╎ ╎ ╎ ╎ ╎ +10 1 @Nemo/…ly.jl:199 total_degree(a:… ╎ ╎ ╎ ╎ ╎ ╎ ╎ ╎ +8 1 @RationalFunctionFields/…:70 rat… ╎ ╎ ╎ ╎ ╎ ╎ ╎ ╎ +9 1 @RationalFunctionFields/…:281 co… 1╎ ╎ ╎ ╎ ╎ ╎ ╎ ╎ +10 1 @Nemo/…ly.jl:288 divexact(a::QQM… ╎ ╎ ╎ ╎ ╎ ╎ ╎ ╎ +4 5 @Base/…rt.jl:1165 _sort!(v::Vect… ╎ ╎ ╎ ╎ ╎ ╎ ╎ ╎ +5 5 @Base/…rt.jl:845 _sort!(v::Vecto… ╎ ╎ ╎ ╎ ╎ ╎ ╎ ╎ +6 5 @Base/…ng.jl:121 -(x::Int64, y::… ╎ ╎ ╎ ╎ ╎ ╎ ╎ ╎ +7 5 @RationalFunctionFields/…:55 rat… ╎ ╎ ╎ ╎ ╎ ╎ ╎ ╎ +8 2 @RationalFunctionFields/…:63 rat… ╎ ╎ ╎ ╎ ╎ ╎ ╎ ╎ +9 2 @RationalFunctionFields/…:284 co… ╎ ╎ ╎ ╎ ╎ ╎ ╎ ╎ +10 1 @Nemo/…ly.jl:196 total_degree(a:… 1╎ ╎ ╎ ╎ ╎ ╎ ╎ ╎ +11 1 @Nemo/…ly.jl:190 total_degree_fi… 1╎ ╎ ╎ ╎ ╎ ╎ ╎ ╎ +10 1 @Nemo/…ly.jl:199 total_degree(a:… ╎ ╎ ╎ ╎ ╎ ╎ ╎ ╎ +8 2 @RationalFunctionFields/…:67 rat… ╎ ╎ ╎ ╎ ╎ ╎ ╎ ╎ +9 1 @RationalFunctionFields/…:283 co… ╎ ╎ ╎ ╎ ╎ ╎ ╎ ╎ +10 1 @AbstractAlgebra/…:349 unpack_fr… ╎ ╎ ╎ ╎ ╎ ╎ ╎ ╎ +11 1 @Base/…ay.jl:475 first(itr::Abst… ╎ ╎ ╎ ╎ ╎ ╎ ╎ ╎ +12 1 @AbstractAlgebra/…:879 iterate(x… ╎ ╎ ╎ ╎ ╎ ╎ ╎ ╎ +13 1 @AbstractAlgebra/…:881 iterate(x… 1╎ ╎ ╎ ╎ ╎ ╎ ╎ ╎ +14 1 @Nemo/…ly.jl:959 monomial(a::QQM… ╎ ╎ ╎ ╎ ╎ ╎ ╎ ╎ +9 1 @RationalFunctionFields/…:291 co… ╎ ╎ ╎ ╎ ╎ ╎ ╎ ╎ +10 1 @Base/…rs.jl:398 leading_monomia… ╎ ╎ ╎ ╎ ╎ ╎ ╎ ╎ +11 1 @Nemo/…ly.jl:406 isless(a::QQMPo… 1╎ ╎ ╎ ╎ ╎ ╎ ╎ ╎ +12 1 @Nemo/…ly.jl:78 is_monomial(a::Q… ╎ ╎ ╎ ╎ ╎ ╎ ╎ ╎ +8 1 @RationalFunctionFields/…:70 rat… ╎ ╎ ╎ ╎ ╎ ╎ ╎ ╎ +9 1 @RationalFunctionFields/…:281 co… ╎ ╎ ╎ ╎ ╎ ╎ ╎ ╎ +10 1 @RationalFunctionFields/…:283 co… ╎ ╎ ╎ ╎ ╎ ╎ ╎ ╎ +11 1 @Base/…rs.jl:1104 unpack_fractio… ╎ ╎ ╎ ╎ ╎ ╎ ╎ ╎ +12 1 @Base/…rs.jl:1104 denominator(a:… ╎ ╎ ╎ ╎ ╎ ╎ ╎ ╎ +13 1 @Base/…rs.jl:1107 call_composed ╎ ╎ ╎ ╎ ╎ ╎ ╎ ╎ +14 1 @Base/…ay.jl:764 collect ╎ ╎ ╎ ╎ ╎ ╎ ╎ ╎ +15 1 @Base/…ay.jl:770 _collect ╎ ╎ ╎ ╎ ╎ ╎ ╎ ╎ +16 1 @Base/…ay.jl:949 copyto!(dest::V… 1╎ ╎ ╎ ╎ ╎ ╎ ╎ ╎ +17 1 @AbstractAlgebra/…:881 iterate(x… ╎ ╎ ╎ ╎ ╎ ╎ ╎ ╎ +2 1 @Base/…rt.jl:1165 _sort!(v::Vect… ╎ ╎ ╎ ╎ ╎ ╎ ╎ ╎ +3 1 @Base/…rt.jl:845 _sort!(v::Vecto… ╎ ╎ ╎ ╎ ╎ ╎ ╎ ╎ +4 1 @Base/…ng.jl:121 -(x::Int64, y::… ╎ ╎ ╎ ╎ ╎ ╎ ╎ ╎ +5 1 @RationalFunctionFields/…:55 rat… ╎ ╎ ╎ ╎ ╎ ╎ ╎ ╎ +6 1 @RationalFunctionFields/…:70 rat… ╎ ╎ ╎ ╎ ╎ ╎ ╎ ╎ +7 1 @RationalFunctionFields/…:281 co… ╎ ╎ ╎ ╎ ╎ ╎ ╎ ╎ +8 1 @RationalFunctionFields/…:283 co… ╎ ╎ ╎ ╎ ╎ ╎ ╎ ╎ +9 1 @Base/…rs.jl:1104 unpack_fractio… ╎ ╎ ╎ ╎ ╎ ╎ ╎ ╎ +10 1 @Base/…rs.jl:1104 denominator(a:… ╎ ╎ ╎ ╎ ╎ ╎ ╎ ╎ +11 1 @Base/…rs.jl:1107 call_composed ╎ ╎ ╎ ╎ ╎ ╎ ╎ ╎ +12 1 @Base/…ay.jl:764 collect ╎ ╎ ╎ ╎ ╎ ╎ ╎ ╎ +13 1 @Base/…ay.jl:770 _collect ╎ ╎ ╎ ╎ ╎ ╎ ╎ ╎ +14 1 @Base/…ay.jl:944 copyto!(dest::V… ╎ ╎ ╎ ╎ ╎ ╎ ╎ ╎ +15 1 @AbstractAlgebra/…:879 iterate(r… ╎ ╎ ╎ ╎ ╎ ╎ ╎ ╎ +16 1 @AbstractAlgebra/…:881 isempty(r… ╎ ╎ ╎ ╎ ╎ ╎ ╎ ╎ +17 1 @Nemo/…ly.jl:956 monomial(a::QQM… ╎ ╎ ╎ ╎ ╎ ╎ ╎ ╎ +18 1 @Nemo/…ly.jl:1040 (::QQMPolyRing… ╎ ╎ ╎ ╎ ╎ ╎ ╎ ╎ +19 1 @Nemo/…es.jl:1237 QQMPolyRingEle… 1╎ ╎ ╎ ╎ ╎ ╎ ╎ ╎ +20 1 @Base/…ls.jl:86 finalizer ╎ ╎ ╎ ╎ ╎ ╎ ╎ ╎ 45 @Base/…rt.jl:1158 _sort!(v::Vect… ╎ ╎ ╎ ╎ ╎ ╎ ╎ ╎ +1 45 @Base/…rt.jl:1123 kwcall(::@Name… ╎ ╎ ╎ ╎ ╎ ╎ ╎ ╎ +2 11 @Base/…rt.jl:1135 _sort!