Package evaluation to test SmoothPeriodicStatsModels on Julia 1.14.0-DEV.2114 (cccbcd9611*) started at 2026-05-05T17:47:44.812 ################################################################################ # Set-up # Installing PkgEval dependencies (TestEnv)... Activating project at `~/.julia/environments/v1.14` Set-up completed after 14.77s ################################################################################ # Installation # Installing SmoothPeriodicStatsModels... Resolving package versions... Updating `~/.julia/environments/v1.14/Project.toml` [3d8e1505] + SmoothPeriodicStatsModels v2.1.0 Updating `~/.julia/environments/v1.14/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 [66dad0bd] + AliasTables v1.1.3 [dce04be8] + ArgCheck v2.5.0 [ec485272] + ArnoldiMethod v0.4.0 [4fba245c] + ArrayInterface v7.24.0 [4c555306] + ArrayLayouts v1.12.2 [aae01518] + BandedMatrices v1.11.0 [7b33fef7] + BigCombinatorics v0.3.6 [e2ed5e7c] + Bijections v0.2.2 [caf10ac8] + BipartiteGraphs v0.1.7 [8e7c35d0] + BlockArrays v1.9.3 [70df07ce] + BracketingNonlinearSolve v1.12.1 [082447d4] + ChainRules v1.73.0 [d360d2e6] + ChainRulesCore v1.26.1 [523fee87] + CodecBzip2 v0.8.5 [944b1d66] + CodecZlib v0.7.8 ⌅ [861a8166] + Combinatorics v1.0.2 [38540f10] + CommonSolve v0.2.6 [bbf7d656] + CommonSubexpressions v0.3.1 [f70d9fcc] + CommonWorldInvalidations v1.0.0 [34da2185] + Compat v4.18.1 [b152e2b5] + CompositeTypes v0.1.4 [a33af91c] + CompositionsBase v0.1.2 [2569d6c7] + ConcreteStructs v0.2.3 [88cd18e8] + ConsoleProgressMonitor v0.1.2 [187b0558] + ConstructionBase v1.6.0 ⌃ [ae264745] + Copulas v0.1.32 [9a962f9c] + DataAPI v1.16.0 [864edb3b] + DataStructures v0.19.4 [e2d170a0] + DataValueInterfaces v1.0.0 [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 [31c24e10] + Distributions v0.25.125 [ffbed154] + DocStringExtensions v0.9.5 ⌅ [5b8099bc] + DomainSets v0.7.18 [7c1d4256] + DynamicPolynomials v0.6.6 [4e289a0a] + EnumX v1.0.7 [f151be2c] + EnzymeCore v0.8.20 [e2ba6199] + ExprTools v0.1.10 [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 [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 [19dc6840] + HCubature v1.8.0 [34004b35] + HypergeometricFunctions v0.3.28 [3263718b] + ImplicitDiscreteSolve v2.0.0 [313cdc1a] + Indexing v1.1.1 [d25df0c9] + Inflate v0.1.5 [18e54dd8] + IntegerMathUtils v0.1.3 [8197267c] + IntervalSets v0.7.14 [3587e190] + InverseFunctions v0.1.17 [b6b21f68] + Ipopt v1.14.3 [92d709cd] + IrrationalConstants v0.2.6 [82899510] + IteratorInterfaceExtensions v1.0.0 [692b3bcd] + JLLWrappers v1.7.1 [682c06a0] + JSON v1.5.2 [ae98c720] + Jieko v0.2.1 [4076af6c] + JuMP v1.30.1 [ccbc3e58] + JumpProcesses v9.28.0 [ba0b0d4f] + Krylov v0.10.6 [984bce1d] + LambertW v1.0.0 [1d6d02ad] + LeftChildRightSiblingTrees v0.2.1 [87fe0de2] + LineSearch v0.1.9 [7ed4a6bd] + LinearSolve v3.75.0 [2ab3a3ac] + LogExpFunctions v0.3.29 [e6f89c97] + LoggingExtras v1.2.0 ⌅ [2fda8390] + LsqFit v0.15.1 [1914dd2f] + MacroTools