Package evaluation to test StructuralIdentifiability on Julia 1.14.0-DEV.2114 (cccbcd9611*) started at 2026-05-05T11:15:01.058 ################################################################################ # Set-up # Installing PkgEval dependencies (TestEnv)... Activating project at `~/.julia/environments/v1.14` Set-up completed after 15.3s ################################################################################ # 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 v1.7.1 [1914dd2f] + MacroTools v0.5.16 ⌅ [2edaba10] + Nemo v0.54.2 [bac558e1] + OrderedCollections v1.8.1 [3e851597] + ParamPunPam v0.5.7 [aea7be01] + PrecompileTools v1.3.3 [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+0 [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 v1.0.0 [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 To see why use `status --outdated -m` Installation completed after 5.89s ################################################################################ # Precompilation # Precompiling PkgEval dependencies... Precompiling package dependencies... Precompiling project... 17.5 s ✓ StructuralIdentifiability 1 dependency successfully precompiled in 18 seconds. 76 already precompiled. Precompilation completed after 47.11s ################################################################################ # Testing # Testing StructuralIdentifiability Status `/tmp/jl_Rj40Nq/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 v1.3.3 [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_Rj40Nq/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 v1.7.1 [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 v1.3.3 [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+0 [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 v1.0.0 [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 v8.19.0+0 [e37daf67] LibGit2_jll v1.9.2+0 [29816b5a] LibSSH2_jll v1.11.3+1 [3a97d323] MPFR_jll v4.2.2+0 [14a3606d] MozillaCACerts_jll v2026.3.19 [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... Updating `/tmp/jl_Rj40Nq/Project.toml` ⌅ [861a8166] ↓ Combinatorics v1.1.0 ⇒ v1.0.2 [loaded: v1.1.0] [961ee093] + ModelingToolkit v11.24.1 Updating `/tmp/jl_Rj40Nq/Manifest.toml` [47edcb42] + ADTypes v1.22.0 [6e696c72] + AbstractPlutoDingetjes v1.3.2 [1520ce14] + AbstractTrees v0.4.5 [7d9f7c33] + Accessors v0.1.44 [79e6a3ab] + Adapt v4.5.2 [ec485272] + ArnoldiMethod v0.4.0 [4fba245c] + ArrayInterface v7.24.0 [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 v0.2.3 [187b0558] + ConstructionBase v1.6.0 [85a47980] + Dictionaries v0.4.6 [2b5f629d] + DiffEqBase v7.2.0 [459566f4] + DiffEqCallbacks v4.17.0 [163ba53b] + DiffResults v1.1.0 [b552c78f] + DiffRules v1.15.1 [a0c0ee7d] + DifferentiationInterface v0.7.17 ⌅ [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 v1.8.0 [6a86dc24] + FiniteDiff v2.31.0 [f6369f11] + ForwardDiff v1.3.3 [a85aefff] + FunctionMaps v0.1.2 [069b7b12] + FunctionWrappers v1.1.3 [77dc65aa] + FunctionWrappersWrappers v1.8.0 [46192b85] + GPUArraysCore v0.2.0 [86223c79] + Graphs v1.14.0 [3263718b] + ImplicitDiscreteSolve v2.0.0 [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 v3.75.0 [e6f89c97] + LoggingExtras v1.2.0 [bb5d69b7] + MaybeInplace v0.1.4 [961ee093] + ModelingToolkit v11.24.1 [7771a370] + ModelingToolkitBase v1.33.1 [6bb917b9] + ModelingToolkitTearing v1.13.3 [2e0e35c7] + Moshi v0.3.7 [46d2c3a1] + MuladdMacro v0.2.4 [102ac46a] + MultivariatePolynomials v0.5.19 [d8a4904e] + MutableArithmetics v1.7.1 [77ba4419] + NaNMath v1.1.3 [be0214bd] + NonlinearSolveBase v2.25.0 [5959db7a] + NonlinearSolveFirstOrder v2.1.1 [6fe1bfb0] + OffsetArrays v1.17.0 [bbf590c4] + OrdinaryDiffEqCore v4.0.0 [e409e4f3] + PoissonRandom v0.4.7 [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 [ae029012] + Requires v1.3.1 [7e49a35a] + RuntimeGeneratedFunctions v0.5.18 [9dfe8606] + SCCNonlinearSolve v1.13.0 [0bca4576] + SciMLBase v3.7.1 [19f34311] + SciMLJacobianOperators v0.1.13 ⌅ [a6db7da4] + SciMLLogging v1.9.1 [c0aeaf25] + SciMLOperators v1.18.0 [53ae85a6] + SciMLStructures v1.10.0 [efcf1570] + Setfield v1.1.2 [727e6d20] + SimpleNonlinearSolve v2.11.1 [699a6c99] + SimpleTraits v0.9.5 [0c0c59c1] + StarAlgebras v0.3.0 [64909d44] + StateSelection v1.9.2 [90137ffa] + StaticArrays v1.9.18 [1e83bf80] + StaticArraysCore v1.4.4 [10745b16] + Statistics v1.11.1 [2efcf032] + SymbolicIndexingInterface v0.3.46 [19f23fe9] + SymbolicLimits v1.1.0 [d1185830] + SymbolicUtils v4.26.1 [0c5d862f] + Symbolics v7.21.0 [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 v2022.0.0+1 [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_Rj40Nq/Project.toml` [0c5d862f] + Symbolics v7.21.0 Manifest No packages added to or removed from `/tmp/jl_Rj40Nq/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 45.6s [ 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 2.167591 seconds (863.08 k allocations: 47.914 MiB, 99.57% compilation time) 0.001907 seconds (7.23 k allocations: 320.977 KiB) 0.001983 seconds (10.77 k allocations: 482.578 KiB) 0.001911 seconds (10.73 k allocations: 477.297 KiB) 0.002614 seconds (14.50 k allocations: 632.875 KiB) 0.001302 seconds (7.92 k allocations: 359.008 KiB) 0.000902 seconds (7.44 k allocations: 299.789 KiB) 16.137099 seconds (5.84 M allocations: 333.954 MiB, 0.87% gc time, 99.81% 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 0.338461 seconds (94.36 k allocations: 5.646 MiB, 98.34% compilation time) [ Info: Summary of the model: [ Info: State variables: x1, x2 [ Info: Parameters: [ Info: Inputs: u [ Info: Outputs: y 0.013362 seconds (9.58 k allocations: 523.531 KiB, 90.52% 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 0.003561936 seconds [ Info: Computing Wronskians [ Info: Computed Wronskians in 2.66840598 seconds [ Info: Dimensions of the Wronskians [3] [ Info: Ranks of the Wronskians computed in 0.072398106 seconds [ Info: Global identifiability assessed in 59.786328751 seconds [ Info: Assessing local identifiability [ Info: Assessing global identifiability [ Info: Functions to check involve states [ Info: Computing IO-equations [ Info: Computed IO-equations in 0.003247109 seconds [ Info: No parameters, so Wronskian computation is not needed [ Info: Global identifiability assessed in 0.977340645 seconds [ Info: Assessing local identifiability [ Info: Assessing global identifiability [ Info: Global identifiability assessed in 7.0049e-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 0.041118485 seconds [ Info: Computing Wronskians [ Info: Computed Wronskians in 0.521567737 seconds [ Info: Dimensions of the Wronskians [5] [ Info: Ranks of the Wronskians computed in 5.168e-5 seconds [ Info: Simplifying generating set. Simplification level: standard ⌜ # Computing specializations.. Time: 0:00:17 ✓ # Computing specializations.. Time: 0:00:19 [ Info: Search for polynomial generators concluded in 18.459514838 [ Info: Selecting generators in 0.014355022 [ Info: Inclusion checked with probability 0.9955 in 0.06876442 seconds [ Info: Global identifiability assessed in 120.049929266 seconds [ Info: Assessing local identifiability [ Info: Assessing global identifiability [ Info: Computing IO-equations [ Info: Computed IO-equations in 1.860124667 seconds [ Info: Computing Wronskians [ Info: Computed Wronskians in 1.864625274 seconds [ Info: Dimensions of the Wronskians [676] [ Info: Ranks of the Wronskians computed in 0.099284348 seconds [ Info: Global identifiability assessed in 45.873691242 seconds [ Info: Assessing local identifiability [ Info: Assessing global identifiability [ Info: Computing IO-equations [ Info: Computed IO-equations in 0.01458816 seconds [ Info: Computing Wronskians [ Info: Computed Wronskians in 0.029100331 seconds [ Info: Dimensions of the Wronskians [69] [ Info: Ranks of the Wronskians computed in 0.000316957 seconds [ Info: Global identifiability assessed in 0.074620435 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 7.67821567 seconds [ Info: Computing Wronskians [ Info: Computed Wronskians in 0.002602075 seconds [ Info: Dimensions of the Wronskians [2, 3, 2] [ Info: Ranks of the Wronskians computed in 2.697e-5 seconds [ Info: Simplifying generating set. Simplification level: standard [ Info: Search for polynomial generators concluded in 0.989017304 [ Info: Selecting generators in 0.000452825 [ Info: Inclusion checked with probability 0.9955 in 0.003286348 seconds [ Info: Global identifiability assessed in 10.170537674 seconds [ Info: Assessing local identifiability [ Info: Assessing global identifiability [ Info: Computing IO-equations [ Info: Computed IO-equations in 0.002453296 seconds [ Info: Computing Wronskians [ Info: Computed Wronskians in 0.001768483 seconds [ Info: Dimensions of the