(v::Vect… ╎ ╎ ╎ ╎ ╎ ╎ ╎ ╎ +3 4 @Base/…rt.jl:1099 partition!(t::… ╎ ╎ ╎ ╎ ╎ ╎ ╎ ╎ +4 4 @Base/…ng.jl:121 mod(i::UInt64, … ╎ ╎ ╎ ╎ ╎ ╎ ╎ ╎ +5 4 @RationalFunctionFields/…:55 -(a… ╎ ╎ ╎ ╎ ╎ ╎ ╎ ╎ +6 1 @RationalFunctionFields/…:57 rat… ╎ ╎ ╎ ╎ ╎ ╎ ╎ ╎ +7 1 @RationalFunctionFields/…:284 co… ╎ ╎ ╎ ╎ ╎ ╎ ╎ ╎ +8 1 @Nemo/…ly.jl:196 total_degree(a:… 1╎ ╎ ╎ ╎ ╎ ╎ ╎ ╎ +9 1 @Nemo/…ly.jl:190 total_degree_fi… ╎ ╎ ╎ ╎ ╎ ╎ ╎ ╎ +6 3 @RationalFunctionFields/…:60 rat… ╎ ╎ ╎ ╎ ╎ ╎ ╎ ╎ +7 1 @RationalFunctionFields/…:281 co… ╎ ╎ ╎ ╎ ╎ ╎ ╎ ╎ +8 1 @RationalFunctionFields/…:181 un… ╎ ╎ ╎ ╎ ╎ ╎ ╎ ╎ +9 1 @AbstractAlgebra/…:28 numerator(… ╎ ╎ ╎ ╎ ╎ ╎ ╎ ╎ +10 1 @AbstractAlgebra/…:30 numerator(… ╎ ╎ ╎ ╎ ╎ ╎ ╎ ╎ +11 1 @Nemo/…ly.jl:288 divexact ╎ ╎ ╎ ╎ ╎ ╎ ╎ ╎ +12 1 @Nemo/…ly.jl:288 divexact(a::QQM… 1╎ ╎ ╎ ╎ ╎ ╎ ╎ ╎ +13 1 @Nemo/…ly.jl:745 (::QQMPolyRing)… ╎ ╎ ╎ ╎ ╎ ╎ ╎ ╎ +7 2 @RationalFunctionFields/…:282 co… ╎ ╎ ╎ ╎ ╎ ╎ ╎ ╎ +8 2 @RationalFunctionFields/…:181 un… ╎ ╎ ╎ ╎ ╎ ╎ ╎ ╎ +9 1 @AbstractAlgebra/…:37 numerator(… ╎ ╎ ╎ ╎ ╎ ╎ ╎ ╎ +10 1 @AbstractAlgebra/…:39 numerator(… ╎ ╎ ╎ ╎ ╎ ╎ ╎ ╎ +11 1 @Nemo/…ly.jl:288 divexact ╎ ╎ ╎ ╎ ╎ ╎ ╎ ╎ +12 1 @Nemo/…ly.jl:288 divexact(a::QQM… 1╎ ╎ ╎ ╎ ╎ ╎ ╎ ╎ +13 1 @Nemo/…ly.jl:745 (::QQMPolyRing)… ╎ ╎ ╎ ╎ ╎ ╎ ╎ ╎ +9 1 @AbstractAlgebra/…:28 numerator(… ╎ ╎ ╎ ╎ ╎ ╎ ╎ ╎ +10 1 @AbstractAlgebra/…:30 numerator(… ╎ ╎ ╎ ╎ ╎ ╎ ╎ ╎ +11 1 @Nemo/…ly.jl:288 divexact ╎ ╎ ╎ ╎ ╎ ╎ ╎ ╎ +12 1 @Nemo/…ly.jl:288 divexact(a::QQM… 1╎ ╎ ╎ ╎ ╎ ╎ ╎ ╎ +13 1 @Nemo/…ly.jl:745 (::QQMPolyRing)… ╎ ╎ ╎ ╎ ╎ ╎ ╎ ╎ +3 7 @Base/…rt.jl:1106 partition!(t::… ╎ ╎ ╎ ╎ ╎ ╎ ╎ ╎ +4 7 @Base/…ng.jl:121 getindex(A::Vec… ╎ ╎ ╎ ╎ ╎ ╎ ╎ ╎ +5 7 @RationalFunctionFields/…:55 rat… ╎ ╎ ╎ ╎ ╎ ╎ ╎ ╎ +6 7 @RationalFunctionFields/…:57 rat… ╎ ╎ ╎ ╎ ╎ ╎ ╎ ╎ +7 6 @RationalFunctionFields/…:283 co… ╎ ╎ ╎ ╎ ╎ ╎ ╎ ╎ +8 3 @Nemo/…ly.jl:196 total_degree(a:… 3╎ ╎ ╎ ╎ ╎ ╎ ╎ ╎ +9 3 @Nemo/…ly.jl:190 total_degree_fi… 3╎ ╎ ╎ ╎ ╎ ╎ ╎ ╎ +8 3 @Nemo/…ly.jl:199 total_degree(a:… ╎ ╎ ╎ ╎ ╎ ╎ ╎ ╎ +7 1 @RationalFunctionFields/…:284 co… ╎ ╎ ╎ ╎ ╎ ╎ ╎ ╎ +8 1 @Nemo/…ly.jl:196 total_degree(a:… 1╎ ╎ ╎ ╎ ╎ ╎ ╎ ╎ +9 1 @Nemo/…ly.jl:190 total_degree_fi… ╎ ╎ ╎ ╎ ╎ ╎ ╎ ╎ +2 11 @Base/…rt.jl:1137 _sort!(v::Vect… ╎ ╎ ╎ ╎ ╎ ╎ ╎ ╎ +3 5 @Base/…rt.jl:1099 partition!(t::… ╎ ╎ ╎ ╎ ╎ ╎ ╎ ╎ +4 5 @Base/…ng.jl:121 mod(i::UInt64, … ╎ ╎ ╎ ╎ ╎ ╎ ╎ ╎ +5 5 @RationalFunctionFields/…:55 -(a… ╎ ╎ ╎ ╎ ╎ ╎ ╎ ╎ +6 5 @RationalFunctionFields/…:57 rat… ╎ ╎ ╎ ╎ ╎ ╎ ╎ ╎ +7 1 @RationalFunctionFields/…:281 co… ╎ ╎ ╎ ╎ ╎ ╎ ╎ ╎ +8 1 @RationalFunctionFields/…:181 un… ╎ ╎ ╎ ╎ ╎ ╎ ╎ ╎ +9 1 @AbstractAlgebra/…:37 numerator(… ╎ ╎ ╎ ╎ ╎ ╎ ╎ ╎ +10 1 @AbstractAlgebra/…:39 numerator(… ╎ ╎ ╎ ╎ ╎ ╎ ╎ ╎ +11 1 @Nemo/…ly.jl:288 divexact ╎ ╎ ╎ ╎ ╎ ╎ ╎ ╎ +12 1 @Nemo/…ly.jl:288 divexact(a::QQM… 1╎ ╎ ╎ ╎ ╎ ╎ ╎ ╎ +13 1 @Nemo/…ly.jl:745 (::QQMPolyRing)… ╎ ╎ ╎ ╎ ╎ ╎ ╎ ╎ +7 1 @RationalFunctionFields/…:282 co… ╎ ╎ ╎ ╎ ╎ ╎ ╎ ╎ +8 1 @RationalFunctionFields/…:181 un… ╎ ╎ ╎ ╎ ╎ ╎ ╎ ╎ +9 1 @AbstractAlgebra/…:37 numerator(… ╎ ╎ ╎ ╎ ╎ ╎ ╎ ╎ +10 1 @AbstractAlgebra/…:39 numerator(… ╎ ╎ ╎ ╎ ╎ ╎ ╎ ╎ +11 1 @Nemo/…ly.jl:288 divexact ╎ ╎ ╎ ╎ ╎ ╎ ╎ ╎ +12 1 @Nemo/…ly.jl:288 divexact(a::QQM… 1╎ ╎ ╎ ╎ ╎ ╎ ╎ ╎ +13 1 @Nemo/…ly.jl:745 (::QQMPolyRing)… ╎ ╎ ╎ ╎ ╎ ╎ ╎ ╎ +7 1 @RationalFunctionFields/…:283 co… ╎ ╎ ╎ ╎ ╎ ╎ ╎ ╎ +8 1 @Nemo/…ly.jl:196 total_degree(a:… 1╎ ╎ ╎ ╎ ╎ ╎ ╎ ╎ +9 1 @Nemo/…ly.jl:190 total_degree_fi… ╎ ╎ ╎ ╎ ╎ ╎ ╎ ╎ +7 2 @RationalFunctionFields/…:284 co… ╎ ╎ ╎ ╎ ╎ ╎ ╎ ╎ +8 2 @Nemo/…ly.jl:196 total_degree(a:… 2╎ ╎ ╎ ╎ ╎ ╎ ╎ ╎ +9 2 @Nemo/…ly.jl:190 total_degree_fi… ╎ ╎ ╎ ╎ ╎ ╎ ╎ ╎ +3 6 @Base/…rt.jl:1106 partition!(t::… ╎ ╎ ╎ ╎ ╎ ╎ ╎ ╎ +4 6 @Base/…ng.jl:121 getindex(A::Vec… ╎ ╎ ╎ ╎ ╎ ╎ ╎ ╎ +5 6 @RationalFunctionFields/…:55 rat… ╎ ╎ ╎ ╎ ╎ ╎ ╎ ╎ +6 6 @RationalFunctionFields/…:57 rat… ╎ ╎ ╎ ╎ ╎ ╎ ╎ ╎ +7 1 @RationalFunctionFields/…:282 co… ╎ ╎ ╎ ╎ ╎ ╎ ╎ ╎ +8 1 @RationalFunctionFields/…:181 un… ╎ ╎ ╎ ╎ ╎ ╎ ╎ ╎ +9 1 @AbstractAlgebra/…:37 numerator(… ╎ ╎ ╎ ╎ ╎ ╎ ╎ ╎ +10 1 @AbstractAlgebra/…:39 numerator(… ╎ ╎ ╎ ╎ ╎ ╎ ╎ ╎ +11 1 @Nemo/…ly.jl:288 divexact ╎ ╎ ╎ ╎ ╎ ╎ ╎ ╎ +12 1 @Nemo/…ly.jl:288 divexact(a::QQM… 1╎ ╎ ╎ ╎ ╎ ╎ ╎ ╎ +13 1 @Nemo/…ly.jl:745 (::QQMPolyRing)… ╎ ╎ ╎ ╎ ╎ ╎ ╎ ╎ +7 3 @RationalFunctionFields/…:283 co… ╎ ╎ ╎ ╎ ╎ ╎ ╎ ╎ +8 1 @Nemo/…ly.jl:196 total_degree(a:… 1╎ ╎ ╎ ╎ ╎ ╎ ╎ ╎ +9 1 @Nemo/…ly.jl:190 total_degree_fi… 2╎ ╎ ╎ ╎ ╎ ╎ ╎ ╎ +8 2 @Nemo/…ly.jl:199 total_degree(a:… ╎ ╎ ╎ ╎ ╎ ╎ ╎ ╎ +7 2 @RationalFunctionFields/…:284 co… ╎ ╎ ╎ ╎ ╎ ╎ ╎ ╎ +8 2 @Nemo/…ly.jl:196 total_degree(a:… 2╎ ╎ ╎ ╎ ╎ ╎ ╎ ╎ +9 2 @Nemo/…ly.jl:190 total_degree_fi… ╎ ╎ ╎ ╎ ╎ ╎ ╎ ╎ +2 6 @Base/…rt.jl:1154 _sort!(v::Vect… ╎ ╎ ╎ ╎ ╎ ╎ ╎ ╎ +3 6 @Base/…rt.jl:1123 kwcall(::@Name… ╎ ╎ ╎ ╎ ╎ ╎ ╎ ╎ +4 3 @Base/…rt.jl:1135 _sort!(v::Vect… ╎ ╎ ╎ ╎ ╎ ╎ ╎ ╎ +5 1 @Base/…rt.jl:1099 partition!(t::… ╎ ╎ ╎ ╎ ╎ ╎ ╎ ╎ +6 1 @Base/…ng.jl:121 mod(i::UInt64, … ╎ ╎ ╎ ╎ ╎ ╎ ╎ ╎ +7 1 @RationalFunctionFields/…:55 -(a… ╎ ╎ ╎ ╎ ╎ ╎ ╎ ╎ +8 1 @RationalFunctionFields/…:63 rat… ╎ ╎ ╎ ╎ ╎ ╎ ╎ ╎ +9 1 @RationalFunctionFields/…:283 co… 1╎ ╎ ╎ ╎ ╎ ╎ ╎ ╎ +10 1 @Nemo/…ly.jl:199 total_degree(a:… ╎ ╎ ╎ ╎ ╎ ╎ ╎ ╎ +5 2 @Base/…rt.jl:1106 partition!(t::… ╎ ╎ ╎ ╎ ╎ ╎ ╎ ╎ +6 2 @Base/…ng.jl:121 getindex(A::Vec… ╎ ╎ ╎ ╎ ╎ ╎ ╎ ╎ +7 2 @RationalFunctionFields/…:55 rat… ╎ ╎ ╎ ╎ ╎ ╎ ╎ ╎ +8 2 @RationalFunctionFields/…:57 rat… ╎ ╎ ╎ ╎ ╎ ╎ ╎ ╎ +9 1 @RationalFunctionFields/…:282 co… ╎ ╎ ╎ ╎ ╎ ╎ ╎ ╎ +10 1 @RationalFunctionFields/…:181 un… ╎ ╎ ╎ ╎ ╎ ╎ ╎ ╎ +11 1 @AbstractAlgebra/…:28 numerator(… ╎ ╎ ╎ ╎ ╎ ╎ ╎ ╎ +12 1 @AbstractAlgebra/…:29 numerator(… ╎ ╎ ╎ ╎ ╎ ╎ ╎ ╎ +13 1 @AbstractAlgebra/…:676 canonical… ╎ ╎ ╎ ╎ ╎ ╎ ╎ ╎ +14 1 @Nemo/…ly.jl:111 (::QQField)() 1╎ ╎ ╎ ╎ ╎ ╎ ╎ ╎ +15 1 @Nemo/…ly.jl:117 coeff!(z::QQFie… ╎ ╎ ╎ ╎ ╎ ╎ ╎ ╎ +9 1 @RationalFunctionFields/…:284 co… ╎ ╎ ╎ ╎ ╎ ╎ ╎ ╎ +10 1 @Nemo/…ly.jl:196 total_degree(a:… 1╎ ╎ ╎ ╎ ╎ ╎ ╎ ╎ +11 1 @Nemo/…ly.jl:190 total_degree_fi… ╎ ╎ ╎ ╎ ╎ ╎ ╎ ╎ +4 1 @Base/…rt.jl:1158 _sort!(v::Vect… ╎ ╎ ╎ ╎ ╎ ╎ ╎ ╎ +5 1 @Base/…rt.jl:1123 kwcall(::@Name… ╎ ╎ ╎ ╎ ╎ ╎ ╎ ╎ +6 1 @Base/…rt.jl:1165 _sort!(v::Vect… ╎ ╎ ╎ ╎ ╎ ╎ ╎ ╎ +7 1 @Base/…rt.jl:845 _sort!