v0.5.16 [b8f27783] + MathOptInterface v1.51.0 [bb5d69b7] + MaybeInplace v0.1.4 [e1d29d7a] + Missings v1.2.0 [7771a370] + ModelingToolkitBase v1.33.1 [2e0e35c7] + Moshi v0.3.7 [46d2c3a1] + MuladdMacro v0.2.4 [102ac46a] + MultivariatePolynomials v0.5.19 [d8a4904e] + MutableArithmetics v1.7.1 [37188c8d] + MvNormalCDF v0.3.2 ⌅ [d41bc354] + NLSolversBase v7.10.0 [77ba4419] + NaNMath v1.1.3 [be0214bd] + NonlinearSolveBase v2.25.0 [5959db7a] + NonlinearSolveFirstOrder v2.1.1 [6fe1bfb0] + OffsetArrays v1.17.0 [7f7a1694] + Optimization v5.5.1 [bca83a33] + OptimizationBase v5.1.1 [fd9f6733] + OptimizationMOI v1.3.1 [bac558e1] + OrderedCollections v1.8.1 [bbf590c4] + OrdinaryDiffEqCore v4.0.0 [90014a1f] + PDMats v0.11.37 [69de0a69] + Parsers v2.8.4 ⌅ [4873b48c] + PeriodicHiddenMarkovModels v0.1.5 [e409e4f3] + PoissonRandom v0.4.7 [85e3b03c] + PolyLog v2.6.2 [d236fae5] + PreallocationTools v1.2.0 [aea7be01] + PrecompileTools v1.3.3 [21216c6a] + Preferences v1.5.2 [27ebfcd6] + Primes v0.5.7 [33c8b6b6] + ProgressLogging v0.1.6 [92933f4c] + ProgressMeter v1.11.0 [43287f4e] + PtrArrays v1.4.0 [1fd47b50] + QuadGK v2.11.3 [988b38a3] + ReadOnlyArrays v0.2.0 [795d4caa] + ReadOnlyDicts v1.0.1 [c1ae055f] + RealDot v0.1.0 [3cdcf5f2] + RecipesBase v1.3.4 [731186ca] + RecursiveArrayTools v4.3.0 [189a3867] + Reexport v1.2.2 [ae029012] + Requires v1.3.1 [79098fc4] + Rmath v0.9.0 ⌅ [f2b01f46] + Roots v2.3.0 [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 [431bcebd] + SciMLPublic v1.0.1 [53ae85a6] + SciMLStructures v1.10.0 [efcf1570] + Setfield v1.1.2 [1277b4bf] + ShiftedArrays v2.0.0 [727e6d20] + SimpleNonlinearSolve v2.11.1 [699a6c99] + SimpleTraits v0.9.5 [3d8e1505] + SmoothPeriodicStatsModels v2.1.0 [a2af1166] + SortingAlgorithms v1.2.2 [9f842d2f] + SparseConnectivityTracer v1.2.1 [dc90abb0] + SparseInverseSubset v0.1.2 [0a514795] + SparseMatrixColorings v0.4.27 [276daf66] + SpecialFunctions v2.7.2 [0c0c59c1] + StarAlgebras v0.3.0 [90137ffa] + StaticArrays v1.9.18 [1e83bf80] + StaticArraysCore v1.4.4 [10745b16] + Statistics v1.11.1 [82ae8749] + StatsAPI v1.8.0 [2913bbd2] + StatsBase v0.34.10 [4c63d2b9] + StatsFuns v1.5.2 [09ab397b] + StructArrays v0.7.3 [ec057cc2] + StructUtils v2.8.1 [2efcf032] + SymbolicIndexingInterface v0.3.46 [19f23fe9] + SymbolicLimits v1.1.0 [d1185830] + SymbolicUtils v4.26.1 [0c5d862f] + Symbolics v7.21.0 [3783bdb8] + TableTraits v1.0.1 [bd369af6] + Tables v1.12.1 [ed4db957] + TaskLocalValues v0.1.3 [b36ab563] + TaylorDiff v0.3.5 [8ea1fca8] + TermInterface v2.0.0 [5d786b92] + TerminalLoggers v0.1.7 [a759f4b9] + TimerOutputs v0.5.29 [3bb67fe8] + TranscodingStreams v0.11.3 [781d530d] + TruncatedStacktraces v1.4.0 [3a884ed6] + UnPack v1.0.2 [d30d5f5c] + WeakCacheSets v0.1.0 [48feb556] + WilliamsonTransforms v0.2.0 [ae81ac8f] + ASL_jll v0.1.3+0 [6e34b625] + Bzip2_jll v1.0.9+0 [e33a78d0] + Hwloc_jll v2.13.0+1 [1d5cc7b8] + IntelOpenMP_jll v2025.2.0+0 [9cc047cb] + Ipopt_jll v300.1400.1901+0 [94ce4f54] + Libiconv_jll v1.18.0+0 [d00139f3] + METIS_jll v5.1.3+0 [856f044c] + MKL_jll v2025.2.0+0 ⌅ [d7ed1dd3] + MUMPS_seq_jll v500.800.200+0 [656ef2d0] + OpenBLAS32_jll v0.3.33+0 [efe28fd5] + OpenSpecFun_jll v0.5.6+0 [f50d1b31] + Rmath_jll v0.5.1+0 [319450e9] + SPRAL_jll v2025.9.18+0 ⌅ [02c8fc9c] + XML2_jll v2.13.9+0 [a65dc6b1] + Xorg_libpciaccess_jll v0.19.0+0 [1317d2d5] + oneTBB_jll v2022.0.0+1 [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 [9fa8497b] + Future v1.11.0 [b77e0a4c] + InteractiveUtils v1.11.0 [ac6e5ff7] + JuliaSyntaxHighlighting v1.13.0 [4af54fe1] + LazyArtifacts v1.11.0 [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 [3fa0cd96] + REPL 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 [4607b0f0] + SuiteSparse [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 [deac9b47] + LibCURL_jll v8.19.0+0 [e37daf67] + LibGit2_jll v1.9.2+0 [29816b5a] + LibSSH2_jll v1.11.3+1 [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 ⌃ and ⌅ have new versions available. Those with ⌃ may be upgradable, but those with ⌅ are restricted by compatibility constraints from upgrading. To see why use `status --outdated -m` Installation completed after 10.58s ################################################################################ # Precompilation # Precompiling PkgEval dependencies... ┌ Warning: Could not use exact versions of packages in manifest, re-resolving └ @ TestEnv ~/.julia/packages/TestEnv/RUPmD/src/julia-1.13/activate_set.jl:78 Precompiling package dependencies... Precompiling project... 4.7 s ✓ PeriodicHiddenMarkovModels 9.5 s ✓ Copulas WARNING: Imported binding ModelingToolkitBase.mergedefaults was undeclared at import time during import to OptimizationMOI. 76.3 s ✓ OptimizationMOI 94.1 s ✓ SmoothPeriodicStatsModels 4 dependencies successfully precompiled in 191 seconds. 332 already precompiled. 1 dependency had output during precompilation: ┌ OptimizationMOI │ WARNING: Imported binding ModelingToolkitBase.mergedefaults was undeclared at import time during import to OptimizationMOI. └ Precompilation completed after 220.41s ################################################################################ # Testing # Testing SmoothPeriodicStatsModels Test Could not use exact versions of packages in manifest, re-resolving. Note: if you do not check your manifest file into source control, then you can probably ignore this message. However, if you do check your manifest file into source control, then you probably want to pass the `allow_reresolve = false` kwarg when calling the `Pkg.test` function. Updating `/tmp/jl_SvEVI2/Project.toml` ⌃ [7f7a1694] ↓ Optimization v5.5.1 ⇒ v5.4.0 ⌃ [fd9f6733] ↓ OptimizationMOI v1.3.1 ⇒ v1.1.0 ⌃ [36348300] + OptimizationOptimJL v0.4.8 Updating `/tmp/jl_SvEVI2/Manifest.toml` [62783981] + BitTwiddlingConvenienceFunctions v0.1.6 [2a0fbf3d] + CPUSummary v0.2.7 [082447d4] - ChainRules v1.73.0 [d360d2e6] - ChainRulesCore v1.26.1 [fb6a15b2] + CloseOpenIntervals