Wronskians [3] [ Info: Ranks of the Wronskians computed in 2.5649e-5 seconds [ Info: Global identifiability assessed in 0.0083592 seconds [ Info: Assessing local identifiability [ Info: Assessing global identifiability [ Info: Computing IO-equations [ Info: Computed IO-equations in 0.002797593 seconds [ Info: Computing Wronskians [ Info: Computed Wronskians in 0.001983201 seconds [ Info: Dimensions of the Wronskians [4] [ Info: Ranks of the Wronskians computed in 1.9839e-5 seconds [ Info: Global identifiability assessed in 0.008713977 seconds [ Info: Assessing local identifiability [ Info: Assessing global identifiability [ Info: Functions to check involve states [ Info: Computing IO-equations [ Info: Computed IO-equations in 0.005450167 seconds [ Info: Computing Wronskians [ Info: Computed Wronskians in 0.004430618 seconds [ Info: Dimensions of the Wronskians [6] [ Info: Ranks of the Wronskians computed in 2.704e-5 seconds [ Info: Simplifying generating set. Simplification level: standard [ Info: Search for polynomial generators concluded in 1.266990017 [ Info: Selecting generators in 0.016377062 [ Info: Inclusion checked with probability 0.9955 in 0.005965323 seconds [ Info: Global identifiability assessed in 2.551194329 seconds [ Info: Assessing local identifiability [ Info: Assessing global identifiability [ Info: Functions to check involve states [ Info: Computing IO-equations [ Info: Computed IO-equations in 0.009167852 seconds [ Info: Computing Wronskians [ Info: Computed Wronskians in 0.003698214 seconds [ Info: Dimensions of the Wronskians [2, 5] [ Info: Ranks of the Wronskians computed in 2.751e-5 seconds [ Info: Simplifying generating set. Simplification level: standard [ Info: Search for polynomial generators concluded in 0.007735786 [ Info: Selecting generators in 0.004378538 [ Info: Inclusion checked with probability 0.9955 in 0.004737194 seconds [ Info: Global identifiability assessed in 0.056566807 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 0.001910911 seconds [ Info: Computing Wronskians [ Info: Computed Wronskians in 0.001399636 seconds [ Info: Dimensions of the Wronskians [2] [ Info: Ranks of the Wronskians computed in 2.973e-5 seconds [ Info: Simplifying generating set. Simplification level: weak [ Info: Search for polynomial generators concluded in 0.000101629 [ Info: Selecting generators in 1.221708252 [ Info: Inclusion checked with probability 0.995 in 0.001992471 seconds [ Info: The search for identifiable functions concluded in 2.537528461 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 0.001609894 seconds [ Info: Computing Wronskians [ Info: Computed Wronskians in 0.001324268 seconds [ Info: Dimensions of the Wronskians [2] [ Info: Ranks of the Wronskians computed in 2.779e-5 seconds [ Info: Simplifying generating set. Simplification level: weak [ Info: Search for polynomial generators concluded in 0.000111459 [ Info: Selecting generators in 0.000822743 [ Info: Inclusion checked with probability 0.995 in 0.00212028 seconds [ Info: The search for identifiable functions concluded in 0.011755807 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 0.001261138 seconds [ Info: Computing Wronskians [ Info: Computed Wronskians in 0.00101832 seconds [ Info: Dimensions of the Wronskians [2] [ Info: Ranks of the Wronskians computed in 1.797e-5 seconds [ Info: Simplifying generating set. Simplification level: weak [ Info: Search for polynomial generators concluded in 7.953e-5 [ Info: Selecting generators in 0.000730393 [ Info: Inclusion checked with probability 0.995 in 0.001984081 seconds [ Info: The search for identifiable functions concluded in 0.009699177 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 0.001229119 seconds [ Info: Computing Wronskians [ Info: Computed Wronskians in 0.000978781 seconds [ Info: Dimensions of the Wronskians [2] [ Info: Ranks of the Wronskians computed in 1.932e-5 seconds [ Info: Simplifying generating set. Simplification level: standard [ Info: Search for polynomial generators concluded in 0.000660113 [ Info: Selecting generators in 0.000880071 [ Info: Inclusion checked with probability 0.995 in 0.001902441 seconds [ Info: The search for identifiable functions concluded in 0.010191852 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 0.001300477 seconds [ Info: Computing Wronskians [ Info: Computed Wronskians in 0.00100285 seconds [ Info: Dimensions of the Wronskians [2] [ Info: Ranks of the Wronskians computed in 1.99e-5 seconds [ Info: Simplifying generating set. Simplification level: standard [ Info: Search for polynomial generators concluded in 0.000429366 [ Info: Selecting generators in 0.000763743 [ Info: Inclusion checked with probability 0.995 in 0.001955431 seconds [ Info: The search for identifiable functions concluded in 0.009745777 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 0.001177799 seconds [ Info: Computing Wronskians [ Info: Computed Wronskians in 0.000975691 seconds [ Info: Dimensions of the Wronskians [2] [ Info: Ranks of the Wronskians computed in 1.933e-5 seconds [ Info: Simplifying generating set. Simplification level: standard [ Info: Search for polynomial generators concluded in 0.000421136 [ Info: Selecting generators in 0.000663274 [ Info: Inclusion checked with probability 0.995 in 0.001872632 seconds [ Info: The search for identifiable functions concluded in 0.00938187 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 0.001764094 seconds [ Info: Computing Wronskians [ Info: Computed Wronskians in 0.001134849 seconds [ Info: Dimensions of the Wronskians [1] [ Info: Ranks of the Wronskians computed in 1.737e-5 seconds [ Info: The search for identifiable functions concluded in 0.039916857 seconds [ Info: Computing IO-equations [ Info: Computed IO-equations in 0.001849382 seconds [ Info: Computing Wronskians [ Info: Computed Wronskians in 0.001226929 seconds [ Info: Dimensions of the Wronskians [1] [ Info: Ranks of the Wronskians computed in 1.818e-5 seconds [ Info: The search for identifiable functions concluded in 0.003939002 seconds [ Info: Computing IO-equations [ Info: Computed IO-equations in 0.001550585 seconds [ Info: Computing Wronskians [ Info: Computed Wronskians in 0.00112203 seconds [ Info: Dimensions of the Wronskians [1] [ Info: Ranks of the Wronskians computed in 1.592e-5 seconds [ Info: The search for identifiable functions concluded in 0.003348738 seconds [ Info: Computing IO-equations [ Info: Computed IO-equations in 0.355308402 seconds [ Info: Computing Wronskians [ Info: Computed Wronskians in 0.001577985 seconds [ Info: Dimensions of the Wronskians [1] [ Info: Ranks of the Wronskians computed in 1.698e-5 seconds [ Info: The search for identifiable functions concluded in 0.357757128 seconds [ Info: Computing IO-equations [ Info: Computed IO-equations in 0.001538165 seconds [ Info: Computing Wronskians [ Info: Computed Wronskians in 0.00107809 seconds [ Info: Dimensions of the Wronskians [1] [ Info: Ranks of the Wronskians computed in 1.457e-5 seconds [ Info: The search for identifiable functions concluded in 0.003260478 seconds [ Info: Computing IO-equations [ Info: Computed IO-equations in 0.001391007 seconds [ Info: Computing Wronskians [ Info: Computed Wronskians in 0.00105896 seconds [ Info: Dimensions of the Wronskians [1] [ Info: Ranks of the Wronskians computed in 1.5489e-5 seconds [ Info: The search for identifiable functions concluded in 0.00311373 seconds [ Info: Computing IO-equations [ Info: Computed IO-equations in 0.001676274 seconds [ Info: Computing Wronskians [ Info: Computed Wronskians in 0.00106861 seconds [ Info: Dimensions of the Wronskians [1] [ Info: Ranks of the Wronskians computed in 1.544e-5 seconds [ Info: The search for identifiable functions concluded in 0.003501137 seconds [ Info: Computing IO-equations [ Info: Computed IO-equations in 0.001386747 seconds [ Info: Computing Wronskians [ Info: Computed Wronskians in 0.000967371 seconds [ Info: Dimensions of the Wronskians [1] [ Info: Ranks of the Wronskians computed in 1.4769e-5 seconds [ Info: The search for identifiable functions concluded in 0.002915162 seconds [ Info: Computing IO-equations [ Info: Computed IO-equations in 0.001440286 seconds [ Info: Computing Wronskians [ Info: Computed Wronskians in 0.00101259 seconds [ Info: Dimensions of the Wronskians [1] [ Info: Ranks of the Wronskians computed in 1.594e-5 seconds [ Info: The search for identifiable functions concluded in 0.003035861 seconds [ Info: Computing IO-equations [ Info: Computed IO-equations in 0.001431276 seconds [ Info: Computing Wronskians [ Info: Computed Wronskians in 0.00106629 seconds [ Info: Dimensions of the Wronskians [1] [ Info: Ranks of the Wronskians computed in 