(v::Vecto… ╎ ╎ ╎ ╎ ╎ ╎ ╎ ╎ +8 1 @Base/…ng.jl:121 -(x::Int64, y::… ╎ ╎ ╎ ╎ ╎ ╎ ╎ ╎ +9 1 @RationalFunctionFields/…:55 rat… ╎ ╎ ╎ ╎ ╎ ╎ ╎ ╎ +10 1 @RationalFunctionFields/…:70 rat… ╎ ╎ ╎ ╎ ╎ ╎ ╎ ╎ +11 1 @RationalFunctionFields/…:281 co… ╎ ╎ ╎ ╎ ╎ ╎ ╎ ╎ +12 1 @RationalFunctionFields/…:283 co… ╎ ╎ ╎ ╎ ╎ ╎ ╎ ╎ +13 1 @Base/…rs.jl:1104 unpack_fractio… ╎ ╎ ╎ ╎ ╎ ╎ ╎ ╎ +14 1 @Base/…rs.jl:1104 denominator(a:… ╎ ╎ ╎ ╎ ╎ ╎ ╎ ╎ +15 1 @Base/…rs.jl:1107 call_composed ╎ ╎ ╎ ╎ ╎ ╎ ╎ ╎ +16 1 @Base/…ay.jl:764 collect ╎ ╎ ╎ ╎ ╎ ╎ ╎ ╎ +17 1 @Base/…ay.jl:770 _collect ╎ ╎ ╎ ╎ ╎ ╎ ╎ ╎ +18 1 @Base/…ay.jl:949 copyto!(dest::V… ╎ ╎ ╎ ╎ ╎ ╎ ╎ ╎ +19 1 @AbstractAlgebra/…:881 iterate(x… 1╎ ╎ ╎ ╎ ╎ ╎ ╎ ╎ +20 1 @Nemo/…ly.jl:959 monomial(a::QQM… ╎ ╎ ╎ ╎ ╎ ╎ ╎ ╎ +4 2 @Base/…rt.jl:1165 _sort!(v::Vect… ╎ ╎ ╎ ╎ ╎ ╎ ╎ ╎ +5 2 @Base/…rt.jl:845 _sort!(v::Vecto… ╎ ╎ ╎ ╎ ╎ ╎ ╎ ╎ +6 2 @Base/…ng.jl:121 -(x::Int64, y::… ╎ ╎ ╎ ╎ ╎ ╎ ╎ ╎ +7 2 @RationalFunctionFields/…:55 rat… ╎ ╎ ╎ ╎ ╎ ╎ ╎ ╎ +8 2 @RationalFunctionFields/…:57 rat… ╎ ╎ ╎ ╎ ╎ ╎ ╎ ╎ +9 1 @RationalFunctionFields/…:283 co… 1╎ ╎ ╎ ╎ ╎ ╎ ╎ ╎ +10 1 @Nemo/…ly.jl:199 total_degree(a:… ╎ ╎ ╎ ╎ ╎ ╎ ╎ ╎ +9 1 @RationalFunctionFields/…:284 co… ╎ ╎ ╎ ╎ ╎ ╎ ╎ ╎ +10 1 @Nemo/…ly.jl:196 total_degree(a:… 1╎ ╎ ╎ ╎ ╎ ╎ ╎ ╎ +11 1 @Nemo/…ly.jl:190 total_degree_fi… ╎ ╎ ╎ ╎ ╎ ╎ ╎ ╎ +2 16 @Base/…rt.jl:1158 _sort!(v::Vect… ╎ ╎ ╎ ╎ ╎ ╎ ╎ ╎ +3 16 @Base/…rt.jl:1123 kwcall(::@Name… ╎ ╎ ╎ ╎ ╎ ╎ ╎ ╎ +4 4 @Base/…rt.jl:1135 _sort!(v::Vect… ╎ ╎ ╎ ╎ ╎ ╎ ╎ ╎ +5 4 @Base/…rt.jl:1106 partition!(t::… ╎ ╎ ╎ ╎ ╎ ╎ ╎ ╎ +6 4 @Base/…ng.jl:121 getindex(A::Vec… ╎ ╎ ╎ ╎ ╎ ╎ ╎ ╎ +7 4 @RationalFunctionFields/…:55 rat… ╎ ╎ ╎ ╎ ╎ ╎ ╎ ╎ +8 3 @RationalFunctionFields/…:57 rat… ╎ ╎ ╎ ╎ ╎ ╎ ╎ ╎ +9 3 @RationalFunctionFields/…:284 co… ╎ ╎ ╎ ╎ ╎ ╎ ╎ ╎ +10 1 @Nemo/…ly.jl:196 total_degree(a:… 1╎ ╎ ╎ ╎ ╎ ╎ ╎ ╎ +11 1 @Nemo/…ly.jl:190 total_degree_fi… 2╎ ╎ ╎ ╎ ╎ ╎ ╎ ╎ +10 2 @Nemo/…ly.jl:199 total_degree(a:… ╎ ╎ ╎ ╎ ╎ ╎ ╎ ╎ +8 1 @RationalFunctionFields/…:60 rat… ╎ ╎ ╎ ╎ ╎ ╎ ╎ ╎ +9 1 @RationalFunctionFields/…:282 co… ╎ ╎ ╎ ╎ ╎ ╎ ╎ ╎ +10 1 @RationalFunctionFields/…:181 un… ╎ ╎ ╎ ╎ ╎ ╎ ╎ ╎ +11 1 @AbstractAlgebra/…:37 numerator(… ╎ ╎ ╎ ╎ ╎ ╎ ╎ ╎ +12 1 @AbstractAlgebra/…:39 numerator(… ╎ ╎ ╎ ╎ ╎ ╎ ╎ ╎ +13 1 @Nemo/…ly.jl:288 divexact ╎ ╎ ╎ ╎ ╎ ╎ ╎ ╎ +14 1 @Nemo/…ly.jl:288 divexact(a::QQM… ╎ ╎ ╎ ╎ ╎ ╎ ╎ ╎ +15 1 @Nemo/…ly.jl:1040 (::QQMPolyRing… 1╎ ╎ ╎ ╎ ╎ ╎ ╎ ╎ +16 1 @Nemo/…es.jl:1234 QQMPolyRingEle… ╎ ╎ ╎ ╎ ╎ ╎ ╎ ╎ +4 8 @Base/…rt.jl:1137 _sort!(v::Vect… ╎ ╎ ╎ ╎ ╎ ╎ ╎ ╎ +5 5 @Base/…rt.jl:1099 partition!(t::… ╎ ╎ ╎ ╎ ╎ ╎ ╎ ╎ +6 5 @Base/…ng.jl:121 mod(i::UInt64, … ╎ ╎ ╎ ╎ ╎ ╎ ╎ ╎ +7 5 @RationalFunctionFields/…:55 -(a… ╎ ╎ ╎ ╎ ╎ ╎ ╎ ╎ +8 3 @RationalFunctionFields/…:57 rat… ╎ ╎ ╎ ╎ ╎ ╎ ╎ ╎ +9 1 @RationalFunctionFields/…:282 co… ╎ ╎ ╎ ╎ ╎ ╎ ╎ ╎ +10 1 @RationalFunctionFields/…:181 un… ╎ ╎ ╎ ╎ ╎ ╎ ╎ ╎ +11 1 @AbstractAlgebra/…:28 numerator(… ╎ ╎ ╎ ╎ ╎ ╎ ╎ ╎ +12 1 @AbstractAlgebra/…:30 numerator(… ╎ ╎ ╎ ╎ ╎ ╎ ╎ ╎ +13 1 @Nemo/…ly.jl:288 divexact ╎ ╎ ╎ ╎ ╎ ╎ ╎ ╎ +14 1 @Nemo/…ly.jl:288 divexact(a::QQM… 1╎ ╎ ╎ ╎ ╎ ╎ ╎ ╎ +15 1 @Nemo/…ly.jl:745 (::QQMPolyRing)… ╎ ╎ ╎ ╎ ╎ ╎ ╎ ╎ +9 1 @RationalFunctionFields/…:283 co… 1╎ ╎ ╎ ╎ ╎ ╎ ╎ ╎ +10 1 @Nemo/…ly.jl:199 total_degree(a:… ╎ ╎ ╎ ╎ ╎ ╎ ╎ ╎ +9 1 @RationalFunctionFields/…:284 co… ╎ ╎ ╎ ╎ ╎ ╎ ╎ ╎ +10 1 @Nemo/…ly.jl:196 total_degree(a:… 1╎ ╎ ╎ ╎ ╎ ╎ ╎ ╎ +11 1 @Nemo/…ly.jl:190 total_degree_fi… ╎ ╎ ╎ ╎ ╎ ╎ ╎ ╎ +8 1 @RationalFunctionFields/…:60 rat… ╎ ╎ ╎ ╎ ╎ ╎ ╎ ╎ +9 1 @RationalFunctionFields/…:282 co… ╎ ╎ ╎ ╎ ╎ ╎ ╎ ╎ +10 1 @RationalFunctionFields/…:181 un… ╎ ╎ ╎ ╎ ╎ ╎ ╎ ╎ +11 1 @AbstractAlgebra/…:28 numerator(… ╎ ╎ ╎ ╎ ╎ ╎ ╎ ╎ +12 1 @AbstractAlgebra/…:30 numerator(… ╎ ╎ ╎ ╎ ╎ ╎ ╎ ╎ +13 1 @Nemo/…ly.jl:288 divexact ╎ ╎ ╎ ╎ ╎ ╎ ╎ ╎ +14 1 @Nemo/…ly.jl:288 divexact(a::QQM… 1╎ ╎ ╎ ╎ ╎ ╎ ╎ ╎ +15 1 @Nemo/…ly.jl:745 (::QQMPolyRing)… ╎ ╎ ╎ ╎ ╎ ╎ ╎ ╎ +8 1 @RationalFunctionFields/…:70 rat… ╎ ╎ ╎ ╎ ╎ ╎ ╎ ╎ +9 1 @RationalFunctionFields/…:281 co… ╎ ╎ ╎ ╎ ╎ ╎ ╎ ╎ +10 1 @RationalFunctionFields/…:284 co… ╎ ╎ ╎ ╎ ╎ ╎ ╎ ╎ +11 1 @Base/…rs.jl:1104 (::ComposedFun… ╎ ╎ ╎ ╎ ╎ ╎ ╎ ╎ +12 1 @Base/…rs.jl:1104 (::ComposedFun… ╎ ╎ ╎ ╎ ╎ ╎ ╎ ╎ +13 1 @Base/…rs.jl:1107 call_composed(… ╎ ╎ ╎ ╎ ╎ ╎ ╎ ╎ +14 1 @Base/…ay.jl:764 collect(itr::Ab… ╎ ╎ ╎ ╎ ╎ ╎ ╎ ╎ +15 1 @Base/…ay.jl:770 _collect ╎ ╎ ╎ ╎ ╎ ╎ ╎ ╎ +16 1 @Base/…ay.jl:949 copyto!(dest::V… ╎ ╎ ╎ ╎ ╎ ╎ ╎ ╎ +17 1 @AbstractAlgebra/…:881 iterate(x… 1╎ ╎ ╎ ╎ ╎ ╎ ╎ ╎ +18 1 @Nemo/…ly.jl:959 monomial(a::QQM… ╎ ╎ ╎ ╎ ╎ ╎ ╎ ╎ +5 3 @Base/…rt.jl:1106 partition!(t::… ╎ ╎ ╎ ╎ ╎ ╎ ╎ ╎ +6 3 @Base/…ng.jl:121 getindex(A::Vec… ╎ ╎ ╎ ╎ ╎ ╎ ╎ ╎ +7 3 @RationalFunctionFields/…:55 rat… ╎ ╎ ╎ ╎ ╎ ╎ ╎ ╎ +8 3 @RationalFunctionFields/…:57 rat… ╎ ╎ ╎ ╎ ╎ ╎ ╎ ╎ +9 2 @RationalFunctionFields/…:283 co… ╎ ╎ ╎ ╎ ╎ ╎ ╎ ╎ +10 1 @Nemo/…ly.jl:196 total_degree(a:… 1╎ ╎ ╎ ╎ ╎ ╎ ╎ ╎ +11 1 @Nemo/…ly.jl:190 total_degree_fi… 1╎ ╎ ╎ ╎ ╎ ╎ ╎ ╎ +10 1 @Nemo/…ly.jl:199 total_degree(a:… ╎ ╎ ╎ ╎ ╎ ╎ ╎ ╎ +9 1 @RationalFunctionFields/…:284 co… 1╎ ╎ ╎ ╎ ╎ ╎ ╎ ╎ +10 1 @Nemo/…ly.jl:199 total_degree(a:… ╎ ╎ ╎ ╎ ╎ ╎ ╎ ╎ +4 3 @Base/…rt.jl:1158 _sort!(v::Vect… ╎ ╎ ╎ ╎ ╎ ╎ ╎ ╎ +5 3 @Base/…rt.jl:1123 kwcall(::@Name… ╎ ╎ ╎ ╎ ╎ ╎ ╎ ╎ +6 1 @Base/…rt.jl:1135 _sort!(v::Vect… ╎ ╎ ╎ ╎ ╎ ╎ ╎ ╎ +7 1 @Base/…rt.jl:1106 partition!(t::… ╎ ╎ ╎ ╎ ╎ ╎ ╎ ╎ +8 1 @Base/…ng.jl:121 getindex(A::Vec… ╎ ╎ ╎ ╎ ╎ ╎ ╎ ╎ +9 1 @RationalFunctionFields/…:55 rat… ╎ ╎ ╎ ╎ ╎ ╎ ╎ ╎ +10 1 @RationalFunctionFields/…:57 rat… ╎ ╎ ╎ ╎ ╎ ╎ ╎ ╎ +11 1 @RationalFunctionFields/…:281 co… ╎ ╎ ╎ ╎ ╎ ╎ ╎ ╎ +12 1 @RationalFunctionFields/…:181 un… ╎ ╎ ╎ ╎ ╎ ╎ ╎ ╎ +13 1 @AbstractAlgebra/…:28 numerator(… ╎ ╎ ╎ ╎ ╎ ╎ ╎ ╎ +14 1 @AbstractAlgebra/…:30 numerator(… ╎ ╎ ╎ ╎ ╎ ╎ ╎ ╎ +15 1 @Nemo/…ly.jl:288 divexact ╎ ╎ ╎ ╎ ╎ ╎ ╎ ╎ +16 1 @Nemo/…ly.jl:288 divexact(a::QQM… 1╎ ╎ ╎ ╎ ╎ ╎ ╎ ╎ +17 1 @Nemo/…ly.jl:745 (::QQMPolyRing)… ╎ ╎ ╎ ╎ ╎ ╎ ╎ ╎ +6 2 @Base/…rt.jl:1165 _sort!(v::Vect… ╎ ╎ ╎ ╎ ╎ ╎ ╎ ╎ +7 2 @Base/…rt.jl:845 _sort!(v::Vecto… ╎ ╎ ╎ ╎ ╎ ╎ ╎ ╎ +8 2 @Base/…ng.jl:121 -(x::Int64, y::… ╎ ╎ ╎ ╎ ╎ ╎ ╎ ╎ +9 2 @RationalFunctionFields/…:55 rat… ╎ ╎ ╎ ╎ ╎ ╎ ╎ ╎ +10 1 @RationalFunctionFields/…:57 rat… ╎ ╎ ╎ ╎ ╎ ╎ ╎ ╎ +11 1 @RationalFunctionFields/…:284 co… 1╎ ╎ ╎ ╎ ╎ ╎ ╎ ╎ +12 1 @Nemo/…ly.jl:199 total_degree(a:… ╎ ╎ ╎ ╎ ╎ ╎ ╎ ╎ +10 1 @RationalFunctionFields/…:63 rat… ╎ ╎ ╎ ╎ ╎ ╎ ╎ ╎ +11 1 @RationalFunctionFields/…:284 co… 1╎ ╎ ╎ ╎ ╎ ╎ ╎ ╎ +12 1 @Nemo/…ly.jl:199 total_degree(a:… ╎ ╎ ╎ ╎ ╎ ╎ ╎ ╎ +4 1 @Base/…rt.jl:1165 _sort!