1.514e-5 seconds [ Info: The search for identifiable functions concluded in 0.00309977 seconds [ Info: Computing IO-equations [ Info: Computed IO-equations in 0.001457736 seconds [ Info: Computing Wronskians [ Info: Computed Wronskians in 0.00102818 seconds [ Info: Dimensions of the Wronskians [1] [ Info: Ranks of the Wronskians computed in 1.67e-5 seconds [ Info: The search for identifiable functions concluded in 0.00310709 seconds [ Info: Computing IO-equations [ Info: Computed IO-equations in 0.001341737 seconds [ Info: Computing Wronskians [ Info: Computed Wronskians in 0.000946141 seconds [ Info: Dimensions of the Wronskians [1] [ Info: Ranks of the Wronskians computed in 1.397e-5 seconds [ Info: The search for identifiable functions concluded in 0.002863812 seconds [ Info: Computing IO-equations [ Info: Computed IO-equations in 0.300721226 seconds [ Info: Computing Wronskians [ Info: Computed Wronskians in 0.001494526 seconds [ Info: Dimensions of the Wronskians [2] [ Info: Ranks of the Wronskians computed in 1.813e-5 seconds [ Info: Simplifying generating set. Simplification level: weak [ Info: Search for polynomial generators concluded in 7.268e-5 [ Info: Selecting generators in 0.000494305 [ Info: Inclusion checked with probability 0.995 in 0.001545355 seconds [ Info: The search for identifiable functions concluded in 0.308278043 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 0.002332448 seconds [ Info: Computing Wronskians [ Info: Computed Wronskians in 0.001410127 seconds [ Info: Dimensions of the Wronskians [2] [ Info: Ranks of the Wronskians computed in 1.903e-5 seconds [ Info: Simplifying generating set. Simplification level: weak [ Info: Search for polynomial generators concluded in 6.85e-5 [ Info: Selecting generators in 0.000565665 [ Info: Inclusion checked with probability 0.995 in 0.001672834 seconds [ Info: The search for identifiable functions concluded in 0.010124592 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 0.002208648 seconds [ Info: Computing Wronskians [ Info: Computed Wronskians in 0.001462886 seconds [ Info: Dimensions of the Wronskians [2] [ Info: Ranks of the Wronskians computed in 1.792e-5 seconds [ Info: Simplifying generating set. Simplification level: weak [ Info: Search for polynomial generators concluded in 8.9139e-5 [ Info: Selecting generators in 0.000543025 [ Info: Inclusion checked with probability 0.995 in 0.001731684 seconds [ Info: The search for identifiable functions concluded in 0.010064843 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 0.002266599 seconds [ Info: Computing Wronskians [ Info: Computed Wronskians in 0.001387117 seconds [ Info: Dimensions of the Wronskians [2] [ Info: Ranks of the Wronskians computed in 1.591e-5 seconds [ Info: Simplifying generating set. Simplification level: standard [ Info: Search for polynomial generators concluded in 0.000376546 [ Info: Selecting generators in 0.000511676 [ Info: Inclusion checked with probability 0.995 in 0.001568625 seconds [ Info: The search for identifiable functions concluded in 0.009857746 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 0.002392437 seconds [ Info: Computing Wronskians [ Info: Computed Wronskians in 0.001436916 seconds [ Info: Dimensions of the Wronskians [2] [ Info: Ranks of the Wronskians computed in 1.714e-5 seconds [ Info: Simplifying generating set. Simplification level: standard [ Info: Search for polynomial generators concluded in 0.000404386 [ Info: Selecting generators in 0.000572854 [ Info: Inclusion checked with probability 0.995 in 0.001743754 seconds [ Info: The search for identifiable functions concluded in 0.010478419 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 0.00207572 seconds [ Info: Computing Wronskians [ Info: Computed Wronskians in 0.001390467 seconds [ Info: Dimensions of the Wronskians [2] [ Info: Ranks of the Wronskians computed in 1.844e-5 seconds [ Info: Simplifying generating set. Simplification level: standard [ Info: Search for polynomial generators concluded in 0.000408956 [ Info: Selecting generators in 0.000555285 [ Info: Inclusion checked with probability 0.995 in 0.001693364 seconds [ Info: The search for identifiable functions concluded in 0.009994104 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 0.001290877 seconds [ Info: Computing Wronskians [ Info: Computed Wronskians in 0.001154689 seconds [ Info: Dimensions of the Wronskians [4] [ Info: Ranks of the Wronskians computed in 2.035e-5 seconds [ Info: Simplifying generating set. Simplification level: weak [ Info: Search for polynomial generators concluded in 9.6769e-5 [ Info: Selecting generators in 0.001970921 [ Info: Inclusion checked with probability 0.995 in 0.003433187 seconds [ Info: The search for identifiable functions concluded in 0.015564191 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 0.001262118 seconds [ Info: Computing Wronskians [ Info: Computed Wronskians in 0.001135099 seconds [ Info: Dimensions of the Wronskians [4] [ Info: Ranks of the Wronskians computed in 1.9179e-5 seconds [ Info: Simplifying generating set. Simplification level: weak [ Info: Search for polynomial generators concluded in 8.6079e-5 [ Info: Selecting generators in 0.001891542 [ Info: Inclusion checked with probability 0.995 in 0.003709174 seconds [ Info: The search for identifiable functions concluded in 0.015805948 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 0.001280538 seconds [ Info: Computing Wronskians [ Info: Computed Wronskians in 0.001153939 seconds [ Info: Dimensions of the Wronskians [4] [ Info: Ranks of the Wronskians computed in 2.026e-5 seconds [ Info: Simplifying generating set. Simplification level: weak [ Info: Search for polynomial generators concluded in 9.212e-5 [ Info: Selecting generators in 0.00204288 [ Info: Inclusion checked with probability 0.995 in 0.003541426 seconds [ Info: The search for identifiable functions concluded in 0.016298884 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 0.001293517 seconds [ Info: Computing Wronskians [ Info: Computed Wronskians in 0.001150199 seconds [ Info: Dimensions of the Wronskians [4] [ Info: Ranks of the Wronskians computed in 2.068e-5 seconds [ Info: Simplifying generating set. Simplification level: standard [ Info: Search for polynomial generators concluded in 0.271323777 [ Info: Selecting generators in 0.003572386 [ Info: Inclusion checked with probability 0.995 in 0.003528006 seconds [ Info: The search for identifiable functions concluded in 0.28872854 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 0.001307427 seconds [ Info: Computing Wronskians [ Info: Computed Wronskians in 0.001169039 seconds [ Info: Dimensions of the Wronskians [4] [ Info: Ranks of the Wronskians computed in 2.188e-5 seconds [ Info: Simplifying generating set. Simplification level: standard [ Info: Search for polynomial generators concluded in 0.014848868 [ Info: Selecting generators in 0.003301988 [ Info: Inclusion checked with probability 0.995 in 0.003398837 seconds [ Info: The search for identifiable functions concluded in 0.032662627 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 0.001333117 seconds [ Info: Computing Wronskians [ Info: Computed Wronskians in 0.001129239 seconds [ Info: Dimensions of the Wronskians [4] [ Info: Ranks of the Wronskians computed in 2.118e-5 seconds [ Info: Simplifying generating set. Simplification level: standard [ Info: Search for polynomial generators concluded in 0.01354605 [ Info: Selecting generators in 0.003205899 [ Info: Inclusion checked with probability 0.995 in 0.003308508 seconds [ Info: The search for identifiable functions concluded in 0.030453848 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 0.001207238 seconds [ Info: Computing Wronskians [ Info: Computed Wronskians in 0.000928441 seconds [ Info: Dimensions of the Wronskians [3] [ Info: Ranks of the Wronskians computed in 1.766e-5 seconds [ Info: Simplifying generating set. Simplification level: weak [ Info: Search for polynomial generators concluded in 0.000126029 [ Info: Selecting generators in 0.001989951 [ Info: Inclusion checked with probability 0.995 in 0.003023461 seconds [ Info: The search for identifiable functions concluded in 1.203840983 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 0.001762113 seconds [ Info: Computing Wronskians [ Info: Computed Wronskians in 0.001281538 seconds [ Info: Dimensions of the Wronskians [3] [ Info: Ranks of the Wronskians computed in 2.189e-5 seconds [ Info: Simplifying generating set. Simplification level: weak [ Info: Search for polynomial generators concluded in 8.3909e-5 [ Info: Selecting generators in 0.00206508 [ Info: Inclusion checked with probability 0.995 in 0.002720693 seconds [ Info: The search for identifiable functions concluded in 0.014322443 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 0.001283027 seconds [ Info: Computing Wronskians [ Info: Computed Wronskians in 0.00102889 seconds [ Info: Dimensions of the Wronskians [3] [ Info: Ranks of the Wronskians computed in 1.9949e-5 seconds [ Info: Simplifying generating set. Simplification level: weak [ Info: Search for polynomial generators concluded in 8.3409e-5 [ Info: Selecting generators in 0.001978091 [ Info: Inclusion checked with probability 0.995 in 0.002663844 seconds [ Info: The search for identifiable functions concluded in 0.013071184 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 0.001192679 seconds [ Info: Computing Wronskians [ Info: Computed Wronskians in 0.000944901 seconds [ Info: Dimensions of the Wronskians [3] [ Info: Ranks of the Wronskians computed in 1.828e-5 seconds [ Info: Simplifying generating set. Simplification level: standard [ Info: Search for polynomial generators concluded in 0.256556709 [ Info: Selecting generators in 0.002518826 [ Info: Inclusion checked with probability 0.995 in 0.002517006 seconds [ Info: The search for identifiable functions concluded in 0.269444155 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 0.001212598 seconds [ Info: Computing Wronskians [ Info: Computed Wronskians in 0.000976191 seconds [ Info: Dimensions of the Wronskians [3] [ Info: Ranks of the Wronskians computed in 1.993e-5 seconds [ Info: Simplifying generating set. Simplification level: standard [ Info: Search for polynomial generators concluded in 0.005395539 [ Info: Selecting generators in 0.001853382 [ Info: Inclusion checked with probability 0.995 in 0.002390207 seconds [ Info: The search for identifiable functions concluded in 0.017671991 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 0.001250198 seconds [ Info: Computing Wronskians [ Info: Computed Wronskians in 0.00100264 seconds [ Info: Dimensions of the Wronskians [3] [ Info: Ranks of the Wronskians computed in 1.8949e-5 seconds [ Info: Simplifying generating set. Simplification level: standard [ Info: Search for polynomial generators concluded in 0.004930103 [ Info: Selecting generators in 0.001935692 [ Info: Inclusion checked with probability 0.995 in 0.002547065 seconds [ Info: The search for identifiable functions concluded in 0.017521422 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 0.002135129 seconds [ Info: Computing Wronskians [ Info: Computed Wronskians in 0.001511605 seconds [ Info: Dimensions of the Wronskians [3] [ Info: Ranks of the Wronskians computed in 1.8329e-5 seconds [ Info: Simplifying generating set. Simplification level: weak [ Info: Search for polynomial generators concluded in 8.31e-5 [ Info: Selecting generators in 0.000513185 [ Info: Inclusion checked with probability 0.995 in 0.002734064 seconds [ Info: The search for identifiable functions concluded in 0.01563083 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 0.00212963 seconds [ Info: Computing Wronskians [ Info: Computed Wronskians in 0.001466766 seconds [ Info: Dimensions of the Wronskians [3] [ Info: Ranks of the Wronskians computed in 1.943e-5 seconds [ Info: Simplifying generating set. Simplification level: weak [ Info: Search for polynomial generators concluded in 7.702e-5 [ Info: Selecting generators in 0.000547864 [ Info: Inclusion checked with probability 0.995 in 0.002737764 seconds [ Info: The search for identifiable functions concluded in 0.015515241 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 0.002053511 seconds [ Info: Computing Wronskians [ Info: Computed Wronskians in 0.001460966 seconds [ Info: Dimensions of the Wronskians [3] [ Info: Ranks of the Wronskians computed in 1.723e-5 seconds [ Info: Simplifying generating set. Simplification level: weak [ Info: Search for polynomial generators concluded in 8.372e-5 [ Info: Selecting generators in 0.000530055 [ Info: Inclusion checked with probability 0.995 in 0.002763634 seconds [ Info: The search for identifiable functions concluded in 0.015620121 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 0.00209955 seconds [ Info: Computing Wronskians [ Info: Computed Wronskians in 0.001468266 seconds [ Info: Dimensions of the Wronskians [3] [ Info: Ranks of the Wronskians computed in 1.553e-5 seconds [ Info: Simplifying generating set. Simplification level: standard [ Info: Search for polynomial generators concluded in 0.007072473 [ Info: Selecting generators in 0.000654044 [ Info: Inclusion checked with probability 0.995 in 0.002734914 seconds [ Info: The search for identifiable functions concluded in 0.023168228 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 0.00207361 seconds [ Info: Computing Wronskians [ Info: Computed Wronskians in 0.001495215 seconds [ Info: Dimensions of the Wronskians [3] [ Info: Ranks of the Wronskians computed in 1.866e-5 seconds [ Info: Simplifying generating set. Simplification level: standard [ Info: Search for polynomial generators concluded in 0.006408118 [ Info: Selecting generators in 0.000616044 [ Info: Inclusion checked with probability 0.995 in 0.002790873 seconds [ Info: The search for identifiable functions concluded in 0.022617033 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 0.0020967 seconds [ Info: Computing Wronskians [ Info: Computed Wronskians in 0.001469066 seconds [ Info: Dimensions of the Wronskians [3] [ Info: Ranks of the Wronskians computed in 1.824e-5 seconds [ Info: Simplifying generating set. Simplification level: standard [ Info: Search for polynomial generators concluded in 0.006860134 [ Info: Selecting generators in 0.000648373 [ Info: Inclusion checked with probability 0.995 in 0.002775853 seconds [ Info: The search for identifiable functions concluded in 0.022387005 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 0.002518926 seconds [ Info: Computing Wronskians [ Info: Computed Wronskians in 0.001864742 seconds [ Info: Dimensions of the Wronskians [4] [ Info: Ranks of the Wronskians computed in 2.021e-5 seconds [ Info: Simplifying generating set. Simplification level: weak [ Info: Search for polynomial generators concluded in 9.1299e-5 [ Info: Selecting generators in 0.003001551 [ Info: Inclusion checked with probability 0.995 in 0.003113831 seconds [ Info: The search for identifiable functions concluded in 0.020491834 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 0.002644524 seconds [ Info: Computing Wronskians [ Info: Computed Wronskians in 0.001836153 seconds [ Info: Dimensions of the Wronskians [4] [ Info: Ranks of the Wronskians computed in 2.016e-5 seconds [ Info: Simplifying generating set. Simplification level: weak [ Info: Search for polynomial generators concluded in 0.000105769 [ Info: Selecting generators in 0.00306543 [ Info: Inclusion checked with probability 0.995 in 0.003613586 seconds [ Info: The search for identifiable functions concluded in 0.02087078 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 0.002608175 seconds [ Info: Computing Wronskians [ Info: Computed Wronskians in 0.001787372 seconds [ Info: Dimensions of the Wronskians [4] [ Info: Ranks of the Wronskians computed in 1.9189e-5 seconds [ Info: Simplifying generating set. Simplification level: weak [ Info: Search for polynomial generators concluded in 8.7279e-5 [ Info: Selecting generators in 0.002788144 [ Info: Inclusion checked with probability 0.995 in 0.00319568 seconds [ Info: The search for identifiable functions concluded in 0.020188946 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 0.002845123 seconds [ Info: Computing Wronskians [ Info: Computed Wronskians in 0.001875342 seconds [ Info: Dimensions of the Wronskians [4] [ Info: Ranks of the Wronskians computed in 2.147e-5 seconds [ Info: Simplifying generating set. Simplification level: standard [ Info: Search for polynomial generators concluded in 0.013989296 [ Info: Selecting generators in 0.003093741 [ Info: Inclusion checked with probability 0.995 in 0.003435627 seconds [ Info: The search for identifiable functions concluded in 0.036081514 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 0.002480567 seconds [ Info: Computing Wronskians [ Info: Computed Wronskians in 0.001803373 seconds [ Info: Dimensions of the Wronskians [4] [ Info: Ranks of the Wronskians computed in 1.938e-5 seconds [ Info: Simplifying generating set. Simplification level: standard [ Info: Search for polynomial generators concluded in 0.013851787 [ Info: Selecting generators in 0.003244568 [ Info: Inclusion checked with probability 0.995 in 0.003561776 seconds [ Info: The search for identifiable functions concluded in 0.035260172 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 