(v::Vect… ╎ ╎ ╎ ╎ ╎ ╎ ╎ ╎ +5 1 @Base/…rt.jl:845 _sort!(v::Vecto… ╎ ╎ ╎ ╎ ╎ ╎ ╎ ╎ +6 1 @Base/…ng.jl:121 -(x::Int64, y::… ╎ ╎ ╎ ╎ ╎ ╎ ╎ ╎ +7 1 @RationalFunctionFields/…:55 rat… ╎ ╎ ╎ ╎ ╎ ╎ ╎ ╎ +8 1 @RationalFunctionFields/…:57 rat… ╎ ╎ ╎ ╎ ╎ ╎ ╎ ╎ +9 1 @RationalFunctionFields/…:282 co… ╎ ╎ ╎ ╎ ╎ ╎ ╎ ╎ +10 1 @RationalFunctionFields/…:181 un… ╎ ╎ ╎ ╎ ╎ ╎ ╎ ╎ +11 1 @AbstractAlgebra/…:28 numerator(… ╎ ╎ ╎ ╎ ╎ ╎ ╎ ╎ +12 1 @AbstractAlgebra/…:30 numerator(… ╎ ╎ ╎ ╎ ╎ ╎ ╎ ╎ +13 1 @Nemo/…ly.jl:288 divexact ╎ ╎ ╎ ╎ ╎ ╎ ╎ ╎ +14 1 @Nemo/…ly.jl:288 divexact(a::QQM… 1╎ ╎ ╎ ╎ ╎ ╎ ╎ ╎ +15 1 @Nemo/…ly.jl:745 (::QQMPolyRing)… ╎ ╎ ╎ ╎ ╎ ╎ ╎ ╎ +2 1 @Base/…rt.jl:1165 _sort!(v::Vect… ╎ ╎ ╎ ╎ ╎ ╎ ╎ ╎ +3 1 @Base/…rt.jl:845 _sort!(v::Vecto… ╎ ╎ ╎ ╎ ╎ ╎ ╎ ╎ +4 1 @Base/…ng.jl:121 -(x::Int64, y::… ╎ ╎ ╎ ╎ ╎ ╎ ╎ ╎ +5 1 @RationalFunctionFields/…:55 rat… ╎ ╎ ╎ ╎ ╎ ╎ ╎ ╎ +6 1 @RationalFunctionFields/…:63 rat… ╎ ╎ ╎ ╎ ╎ ╎ ╎ ╎ +7 1 @RationalFunctionFields/…:281 co… ╎ ╎ ╎ ╎ ╎ ╎ ╎ ╎ +8 1 @RationalFunctionFields/…:181 un… ╎ ╎ ╎ ╎ ╎ ╎ ╎ ╎ +9 1 @AbstractAlgebra/…:28 numerator(… ╎ ╎ ╎ ╎ ╎ ╎ ╎ ╎ +10 1 @AbstractAlgebra/…:30 numerator(… ╎ ╎ ╎ ╎ ╎ ╎ ╎ ╎ +11 1 @Nemo/…ly.jl:288 divexact ╎ ╎ ╎ ╎ ╎ ╎ ╎ ╎ +12 1 @Nemo/…ly.jl:288 divexact(a::QQM… 1╎ ╎ ╎ ╎ ╎ ╎ ╎ ╎ +13 1 @Nemo/…ly.jl:745 (::QQMPolyRing)… ┌ Warning: There were no samples collected in one or more groups. │ This may be due to idle threads, or you may need to run your │ program longer (perhaps by running it multiple times), │ or adjust the delay between samples with `Profile.init()`. └ @ Profile /opt/julia/share/julia/stdlib/v1.14/Profile/src/Profile.jl:1361 Overhead ╎ [+additional indent] Count File:Line Function ========================================================= Thread 1 (default) Task 0x000079ebcfc38b50 Total snapshots: 397. Utilization: 0% ╎397 @Base/task.jl:1168 wait_forever() 396╎ 397 @Base/task.jl:1246 wait() [ Info: Inclusion checked with probability 0.995 in 13.449820713 seconds [ Info: The search for identifiable functions concluded in 32.146145488 seconds ┌ Info: Test, result_funcs = │ AbstractAlgebra.Generic.FracFieldElem{QQMPolyRingElem}[nu, mu, g, b0, M^2] │ case = │ (ode = s'(t) = -s(t)*i(t)*x1(t)*b0*b1 - s(t)*i(t)*b0 - s(t)*mu + r(t)*g + mu │ i'(t) = s(t)*i(t)*x1(t)*b0*b1 + s(t)*i(t)*b0 - i(t)*mu - i(t)*nu │ r'(t) = i(t)*nu - r(t)*g - r(t)*mu │ x1'(t) = -x2(t)*M │ x2'(t) = x1(t)*M │ y1(t) = i(t) │ y2(t) = r(t) │ , ident_funcs = QQMPolyRingElem[g, mu, b0, nu, M^2]) │ simplify = :weak │ R = │ Multivariate polynomial ring in 13 variables s(t), i(t), r(t), x1(t), ..., nu │ over rational field └ with_states = false [ Info: Computing IO-equations [ Info: Computed IO-equations in 1.491605663 seconds [ Info: Computing Wronskians [28] signal 15: Terminated in expression starting at /home/pkgeval/.julia/packages/StructuralIdentifiability/31snG/test/identifiable_functions.jl:1149 