0.002369677 seconds [ Info: Computing Wronskians [ Info: Computed Wronskians in 0.001714174 seconds [ Info: Dimensions of the Wronskians [4] [ Info: Ranks of the Wronskians computed in 1.789e-5 seconds [ Info: Simplifying generating set. Simplification level: standard [ Info: Search for polynomial generators concluded in 0.01460017 [ Info: Selecting generators in 0.003027551 [ Info: Inclusion checked with probability 0.995 in 0.003264558 seconds [ Info: The search for identifiable functions concluded in 0.0354534 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 0.018451733 seconds [ Info: Computing Wronskians [ Info: Computed Wronskians in 0.004834803 seconds [ Info: Dimensions of the Wronskians [13] [ Info: Ranks of the Wronskians computed in 2.912e-5 seconds [ Info: Simplifying generating set. Simplification level: weak [ Info: Search for polynomial generators concluded in 0.000142209 [ Info: Selecting generators in 0.009491999 [ Info: Inclusion checked with probability 0.995 in 0.006113402 seconds [ Info: The search for identifiable functions concluded in 0.328643408 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 0.007123002 seconds [ Info: Computing Wronskians [ Info: Computed Wronskians in 0.004632336 seconds [ Info: Dimensions of the Wronskians [13] [ Info: Ranks of the Wronskians computed in 3.007e-5 seconds [ Info: Simplifying generating set. Simplification level: weak [ Info: Search for polynomial generators concluded in 0.000122039 [ Info: Selecting generators in 0.010139103 [ Info: Inclusion checked with probability 0.995 in 0.006444538 seconds [ Info: The search for identifiable functions concluded in 0.046804271 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 0.007586917 seconds [ Info: Computing Wronskians [ Info: Computed Wronskians in 0.005005682 seconds [ Info: Dimensions of the Wronskians [13] [ Info: Ranks of the Wronskians computed in 2.7709e-5 seconds [ Info: Simplifying generating set. Simplification level: weak [ Info: Search for polynomial generators concluded in 0.000123499 [ Info: Selecting generators in 0.010257791 [ Info: Inclusion checked with probability 0.995 in 0.007057232 seconds [ Info: The search for identifiable functions concluded in 0.049496156 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 2.031184788 seconds [ Info: Computing Wronskians [ Info: Computed Wronskians in 0.007503808 seconds [ Info: Dimensions of the Wronskians [13] [ Info: Ranks of the Wronskians computed in 3.5909e-5 seconds [ Info: Simplifying generating set. Simplification level: standard [ Info: Search for polynomial generators concluded in 0.002228299 [ Info: Selecting generators in 0.010212182 [ Info: Inclusion checked with probability 0.995 in 0.006832005 seconds [ Info: The search for identifiable functions concluded in 2.079305666 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 0.007249171 seconds [ Info: Computing Wronskians [ Info: Computed Wronskians in 0.004871524 seconds [ Info: Dimensions of the Wronskians [13] [ Info: Ranks of the Wronskians computed in 2.909e-5 seconds [ Info: Simplifying generating set. Simplification level: standard [ Info: Search for polynomial generators concluded in 0.00211995 [ Info: Selecting generators in 0.008636307 [ Info: Inclusion checked with probability 0.995 in 0.006419928 seconds [ Info: The search for identifiable functions concluded in 0.048428436 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 0.007651927 seconds [ Info: Computing Wronskians [ Info: Computed Wronskians in 0.004886144 seconds [ Info: Dimensions of the Wronskians [13] [ Info: Ranks of the Wronskians computed in 3.03e-5 seconds [ Info: Simplifying generating set. Simplification level: standard [ Info: Search for polynomial generators concluded in 0.002142569 [ Info: Selecting generators in 0.009425389 [ Info: Inclusion checked with probability 0.995 in 0.006071851 seconds [ Info: The search for identifiable functions concluded in 0.049155268 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 0.004840634 seconds [ Info: Computing Wronskians [ Info: Computed Wronskians in 0.002864262 seconds [ Info: Dimensions of the Wronskians [5] [ Info: Ranks of the Wronskians computed in 1.978e-5 seconds [ Info: Simplifying generating set. Simplification level: weak [ Info: Search for polynomial generators concluded in 9.7819e-5 [ Info: Selecting generators in 0.001885042 [ Info: Inclusion checked with probability 0.995 in 0.003882832 seconds [ Info: The search for identifiable functions concluded in 0.024043839 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 0.004935653 seconds [ Info: Computing Wronskians [ Info: Computed Wronskians in 0.00309222 seconds [ Info: Dimensions of the Wronskians [5] [ Info: Ranks of the Wronskians computed in 2.156e-5 seconds [ Info: Simplifying generating set. Simplification level: weak [ Info: Search for polynomial generators concluded in 0.000112839 [ Info: Selecting generators in 0.001960031 [ Info: Inclusion checked with probability 0.995 in 0.004089261 seconds [ Info: The search for identifiable functions concluded in 0.025404526 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 0.004963273 seconds [ Info: Computing Wronskians [ Info: Computed Wronskians in 0.003182869 seconds [ Info: Dimensions of the Wronskians [5] [ Info: Ranks of the Wronskians computed in 2.295e-5 seconds [ Info: Simplifying generating set. Simplification level: weak [ Info: Search for polynomial generators concluded in 0.000103369 [ Info: Selecting generators in 0.001848462 [ Info: Inclusion checked with probability 0.995 in 0.003964122 seconds [ Info: The search for identifiable functions concluded in 0.025524875 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 0.005039982 seconds [ Info: Computing Wronskians [ Info: Computed Wronskians in 0.002869542 seconds [ Info: Dimensions of the Wronskians [5] [ Info: Ranks of the Wronskians computed in 2.1099e-5 seconds [ Info: Simplifying generating set. Simplification level: standard [ Info: Search for polynomial generators concluded in 0.001372217 [ Info: Selecting generators in 0.001986881 [ Info: Inclusion checked with probability 0.995 in 0.003968842 seconds [ Info: The search for identifiable functions concluded in 0.026937021 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 0.006067932 seconds [ Info: Computing Wronskians [ Info: Computed Wronskians in 0.003083951 seconds [ Info: Dimensions of the Wronskians [5] [ Info: Ranks of the Wronskians computed in 2.6489e-5 seconds [ Info: Simplifying generating set. Simplification level: standard [ Info: Search for polynomial generators concluded in 0.001258208 [ Info: Selecting generators in 0.002027731 [ Info: Inclusion checked with probability 0.995 in 0.0042058 seconds [ Info: The search for identifiable functions concluded in 0.02815535 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 0.004887683 seconds [ Info: Computing Wronskians [ Info: Computed Wronskians in 0.002935191 seconds [ Info: Dimensions of the Wronskians [5] [ Info: Ranks of the Wronskians computed in 2.131e-5 seconds [ Info: Simplifying generating set. Simplification level: standard [ Info: Search for polynomial generators concluded in 0.001230958 [ Info: Selecting generators in 0.00201228 [ Info: Inclusion checked with probability 0.995 in 0.003930012 seconds [ Info: The search for identifiable functions concluded in 0.026591355 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 0.004994712 seconds [ Info: Computing Wronskians [ Info: Computed Wronskians in 0.002879653 seconds [ Info: Dimensions of the Wronskians [4] [ Info: Ranks of the Wronskians computed in 2.219e-5 seconds [ Info: Simplifying generating set. Simplification level: weak [ Info: Search for polynomial generators concluded in 0.000102849 [ Info: Selecting generators in 0.002639375 [ Info: Inclusion checked with probability 0.995 in 0.00415713 seconds [ Info: The search for identifiable functions concluded in 0.029794034 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 0.005022512 seconds [ Info: Computing Wronskians [ Info: Computed Wronskians in 0.002898462 seconds [ Info: Dimensions of the Wronskians [4] [ Info: Ranks of the Wronskians computed in 2.028e-5 seconds [ Info: Simplifying generating set. Simplification level: weak [ Info: Search for polynomial generators concluded in 0.000116249 [ Info: Selecting generators in 0.002422656 [ Info: Inclusion checked with probability 0.995 in 0.003890163 seconds [ Info: The search for identifiable functions concluded in 0.028370088 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 0.004732035 seconds [ Info: Computing Wronskians [ Info: Computed Wronskians in 0.002795963 seconds [ Info: Dimensions of the Wronskians [4] [ Info: Ranks of the Wronskians computed in 1.98e-5 seconds [ Info: Simplifying generating set. Simplification level: weak [ Info: Search for polynomial generators concluded in 9.7329e-5 [ Info: Selecting generators in 0.002381237 [ Info: Inclusion checked with probability 0.995 in 0.003590545 seconds [ Info: The search for identifiable functions concluded in 0.027676675 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 0.004742784 seconds [ Info: Computing Wronskians [ Info: Computed Wronskians in 0.002843833 seconds [ Info: Dimensions of the Wronskians [4] [ Info: Ranks of the Wronskians computed in 2.005e-5 seconds [ Info: Simplifying generating set. Simplification level: standard [ Info: Search for polynomial generators concluded in 0.017917569 [ Info: Selecting generators in 0.003568516 [ Info: Inclusion checked with probability 0.995 in 0.003502346 seconds [ Info: The search for identifiable functions concluded in 0.046394805 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 0.004722185 seconds [ Info: Computing Wronskians [ Info: Computed Wronskians in 0.002787653 seconds [ Info: Dimensions of the Wronskians [4] [ Info: Ranks of the Wronskians computed in 2.018e-5 seconds [ Info: Simplifying generating set. Simplification level: standard [ Info: Search for polynomial generators concluded in 0.017596331 [ Info: Selecting generators in 0.003536856 [ Info: Inclusion checked with probability 0.995 in 0.003619385 seconds [ Info: The search for identifiable functions concluded in 0.046175827 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 0.004705875 seconds [ Info: Computing Wronskians [ Info: Computed Wronskians in 0.002759953 seconds [ Info: Dimensions of the Wronskians [4] [ Info: Ranks of the Wronskians computed in 1.964e-5 seconds [ Info: Simplifying generating set. Simplification level: standard [ Info: Search for polynomial generators concluded in 0.017198465 [ Info: Selecting generators in 0.003537326 [ Info: Inclusion checked with probability 0.995 in 0.003513726 seconds [ Info: The search for identifiable functions concluded in 0.045189677 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 0.002309657 seconds [ Info: Computing Wronskians [ Info: Computed Wronskians in 0.001692394 seconds [ Info: Dimensions of the Wronskians [3] [ Info: Ranks of the Wronskians computed in 1.766e-5 seconds [ Info: Simplifying generating set. Simplification level: weak [ Info: Search for polynomial generators concluded in 8.8019e-5 [ Info: Selecting generators in 0.001648684 [ Info: Inclusion checked with probability 0.995 in 0.003203959 seconds [ Info: The search for identifiable functions concluded in 0.017067256 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 0.002299268 seconds [ Info: Computing Wronskians [ Info: Computed Wronskians in 0.001689114 seconds [ Info: Dimensions of the Wronskians [3] [ Info: Ranks of the Wronskians computed in 1.6789e-5 seconds [ Info: Simplifying generating set. Simplification level: weak [ Info: Search for polynomial generators concluded in 9.1769e-5 [ Info: Selecting generators in 0.001798583 [ Info: Inclusion checked with probability 0.995 in 0.003366888 seconds [ Info: The search for identifiable functions concluded in 0.018152816 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 0.002724603 seconds [ Info: Computing Wronskians [ Info: Computed Wronskians in 0.001989711 seconds [ Info: Dimensions of the Wronskians [3] [ Info: Ranks of the Wronskians computed in 2.059e-5 seconds [ Info: Simplifying generating set. Simplification level: weak [ Info: Search for polynomial generators concluded in 9.3219e-5 [ Info: Selecting generators in 0.001741593 [ Info: Inclusion checked with probability 0.995 in 0.003334268 seconds [ Info: The search for identifiable functions concluded in 0.018957058 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 0.002602315 seconds [ Info: Computing Wronskians [ Info: Computed Wronskians in 0.001964831 seconds [ Info: Dimensions of the Wronskians [3] [ Info: Ranks of the Wronskians computed in 3.168e-5 seconds [ Info: Simplifying generating set. Simplification level: standard [ Info: Search for polynomial generators concluded in 0.013217863 [ Info: Selecting generators in 0.003013161 [ Info: Inclusion checked with probability 0.995 in 0.003393557 seconds [ Info: The search for identifiable functions concluded in 0.033528568 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 0.002681434 seconds [ Info: Computing Wronskians [ Info: Computed Wronskians in 0.00201273 seconds [ Info: Dimensions of the Wronskians [3] [ Info: Ranks of the Wronskians computed in 1.9e-5 seconds [ Info: Simplifying generating set. Simplification level: standard [ Info: Search for polynomial generators concluded in 0.01353756 [ Info: Selecting generators in 0.0030846 [ Info: Inclusion checked with probability 0.995 in 0.003541706 seconds [ Info: The search for identifiable functions concluded in 0.033998774 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 0.002535656 seconds [ Info: Computing Wronskians [ Info: Computed Wronskians in 0.00204527 seconds [ Info: Dimensions of the Wronskians [3] [ Info: Ranks of the Wronskians computed in 1.889e-5 seconds [ Info: Simplifying generating set. Simplification level: standard [ Info: Search for polynomial generators concluded in 0.01351182 [ Info: Selecting generators in 0.00315082 [ Info: Inclusion checked with probability 0.995 in 0.003521846 seconds [ Info: The search for identifiable functions concluded in 0.034180323 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 0.015044665 seconds [ Info: Computing Wronskians [ Info: Computed Wronskians in 0.032060893 seconds [ Info: Dimensions of the Wronskians [69] [ Info: Ranks of the Wronskians computed in 0.000362867 seconds [ Info: Simplifying generating set. Simplification level: weak ⌜ # Computing specializations.. Time: 0:00:09 ✓ # Computing specializations.. Time: 0:00:09 [ Info: Search for polynomial generators concluded in 0.000190798 [ Info: Selecting generators in 0.019140546 [ Info: Inclusion checked with probability 0.995 in 0.034519939 seconds [ Info: The search for identifiable functions concluded in 17.301920146 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 0.016886948 seconds [ Info: Computing Wronskians [ Info: Computed Wronskians in 0.035101624 seconds [ Info: Dimensions of the Wronskians [69] [ Info: Ranks of the Wronskians computed in 0.000285768 seconds [ Info: Simplifying generating set. Simplification level: weak [ Info: Search for polynomial generators concluded in 0.000134589 [ Info: Selecting generators in 0.020586403 [ Info: Inclusion checked with probability 0.995 in 0.034191912 seconds [ Info: The search for identifiable functions concluded in 0.193898371 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 0.016521311 seconds [ Info: Computing Wronskians [ Info: Computed Wronskians in 0.035156793 seconds [ Info: Dimensions of the Wronskians [69] [ Info: Ranks of the Wronskians computed in 0.000275087 seconds [ Info: Simplifying generating set. Simplification level: weak [ Info: Search for polynomial generators concluded in 0.000137759 [ Info: Selecting generators in 0.021554953 [ Info: Inclusion checked with probability 0.995 in 0.030750985 seconds [ Info: The search for identifiable functions concluded in 0.18552101 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 0.662821793 seconds [ Info: Computing Wronskians [ Info: Computed Wronskians in 0.034816747 seconds [ Info: Dimensions of the Wronskians [69] [ Info: Ranks of the Wronskians computed in 0.000387207 seconds [ Info: Simplifying generating set. Simplification level: standard [ Info: Search for polynomial generators concluded in 1.372939161 [ Info: Selecting generators in 0.015091716 [ Info: Inclusion checked with probability 0.995 in 0.025543415 seconds [ Info: The search for identifiable functions concluded in 2.185854724 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 0.013003445 seconds [ Info: Computing Wronskians [ Info: Computed Wronskians in 0.026604045 seconds [ Info: Dimensions of the Wronskians [69] [ Info: Ranks of the Wronskians computed in 0.000363567 seconds [ Info: Simplifying generating set. Simplification level: standard [ Info: Search for polynomial generators concluded in 0.04377242 [ Info: Selecting generators in 0.014882537 [ Info: Inclusion checked with probability 0.995 in 0.026672444 seconds [ Info: The search for identifiable functions concluded in 0.196211038 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 0.013990876 seconds [ Info: Computing Wronskians [ Info: Computed Wronskians in 0.027224369 seconds [ Info: Dimensions