mpoly_monomial_set at /workspace/srcdir/flint-3.4.0/src/mpoly.h:538:15 [inlined] _fmpz_mpoly_scalar_fmma at /workspace/srcdir/flint-3.4.0/src/fmpz_mpoly/scalar_fmma.c:112:13 fmpz_mpoly_scalar_fmma at /workspace/srcdir/flint-3.4.0/src/fmpz_mpoly/scalar_fmma.c:309:11 fmpq_mpoly_add at /workspace/srcdir/flint-3.4.0/src/fmpq_mpoly/add.c:37:5 add! at /home/pkgeval/.julia/packages/Nemo/MT5uH/src/flint/fmpq_mpoly.jl:712:34 [inlined] + at /home/pkgeval/.julia/packages/Nemo/MT5uH/src/flint/fmpq_mpoly.jl:256:7 monomial_compress at /home/pkgeval/.julia/packages/StructuralIdentifiability/31snG/src/wronskian.jl:47:116 monomial_compress at /home/pkgeval/.julia/packages/StructuralIdentifiability/31snG/src/wronskian.jl:20:3 [inlined] #wronskian##0 at ./none (unknown line) [inlined] iterate at ./generator.jl:48:23 [inlined] collect at ./array.jl:833:40 wronskian at /home/pkgeval/.julia/packages/StructuralIdentifiability/31snG/src/wronskian.jl:199:87 #initial_identifiable_functions#207 at /home/pkgeval/.julia/packages/StructuralIdentifiability/31snG/src/global_identifiability.jl:87:400 initial_identifiable_functions at /home/pkgeval/.julia/packages/StructuralIdentifiability/31snG/src/global_identifiability.jl:87:77 [inlined] #_find_identifiable_functions#243 at /home/pkgeval/.julia/packages/StructuralIdentifiability/31snG/src/identifiable_functions.jl:107:118 _find_identifiable_functions at /home/pkgeval/.julia/packages/StructuralIdentifiability/31snG/src/identifiable_functions.jl:85:53 [inlined] #241 at /home/pkgeval/.julia/packages/StructuralIdentifiability/31snG/src/identifiable_functions.jl:62:16 with_logstate at ./logging/logging.jl:542:15 with_logger at ./logging/logging.jl:653:5 [inlined] #find_identifiable_functions#239 at /home/pkgeval/.julia/packages/StructuralIdentifiability/31snG/src/identifiable_functions.jl:60:23 [inlined] find_identifiable_functions at /home/pkgeval/.julia/packages/StructuralIdentifiability/31snG/src/identifiable_functions.jl:48:95 unknown function (ip: 0x7a6af7260fc0) at (unknown file) _jl_invoke at /source/src/gf.c:4127:23 [inlined] ijl_apply_generic at /source/src/gf.c:4353:12 jl_apply at /source/src/julia.h:2328:12 [inlined] do_call at /source/src/interpreter.c:123:26 eval_value at /source/src/interpreter.c:243:16 eval_body at /source/src/interpreter.c:594:35 eval_body at /source/src/interpreter.c:563:21 eval_body at /source/src/interpreter.c:571:21 eval_body at /source/src/interpreter.c:571:21 eval_body at /source/src/interpreter.c:571:21 jl_interpret_toplevel_thunk at /source/src/interpreter.c:897:21 ijl_eval_thunk at /source/src/toplevel.c:768:18 jl_toplevel_eval_flex at /source/src/toplevel.c:712:26 jl_eval_toplevel_stmts at /source/src/toplevel.c:602:15 jl_toplevel_eval_flex at /source/src/toplevel.c:684:27 ijl_toplevel_eval at /source/src/toplevel.c:782:12 ijl_toplevel_eval_in at /source/src/toplevel.c:827:13 eval at ./boot.jl:517:3 include_string at ./loading.jl:3113:125 _jl_invoke at /source/src/gf.c:4127:23 [inlined] ijl_apply_generic at /source/src/gf.c:4353:12 _include at ./loading.jl:3173:35 include at ./Base.jl:327:3 IncludeInto at ./Base.jl:328:4 unknown function (ip: 0x7a6ac4bb8362) at (unknown file) _jl_invoke at /source/src/gf.c:4127:23 [inlined] ijl_apply_generic at /source/src/gf.c:4353:12 macro expansion at /home/pkgeval/.julia/packages/StructuralIdentifiability/31snG/test/runtests.jl:157:3 [inlined] macro expansion at /source/usr/share/julia/stdlib/v1.14/Test/src/Test.jl:2246:17 [inlined] macro expansion at /home/pkgeval/.julia/packages/StructuralIdentifiability/31snG/test/runtests.jl:155:17 [inlined] macro expansion at ./timing.jl:739:25 [inlined] top-level scope at /home/pkgeval/.julia/packages/StructuralIdentifiability/31snG/test/runtests.jl:154:439 jl_invoke_oneshot at /source/src/gf.c:4162:23 ijl_eval_thunk at /source/src/toplevel.c:760:18 jl_toplevel_eval_flex at /source/src/toplevel.c:712:26 jl_eval_toplevel_stmts at /source/src/toplevel.c:602:15 jl_toplevel_eval_flex at /source/src/toplevel.c:684:27 ijl_toplevel_eval at /source/src/toplevel.c:782:12 ijl_toplevel_eval_in at /source/src/toplevel.c:827:13 eval at ./boot.jl:517:3 include_string at ./loading.jl:3113:125 _jl_invoke at /source/src/gf.c:4127:23 [inlined] ijl_apply_generic at /source/src/gf.c:4353:12 _include at ./loading.jl:3173:35 include at ./Base.jl:327:3 IncludeInto at ./Base.jl:328:4 jfptr_IncludeInto_1.1 at /opt/julia/lib/julia/sys.so (unknown line) _jl_invoke at /source/src/gf.c:4127:23 [inlined] ijl_apply_generic at /source/src/gf.c:4353:12 jl_apply at /source/src/julia.h:2328:12 [inlined] do_call at /source/src/interpreter.c:123:26 eval_value at /source/src/interpreter.c:243:16 eval_stmt_value at /source/src/interpreter.c:194:23 [inlined] eval_body at /source/src/interpreter.c:706:13 jl_interpret_toplevel_thunk at /source/src/interpreter.c:897:21 ijl_eval_thunk at /source/src/toplevel.c:768:18 jl_toplevel_eval_flex at /source/src/toplevel.c:712:26 jl_eval_toplevel_stmts at /source/src/toplevel.c:602:15 jl_toplevel_eval_flex at /source/src/toplevel.c:684:27 ijl_toplevel_eval at /source/src/toplevel.c:782:12 ijl_toplevel_eval_in at /source/src/toplevel.c:827:13 eval at ./boot.jl:517:3 exec_options at ./client.jl:321:353 _start at ./client.jl:596:35 jfptr__start_0.1 at /opt/julia/lib/julia/sys.so (unknown line) _jl_invoke at /source/src/gf.c:4127:23 [inlined] ijl_apply_generic at /source/src/gf.c:4353:12 jl_apply at /source/src/julia.h:2328:12 [inlined] true_main at /source/src/jlapi.c:971:29 jl_repl_entrypoint at /source/src/jlapi.c:1138:15 main at /source/cli/loader_exe.c:58:15 unknown function (ip: 0x7a6b17421249) at /lib/x86_64-linux-gnu/libc.so.6 __libc_start_main at /lib/x86_64-linux-gnu/libc.so.6 (unknown line) unknown function (ip: 0x4010b8) at /workspace/srcdir/glibc-2.17/csu/../sysdeps/x86_64/start.S unknown function (ip: (nil)) at (unknown file) Allocations: 330359927 (Pool: 330356750; Big: 3177); GC: 121 PkgEval terminated after 2721.4s: test duration exceeded the time limit