of the Wronskians [69] [ Info: Ranks of the Wronskians computed in 0.000374927 seconds [ Info: Simplifying generating set. Simplification level: standard [ Info: Search for polynomial generators concluded in 0.042619522 [ Info: Selecting generators in 0.016315683 [ Info: Inclusion checked with probability 0.995 in 0.025613595 seconds [ Info: The search for identifiable functions concluded in 0.193835421 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 1.786590393 seconds [ Info: Computing Wronskians [ Info: Computed Wronskians in 11.375896398 seconds [ Info: Dimensions of the Wronskians [830, 3] [ Info: Ranks of the Wronskians computed in 0.179752876 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: 8   ✓ # Computing specializations.. Time: 0:00:00 [ Info: Search for polynomial generators concluded in 0.000141968 [ Info: Selecting generators in 0.98731555 [ Info: Inclusion checked with probability 0.995 in 2.645462677 seconds [ Info: The search for identifiable functions concluded in 21.037582608 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 3.295980727 seconds [ Info: Computing Wronskians [ Info: Computed Wronskians in 9.802226193 seconds [ Info: Dimensions of the Wronskians [830, 3] [ Info: Ranks of the Wronskians computed in 0.181474379 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 Points: 3   ✓ # Computing specializations.. Time: 0:00:00 [ Info: Search for polynomial generators concluded in 0.000152018 [ Info: Selecting generators in 1.112944075 [ Info: Inclusion checked with probability 0.995 in 2.326676574 seconds [ Info: The search for identifiable functions concluded in 20.84691054 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 3.406390068 seconds [ Info: Computing Wronskians [ Info: Computed Wronskians in 9.727789719 seconds [ Info: Dimensions of the Wronskians [830, 3] [ Info: Ranks of the Wronskians computed in 0.222988961 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 Points: 7   ✓ # Computing specializations.. Time: 0:00:00 [ Info: Search for polynomial generators concluded in 0.000135748 [ Info: Selecting generators in 0.589507286 [ Info: Inclusion checked with probability 0.995 in 2.793604036 seconds [ Info: The search for identifiable functions concluded in 20.844267708 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 2.00081928 seconds [ Info: Computing Wronskians ====================================================================================== 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 16 running 1 of 1 signal (10): User defined signal 1 fmpz_zero at /workspace/srcdir/flint-3.4.0/src/fmpz.h:127:9 [inlined] fmpz_mpoly_get_coeff_fmpz_monomial at /workspace/srcdir/flint-3.4.0/src/fmpz_mpoly/get_coeff_fmpz_monomial.c:30:9 fmpq_mpoly_get_coeff_fmpq_monomial at /workspace/srcdir/flint-3.4.0/src/fmpq_mpoly/get_coeff_fmpq_monomial.c:18:5 coeff at /home/pkgeval/.julia/packages/Nemo/MT5uH/src/flint/fmpq_mpoly.jl:125:51 monomial_compress at /home/pkgeval/.julia/packages/StructuralIdentifiability/31snG/src/wronskian.jl:44:140 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:833:52 wronskian at /home/pkgeval/.julia/packages/StructuralIdentifiability/31snG/src/wronskian.jl:199:135 #initial_identifiable_functions#207 at /home/pkgeval/.julia/packages/StructuralIdentifiability/31snG/src/global_identifiability.jl:87:581 initial_identifiable_functions at /home/pkgeval/.julia/packages/StructuralIdentifiability/31snG/src/global_identifiability.jl:87:82 [inlined] #_find_identifiable_functions#243 at /home/pkgeval/.julia/packages/StructuralIdentifiability/31snG/src/identifiable_functions.jl:107:151 _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:62:17 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:60:24 [inlined] find_identifiable_functions at /home/pkgeval/.julia/packages/StructuralIdentifiability/31snG/src/identifiable_functions.jl:48:99 unknown function (ip: 0x79c0b36b2340) at (unknown file) _jl_invoke at /source/src/gf.c:4111:23 [inlined] ijl_apply_generic at /source/src/gf.c:4337:12 jl_apply at /source/src/julia.h:2327:12 [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:598:35 eval_body at /source/src/interpreter.c:567:21 eval_body at /source/src/interpreter.c:575:21 eval_body at /source/src/interpreter.c:575:21 eval_body at /source/src/interpreter.c:575:21 jl_interpret_toplevel_thunk at /source/src/interpreter.c:901:21 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:3113:145 _jl_invoke at /source/src/gf.c:4111:23 [inlined] ijl_apply_generic at /source/src/gf.c:4337:12 _include at ./loading.jl:3173:45 include at ./Base.jl:327:3 IncludeInto at ./Base.jl:328:4 unknown function (ip: 0x79c08a9f6302) at (unknown file) _jl_invoke at /source/src/gf.c:4111:23 [inlined] ijl_apply_generic at /source/src/gf.c:4337:12 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:154:484 jl_invoke_oneshot at /source/src/gf.c:4146:23 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:3113:145 _jl_invoke at /source/src/gf.c:4111:23 [inlined] ijl_apply_generic at /source/src/gf.c:4337:12 _include at ./loading.jl:3173:45 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:4111:23 [inlined] ijl_apply_generic at /source/src/gf.c:4337:12 jl_apply at /source/src/julia.h:2327:12 [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:710:13 jl_interpret_toplevel_thunk at /source/src/interpreter.c:901:21 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:318:410 _start at ./client.jl:593:36 jfptr__start_0.1 at /opt/julia/lib/julia/sys.so (unknown line) _jl_invoke at /source/src/gf.c:4111:23 [inlined] ijl_apply_generic at /source/src/gf.c:4337:12 jl_apply at /source/src/julia.h:2327:12 [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: 0x79c0d3865249) 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: Computed Wronskians in 10.627960456 seconds [ Info: Dimensions of the Wronskians [830, 3] ====================================================================================== 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:1246:50 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:4111:23 [inlined] ijl_apply_generic at /source/src/gf.c:4337:12 jl_apply at /source/src/julia.h:2327:12 [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 ============================================================== [ Info: Ranks of the Wronskians computed in 0.36701782 seconds [ Info: Simplifying generating set. Simplification level: standard ┌ 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 0x00007728410c0a60 Total snapshots: 385. Utilization: 0% ╎385 @Base/task.jl:1168 wait_forever() 384╎ 385 @Base/task.jl:1246 wait() ┌ 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 0x000079c0b8ffc010 Total snapshots: 257. Utilization: 100% ╎218 @Base/client.jl:593 _start() ╎ 218 @Base/client.jl:318 exec_options(opts::Base.JLOptions) ╎ 218 @Base/boot.jl:517 eval(m::Module, e::Any) ╎ 218 @Base/Base.jl:328 (::Base.IncludeInto)(fname::String) ╎ 218 @Base/Base.jl:327 include(mapexpr::Function, mod::Module, _path::St… ╎ 218 @Base/loading.jl:3173 _include(mapexpr::Function, mod::Module, _pa… ╎ ╎ 218 @Base/loading.jl:3113 include_string(mapexpr::typeof(identity), m… ╎ ╎ 218 @Base/boot.jl:517 eval(m::Module, e::Any) ╎ ╎ 218 @StructuralIdentifiability/…:154 top-level scope ╎ ╎ 218 @Base/timing.jl:739 macro expansion ╎ ╎ 218 @StructuralIdentifiability/…:155 macro expansion ╎ ╎ ╎ 218 @Test/src/Test.jl:2246 macro expansion ╎ ╎ ╎ 218 @StructuralIdentifiability/…:157 macro expansion ╎ ╎ ╎ 218 @Base/Base.jl:328 (::Base.IncludeInto)(fname::String) ╎ ╎ ╎ 218 @Base/Base.jl:327 include(mapexpr::Function, mod::Module,… ╎ ╎ ╎ 218 @Base/loading.jl:3173 _include(mapexpr::Function, mod::M… ╎ ╎ ╎ ╎ 218 @Base/loading.jl:3113 include_string(mapexpr::typeof(id… ╎ ╎ ╎ ╎ 218 @Base/boot.jl:517 eval(m::Module, e::Any) ╎ ╎ ╎ ╎ 218 @StructuralIdentifiability/…:48 kwcall(::@NamedTuple{… ╎ ╎ ╎ ╎ 218 @StructuralIdentifiability/…:60 #find_identifiable_f… ╎ ╎ ╎ ╎ 218 @Base/…ogging.jl:653 with_logger ╎ ╎ ╎ ╎ ╎ 218 @Base/…gging.jl:542 with_logstate(f::StructuralIde… ╎ ╎ ╎ ╎ ╎ 218 @StructuralIdentifiability/…:62 (::StructuralIden… ╎ ╎ ╎ ╎ ╎ 218 @StructuralIdentifiability/…:85 _find_identifiab… ╎ ╎ ╎ ╎ ╎ 218 @StructuralIdentifiability/…:107 _find_identifi… ╎ ╎ ╎ ╎ ╎ 218 @StructuralIdentifiability/…:87 initial_identi… ╎ ╎ ╎ ╎ ╎ ╎ 218 @StructuralIdentifiability/…:87 initial_ident… ╎ ╎ ╎ ╎ ╎ ╎ 218 @StructuralIdentifiability/…:199 wronskian(i… ╎ ╎ ╎ ╎ ╎ ╎ 218 @Base/…ay.jl:833 collect(itr::Base.Generato… ╎ ╎ ╎ ╎ ╎ ╎ 218 @Base/…or.jl:48 iterate(::Base.Generator{B… ╎ ╎ ╎ ╎ ╎ ╎ 218 none:? iterate(v::Base.ValueIterator{Dict… ╎ ╎ ╎ ╎ ╎ ╎ ╎ 218 @StructuralIdentifiability/…:20 iterate(… 1╎ ╎ ╎ ╎ ╎ ╎ ╎ 1 @Base/…ay.jl:474 first(itr::AbstractAlg… ╎ ╎ ╎ ╎ ╎ ╎ ╎ 4 @StructuralIdentifiability/…:42 monomia… ╎ ╎ ╎ ╎ ╎ ╎ ╎ 1 @Base/…ls.jl:1039 iterate(z::Base.Iter… 1╎ ╎ ╎ ╎ ╎ ╎ ╎ 1 @Base/…ls.jl:391 _zip_iterate_all(is:… 3╎ ╎ ╎ ╎ ╎ ╎ ╎ 3 @Base/…ls.jl:1040 iterate(z::Base.Iter… ╎ ╎ ╎ ╎ ╎ ╎ ╎ 57 @StructuralIdentifiability/…:43 monomia… ╎ ╎ ╎ ╎ ╎ ╎ ╎ 16 @AbstractAlgebra/…:348 iterate(z::Base… ╎ ╎ ╎ ╎ ╎ ╎ ╎ 16 @AbstractAlgebra/…:601 _zip_iterate_a… ╎ ╎ ╎ ╎ ╎ ╎ ╎ 16 @AbstractAlgebra/…:437 iszero 16╎ ╎ ╎ ╎ ╎ ╎ ╎ ╎ 16 @Base/…on.jl:637 == ╎ ╎ ╎ ╎ ╎ ╎ ╎ 41 @AbstractAlgebra/…:349 iterate(z::Base… ╎ ╎ ╎ ╎ ╎ ╎ ╎ 41 @Base/…ay.jl:475 first(itr::AbstractA… ╎ ╎ ╎ ╎ ╎ ╎ ╎ 41 @AbstractAlgebra/…:879 iterate(x::Ab… 2╎ ╎ ╎ ╎ ╎ ╎ ╎ ╎ 41 @AbstractAlgebra/…:881 iterate(x::A… ╎ ╎ ╎ ╎ ╎ ╎ ╎ ╎ 4 @Nemo/…ly.jl:956 monomial(a::QQMPo… ╎ ╎ ╎ ╎ ╎ ╎ ╎ ╎ 4 @Nemo/…ly.jl:1040 (::QQMPolyRing)… 1╎ ╎ ╎ ╎ ╎ ╎ ╎ ╎ 1 @Nemo/…es.jl:1234 QQMPolyRingEle… ╎ ╎ ╎ ╎ ╎ ╎ ╎ ╎ 3 @Nemo/…es.jl:1237 QQMPolyRingEle… 3╎ ╎ ╎ ╎ ╎ ╎ ╎ ╎ 3 @Base/…ls.jl:86 finalizer 35╎ ╎ ╎ ╎ ╎ ╎ ╎ ╎ 35 @Nemo/…ly.jl:959 monomial(a::QQMPo… 2╎ ╎ ╎ ╎ ╎ ╎ ╎ 105 @StructuralIdentifiability/…:44 monomia… ╎ ╎ ╎ ╎ ╎ ╎ ╎ 73 @AbstractAlgebra/…:287 iterate(z::Base… 1╎ ╎ ╎ ╎ ╎ ╎ ╎ 1 @Base/…ay.jl:474 first(itr::AbstractA… ╎ ╎ ╎ ╎ ╎ ╎ ╎ 70 @Base/…ay.jl:475 first(itr::AbstractA… ╎ ╎ ╎ ╎ ╎ ╎ ╎ 70 @AbstractAlgebra/…:849 iterate(x::Ab… ╎ ╎ ╎ ╎ ╎ ╎ ╎ ╎ 70 @AbstractAlgebra/…:851 iterate(x::A… ╎ ╎ ╎ ╎ ╎ ╎ ╎ ╎ 2 @Nemo/…ly.jl:110 coeff 2╎ ╎ ╎ ╎ ╎ ╎ ╎ ╎ 2 @Nemo/…es.jl:178 QQFieldElem 68╎ ╎ ╎ ╎ ╎ ╎ ╎ ╎ 68 @Nemo/…ly.jl:117 coeff!(z::QQField… ╎ ╎ ╎ ╎ ╎ ╎ ╎ 2 @AbstractAlgebra/…:552 _zip_iterate_a… ╎ ╎ ╎ ╎ ╎ ╎ ╎ 2 @AbstractAlgebra/…:553 _zip_iterate_… ╎ ╎ ╎ ╎ ╎ ╎ ╎ ╎ 2 @AbstractAlgebra/…:396 iterate(A::V… 2╎ ╎ ╎ ╎ ╎ ╎ ╎ ╎ 2 @AbstractAlgebra/…:397 iterate(A::… ╎ ╎ ╎ ╎ ╎ ╎ ╎ 15 @Nemo/…pq.jl:593 iterate(z::Base.Itera… ╎ ╎ ╎ ╎ ╎ ╎ ╎ 15 @Nemo/…pq.jl:552 _zip_iterate_all(is:… ╎ ╎ ╎ ╎ ╎ ╎ ╎ 1 @Nemo/…pq.jl:553 divexact(a::QQField… ╎ ╎ ╎ ╎ ╎ ╎ ╎ ╎ 1 @Nemo/…pq.jl:118 iszero(a::QQFieldE… ╎ ╎ ╎ ╎ ╎ ╎ ╎ ╎ 1 @Nemo/…pz.jl:306 iszero(a::Ptr{ZZR… 1╎ ╎ ╎ ╎ ╎ ╎ ╎ ╎ 1 @Base/…on.jl:637 == ╎ ╎ ╎ ╎ ╎ ╎ ╎ 14 @Nemo/…pq.jl:554 divexact(a::QQField… 1╎ ╎ ╎ ╎ ╎ ╎ ╎ ╎ 1 @Nemo/…es.jl:178 QQFieldElem() ╎ ╎ ╎ ╎ ╎ ╎ ╎ ╎ 3 @Nemo/…es.jl:180 QQFieldElem() 3╎ ╎ ╎ ╎ ╎ ╎ ╎ ╎ 3 @Base/…ls.jl:86 finalizer 10╎ ╎ ╎ ╎ ╎ ╎ ╎ ╎ 10 @Nemo/…pq.jl:1171 QQFieldElem() 1╎ ╎ ╎ ╎ ╎ ╎ ╎ 1 @Nemo/…ly.jl:121 coeff(a::QQMPolyRingE… ╎ ╎ ╎ ╎ ╎ ╎ ╎ 3 @Nemo/…ly.jl:124 coeff(a::QQMPolyRingE… 2╎ ╎ ╎ ╎ ╎ ╎ ╎ 2 @Nemo/…es.jl:178 QQFieldElem() ╎ ╎ ╎ ╎ ╎ ╎ ╎ 1 @Nemo/…es.jl:180 QQFieldElem() 1╎ ╎ ╎ ╎ ╎ ╎ ╎ 1 @Base/…ls.jl:86 finalizer 11╎ ╎ ╎ ╎ ╎ ╎ ╎ 11 @Nemo/…ly.jl:125 coeff(a::QQMPolyRingE… ╎ ╎ ╎ ╎ ╎ ╎ ╎ 36 @StructuralIdentifiability/…:46 monomia… ╎ ╎ ╎ ╎ ╎ ╎ ╎ 11 @Nemo/…ly.jl:286 *(a::QQFieldElem, b::… ╎ ╎ ╎ ╎ ╎ ╎ ╎ 11 @Nemo/…ly.jl:758 (::QQMPolyRing)() 11╎ ╎ ╎ ╎ ╎ ╎ ╎ 11 @Nemo/…ly.jl:740 QQMPolyRingElem(ctx… ╎ ╎ ╎ ╎ ╎ ╎ ╎ 25 @Nemo/…ly.jl:262 -(a::QQMPolyRingElem,… 24╎ ╎ ╎ ╎ ╎ ╎ ╎ 25 @Nemo/…ly.jl:722 check_parent(a::QQMP… ╎ ╎ ╎ ╎ ╎ ╎ ╎ 15 @StructuralIdentifiability/…:47 monomia… ╎ ╎ ╎ ╎ ╎ ╎ ╎ 2 @Nemo/…ly.jl:286 *(a::QQFieldElem, b::… ╎ ╎ ╎ ╎ ╎ ╎ ╎ 2 @Nemo/…ly.jl:758 (::QQMPolyRing)() 2╎ ╎ ╎ ╎ ╎ ╎ ╎ 2 @Nemo/…ly.jl:740 QQMPolyRingElem(ctx… ╎ ╎ ╎ ╎ ╎ ╎ ╎ 13 @Nemo/…ly.jl:256 +(a::QQMPolyRingElem,… 13╎ ╎ ╎ ╎ ╎ ╎ ╎ 13 @Nemo/…ly.jl:712 check_parent(a::QQMP… ⌜ # Computing specializations.. Time: 0:00:02 ✓ # Computing specializations.. Time: 0:00:02 ⌜ # 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 [ Info: Search for polynomial generators concluded in 0.028097191 [1] signal 15: Terminated in expression starting at /PkgEval.jl/scripts/evaluate.jl:214 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:1246:50 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:4111:23 [inlined] ijl_apply_generic at /source/src/gf.c:4337:12 jl_apply at /source/src/julia.h:2327:12 [inlined] start_task at /source/src/task.c:1275:19 unknown function (ip: (nil)) at (unknown file) Allocations: 19482322 (Pool: 19481610; Big: 712); GC: 15 [16] signal 15: Terminated in expression starting at /home/pkgeval/.julia/packages/StructuralIdentifiability/31snG/test/identifiable_functions.jl:1149 arraylist_push at /source/src/support/arraylist.c:70:26 schedule_finalization at /source/src/gc-common.c:162:5 sweep_finalizer_list at /source/src/gc-stock.c:2927:13 _jl_gc_collect at /source/src/gc-stock.c:3119:17 ijl_gc_collect at /source/src/gc-stock.c:3526:13 maybe_collect at /source/src/gc-stock.c:357:9 [inlined] ijl_gc_counted_calloc at /source/src/gc-stock.c:3834:9 flint_calloc at /workspace/srcdir/flint-3.4.0/src/generic_files/memory_manager.c:134:12 fmpz_mpoly_realloc at /workspace/srcdir/flint-3.4.0/src/fmpz_mpoly/realloc.c:58:33 _do_monomial_gcd at /workspace/srcdir/flint-3.4.0/src/fmpz_mpoly_factor/gcd_algo.c:471:9 _fmpz_mpoly_gcd_algo_small at /workspace/srcdir/flint-3.4.0/src/fmpz_mpoly_factor/gcd_algo.c:1453:16 _fmpz_mpoly_gcd_algo at /workspace/srcdir/flint-3.4.0/src/fmpz_mpoly_factor/gcd_algo.c:1911:16 fmpz_mpoly_gcd at /workspace/srcdir/flint-3.4.0/src/fmpz_mpoly/gcd.c:45:12 fmpq_mpoly_gcd at /workspace/srcdir/flint-3.4.0/src/fmpq_mpoly/gcd.c:38:1 gcd at /home/pkgeval/.julia/packages/Nemo/MT5uH/src/flint/fmpq_mpoly.jl:321:40 cancel_gcds at /home/pkgeval/.julia/packages/RationalFunctionFields/E2pFC/src/util.jl:81:49 _ at /home/pkgeval/.julia/packages/RationalFunctionFields/E2pFC/src/IdealOMS.jl:88:559 IdealOMS at /home/pkgeval/.julia/packages/RationalFunctionFields/E2pFC/src/IdealOMS.jl:60:7 [inlined] update_trbasis_info! at /home/pkgeval/.julia/packages/RationalFunctionFields/E2pFC/src/Field.jl:108:160 RationalFunctionField at /home/pkgeval/.julia/packages/RationalFunctionFields/E2pFC/src/Field.jl:50:72 RationalFunctionField at /home/pkgeval/.julia/packages/RationalFunctionFields/E2pFC/src/Field.jl:37:4 unknown function (ip: 0x79c08a520752) at (unknown file) _jl_invoke at /source/src/gf.c:4111:23 [inlined] ijl_apply_generic at /source/src/gf.c:4337:12 #simplified_generating_set#137 at /home/pkgeval/.julia/packages/RationalFunctionFields/E2pFC/src/simplification.jl:319:754 simplified_generating_set at /home/pkgeval/.julia/packages/RationalFunctionFields/E2pFC/src/simplification.jl:319:66 unknown function (ip: 0x79c0b36b2f34) at (unknown file) _jl_invoke at /source/src/gf.c:4111:23 [inlined] ijl_apply_generic at /source/src/gf.c:4337:12 #_find_identifiable_functions#243 at /home/pkgeval/.julia/packages/StructuralIdentifiability/31snG/src/identifiable_functions.jl:119:198 _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:62:17 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:60:24 [inlined] find_identifiable_functions at /home/pkgeval/.julia/packages/StructuralIdentifiability/31snG/src/identifiable_functions.jl:48:99 unknown function (ip: 0x79c0b36b2340) at (unknown file) _jl_invoke at /source/src/gf.c:4111:23 [inlined] ijl_apply_generic at /source/src/gf.c:4337:12 jl_apply at /source/src/julia.h:2327:12 [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:598:35 eval_body at /source/src/interpreter.c:567:21 eval_body at /source/src/interpreter.c:575:21 eval_body at /source/src/interpreter.c:575:21 eval_body at /source/src/interpreter.c:575:21 jl_interpret_toplevel_thunk at /source/src/interpreter.c:901:21 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:3113:145 _jl_invoke at /source/src/gf.c:4111:23 [inlined] ijl_apply_generic at /source/src/gf.c:4337:12 _include at ./loading.jl:3173:45 include at ./Base.jl:327:3 IncludeInto at ./Base.jl:328:4 unknown function (ip: 0x79c08a9f6302) at (unknown file) _jl_invoke at /source/src/gf.c:4111:23 [inlined] ijl_apply_generic at /source/src/gf.c:4337:12 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:154:484 jl_invoke_oneshot at /source/src/gf.c:4146:23 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:3113:145 _jl_invoke at /source/src/gf.c:4111:23 [inlined] ijl_apply_generic at /source/src/gf.c:4337:12 _include at ./loading.jl:3173:45 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:4111:23 [inlined] ijl_apply_generic at /source/src/gf.c:4337:12 jl_apply at /source/src/julia.h:2327:12 [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:710:13 jl_interpret_toplevel_thunk at /source/src/interpreter.c:901:21 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:318:410 _start at ./client.jl:593:36 jfptr__start_0.1 at /opt/julia/lib/julia/sys.so (unknown line) _jl_invoke at /source/src/gf.c:4111:23 [inlined] ijl_apply_generic at /source/src/gf.c:4337:12 jl_apply at /source/src/julia.h:2327:12 [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: 0x79c0d3865249) 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: 425274689 (Pool: 425271496; Big: 3193); GC: 141 PkgEval terminated after 2723.02s: test duration exceeded the time limit