v0.1.13 [ae264745] ↑ Copulas v0.1.32 ⇒ v0.1.33 [adafc99b] + CpuId v0.3.1 [e2d170a0] - DataValueInterfaces v1.0.0 ⌅ [2b5f629d] ↓ DiffEqBase v7.2.0 ⇒ v6.218.0 [615f187c] + IfElse v0.1.1 ⌃ [3263718b] ↓ ImplicitDiscreteSolve v2.0.0 ⇒ v1.11.0 [10f19ff3] + LayoutPointers v0.1.17 ⌃ [d3d80556] + LineSearches v7.5.1 [d125e4d3] + ManualMemory v0.1.8 ⌅ [429524aa] + Optim v1.13.3 ⌃ [7f7a1694] ↓ Optimization v5.5.1 ⇒ v5.4.0 ⌅ [bca83a33] ↓ OptimizationBase v5.1.1 ⇒ v4.2.0 ⌃ [fd9f6733] ↓ OptimizationMOI v1.3.1 ⇒ v1.1.0 ⌃ [36348300] + OptimizationOptimJL v0.4.8 ⌅ [bbf590c4] ↓ OrdinaryDiffEqCore v4.0.0 ⇒ v3.33.1 [f517fe37] + Polyester v0.7.19 [1d0040c9] + PolyesterWeave v0.2.2 [85a6dd25] + PositiveFactorizations v0.2.4 [c1ae055f] - RealDot v0.1.0 ⌅ [731186ca] ↓ RecursiveArrayTools v4.3.0 ⇒ v3.54.0 [94e857df] + SIMDTypes v0.1.0 ⌅ [0bca4576] ↓ SciMLBase v3.7.1 ⇒ v2.155.1 [dc90abb0] - SparseInverseSubset v0.1.2 [aedffcd0] + Static v1.4.0 [0d7ed370] + StaticArrayInterface v1.10.0 [7792a7ef] + StrideArraysCore v0.5.9 [09ab397b] - StructArrays v0.7.3 [3783bdb8] - TableTraits v1.0.1 [bd369af6] - Tables v1.12.1 [b36ab563] - TaylorDiff v0.3.5 ⌅ [6aa5eb33] + TaylorSeries v0.20.10 [8290d209] + ThreadingUtilities v0.5.5 [48feb556] - WilliamsonTransforms v0.2.0 Info Packages marked with ⌃ and ⌅ have new versions available. Those with ⌃ may be upgradable, but those with ⌅ are restricted by compatibility constraints from upgrading. To see why use `status --outdated -m` Test Successfully re-resolved Status `/tmp/jl_SvEVI2/Project.toml` [31c24e10] Distributions v0.25.125 [b6b21f68] Ipopt v1.14.3 ⌃ [7f7a1694] Optimization v5.4.0 ⌃ [fd9f6733] OptimizationMOI v1.1.0 ⌃ [36348300] OptimizationOptimJL v0.4.8 [3d8e1505] SmoothPeriodicStatsModels v2.1.0 [8ba89e20] Distributed v1.11.0 [9a3f8284] Random v1.11.0 [8dfed614] Test v1.11.0 Status `/tmp/jl_SvEVI2/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 [66dad0bd] AliasTables v1.1.3 [dce04be8] ArgCheck v2.5.0 [ec485272] ArnoldiMethod v0.4.0 [4fba245c] ArrayInterface v7.24.0 [4c555306] ArrayLayouts v1.12.2 [aae01518] BandedMatrices v1.11.0 [7b33fef7] BigCombinatorics v0.3.6 [e2ed5e7c] Bijections v0.2.2 [caf10ac8] BipartiteGraphs v0.1.7 [62783981] BitTwiddlingConvenienceFunctions v0.1.6 [8e7c35d0] BlockArrays v1.9.3 [70df07ce] BracketingNonlinearSolve v1.12.1 [2a0fbf3d] CPUSummary v0.2.7 [fb6a15b2] CloseOpenIntervals v0.1.13 [523fee87] CodecBzip2 v0.8.5 [944b1d66] CodecZlib v0.7.8 ⌅ [861a8166] Combinatorics v1.0.2 [38540f10] CommonSolve v0.2.6 [bbf7d656] CommonSubexpressions v0.3.1 [f70d9fcc] CommonWorldInvalidations v1.0.0 [34da2185] Compat v4.18.1 [b152e2b5] CompositeTypes v0.1.4 [a33af91c] CompositionsBase v0.1.2 [2569d6c7] ConcreteStructs v0.2.3 [88cd18e8] ConsoleProgressMonitor v0.1.2 [187b0558] ConstructionBase v1.6.0 [ae264745] Copulas v0.1.33 [adafc99b] CpuId v0.3.1 [9a962f9c] DataAPI v1.16.0 [864edb3b] DataStructures v0.19.4 [85a47980] Dictionaries v0.4.6 ⌅ [2b5f629d] DiffEqBase v6.218.0 [459566f4] DiffEqCallbacks v4.17.0 [163ba53b] DiffResults v1.1.0 [b552c78f] DiffRules v1.15.1 [a0c0ee7d] DifferentiationInterface v0.7.17 [31c24e10] Distributions v0.25.125 [ffbed154] DocStringExtensions v0.9.5 ⌅ [5b8099bc] DomainSets v0.7.18 [7c1d4256] DynamicPolynomials v0.6.6 [4e289a0a] EnumX v1.0.7 [f151be2c] EnzymeCore v0.8.20 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Those with ⌃ may be upgradable, but those with ⌅ are restricted by compatibility constraints from upgrading. Testing Running tests... ****************************************************************************** This program contains Ipopt, a library for large-scale nonlinear optimization. Ipopt is released as open source code under the Eclipse Public License (EPL). For more information visit https://github.com/coin-or/Ipopt ****************************************************************************** Test Summary: | Pass Total Time Mixture: fit_mle_trig_exp2_EM | 1 1 1m44.4s This is Ipopt version 3.14.19, running with linear solver MUMPS 5.8.2. Number of nonzeros in equality constraint Jacobian...: 0 Number of nonzeros in inequality constraint Jacobian.: 0 Number of nonzeros in Lagrangian Hessian.............: 45 Total number of variables............................: 9 variables with only lower bounds: 0 variables with lower and upper bounds: 0 variables with only upper bounds: 0 Total number of equality constraints.................: 0 Total number of inequality constraints...............: 0 inequality constraints with only lower bounds: 0 inequality constraints with lower and upper bounds: 0 inequality constraints with only upper bounds: 0 iter objective inf_pr inf_du lg(mu) ||d|| lg(rg) alpha_du alpha_pr ls 0 7.6362027e+04 0.00e+00 1.00e+02 -1.0 0.00e+00 - 0.00e+00 0.00e+00 0 1 6.6402376e+04 0.00e+00 5.42e+01 -1.0 7.02e-01 2.0 1.00e+00 1.00e+00f 1 2 6.1247052e+04 0.00e+00 1.66e+01 -1.0 1.16e+00 1.5 1.00e+00 1.00e+00f 1 3 6.0579579e+04 0.00e+00 4.42e+00 -1.0 2.55e-01 1.0 1.00e+00 1.00e+00f 1 4 6.0466446e+04 0.00e+00 2.86e+00 -1.0 1.30e+00 - 1.00e+00 5.00e-01f 2 5 6.0422636e+04 0.00e+00 9.14e-01 -1.0 6.05e-01 - 1.00e+00 5.00e-01f 2 6 6.0415568e+04 0.00e+00 9.13e-02 -1.7 1.55e-01 - 1.00e+00 1.00e+00f 1 7 6.0415522e+04 0.00e+00 3.82e-03 -2.5 8.37e-03 - 1.00e+00 1.00e+00f 1 8 6.0415522e+04 0.00e+00 2.71e-07 -3.8 7.79e-05 - 1.00e+00 1.00e+00f 1 9 6.0415522e+04 0.00e+00 9.64e-14 -8.6 7.88e-08 - 1.00e+00 1.00e+00f 1 Number of Iterations....: 9 (scaled) (unscaled) Objective...............: 7.0807779659514051e+02 6.0415521689485693e+04 Dual infeasibility......: 9.6371770908720653e-14 8.2227558095837594e-12 Constraint violation....: 0.0000000000000000e+00 0.0000000000000000e+00 Variable bound violation: 0.0000000000000000e+00 0.0000000000000000e+00 Complementarity.........: 0.0000000000000000e+00 0.0000000000000000e+00 Overall NLP error.......: 9.6371770908720653e-14 8.2227558095837594e-12 Number of objective function evaluations = 20 Number of objective gradient evaluations = 10 Number of equality constraint evaluations = 0 Number of inequality constraint evaluations = 0 Number of equality constraint Jacobian evaluations = 0 Number of inequality constraint Jacobian evaluations = 0 Number of Lagrangian Hessian evaluations = 9 Total seconds in IPOPT = 19.631 EXIT: Optimal Solution Found. ┌ Warning: The selected optimization algorithm requires second order derivatives, but `SecondOrder` ADtype was not provided. │ So a `SecondOrder` with AutoForwardDiff() for both inner and outer will be created, this can be suboptimal and not work in some cases so │ an explicit `SecondOrder` ADtype is recommended. └ @ OptimizationBase ~/.julia/packages/OptimizationBase/mYxHK/src/cache.jl:58 Test Summary: | Pass Total Time Mixture: fit_mle_trig_exp2_Optim | 2 2 1m22.0s Test Summary: | Total Time Sample from HMM | 0 9.9s Iteration 0: logtot = -201568.92006610453 Iteration 1: logtot = -195817.320946, max(|θᴬᵢ-θᴬᵢ₋₁|) = 0.15179 & max(|θᴮᵢ-θᴮᵢ₋₁|) = 0.89752 Iteration 2: logtot = -195584.231599, max(|θᴬᵢ-θᴬᵢ₋₁|) = 0.04869 & max(|θᴮᵢ-θᴮᵢ₋₁|) = 0.17141 Iteration 3: logtot = -195406.385005, max(|θᴬᵢ-θᴬᵢ₋₁|) = 0.05822 & max(|θᴮᵢ-θᴮᵢ₋₁|) = 0.14627 Iteration 4: logtot = -195266.979211, max(|θᴬᵢ-θᴬᵢ₋₁|) = 0.06723 & max(|θᴮᵢ-θᴮᵢ₋₁|) = 0.12114 Iteration 5: logtot = -195153.777466, max(|θᴬᵢ-θᴬᵢ₋₁|) = 0.07733 & max(|θᴮᵢ-θᴮᵢ₋₁|) = 0.09699 Iteration 6: logtot = -195057.069307, max(|θᴬᵢ-θᴬᵢ₋₁|) = 0.08407 & max(|θᴮᵢ-θᴮᵢ₋₁|) = 0.09705 Iteration 7: logtot = -194971.140124, max(|θᴬᵢ-θᴬᵢ₋₁|) = 0.088 & max(|θᴮᵢ-θᴮᵢ₋₁|) = 0.09502 Iteration 8: logtot = -194893.258624, max(|θᴬᵢ-θᴬᵢ₋₁|) = 0.08966 & max(|θᴮᵢ-θᴮᵢ₋₁|) = 0.09038 Iteration 9: logtot = -194822.295124, max(|θᴬᵢ-θᴬᵢ₋₁|) = 0.08954 & max(|θᴮᵢ-θᴮᵢ₋₁|) = 0.08428 Iteration 10: logtot = -194757.81897, max(|θᴬᵢ-θᴬᵢ₋₁|) = 0.08803 & max(|θᴮᵢ-θᴮᵢ₋₁|) = 0.07743 Iteration 11: logtot = -194699.634626, max(|θᴬᵢ-θᴬᵢ₋₁|) = 0.08546 & max(|θᴮᵢ-θᴮᵢ₋₁|) = 0.0702 Iteration 12: logtot = -194647.569354, max(|θᴬᵢ-θᴬᵢ₋₁|) = 0.08211 & max(|θᴮᵢ-θᴮᵢ₋₁|) = 0.06287 Iteration 13: logtot = -194601.388349, max(|θᴬᵢ-θᴬᵢ₋₁|) = 0.07819 & max(|θᴮᵢ-θᴮᵢ₋₁|) = 0.05563 Iteration 14: logtot = -194560.773297, max(|θᴬᵢ-θᴬᵢ₋₁|) = 0.07388 & max(|θᴮᵢ-θᴮᵢ₋₁|) = 0.05399 Iteration 15: logtot = -194525.33171, max(|θᴬᵢ-θᴬᵢ₋₁|) = 0.06933 & max(|θᴮᵢ-θᴮᵢ₋₁|) = 0.05466 Iteration 16: logtot = -194494.619238, max(|θᴬᵢ-θᴬᵢ₋₁|) = 0.06468 & max(|θᴮᵢ-θᴮᵢ₋₁|) = 0.0547 Iteration 17: logtot = -194468.164866, max(|θᴬᵢ-θᴬᵢ₋₁|) = 0.06002 & max(|θᴮᵢ-θᴮᵢ₋₁|) = 0.05415 Iteration 18: logtot = -194445.493619, max(|θᴬᵢ-θᴬᵢ₋₁|) = 0.05545 & max(|θᴮᵢ-θᴮᵢ₋₁|) = 0.05302 Iteration 19: logtot = -194426.144475, max(|θᴬᵢ-θᴬᵢ₋₁|) = 0.05104 & max(|θᴮᵢ-θᴮᵢ₋₁|) = 0.05139 Iteration 20: logtot = -194409.683077, max(|θᴬᵢ-θᴬᵢ₋₁|) = 0.04682 & max(|θᴮᵢ-θᴮᵢ₋₁|) = 0.04934 Iteration 21: logtot = -194395.709809, max(|θᴬᵢ-θᴬᵢ₋₁|) = 0.04284 & max(|θᴮᵢ-θᴮᵢ₋₁|) = 0.04695 Iteration 22: logtot = -194383.864109, max(|θᴬᵢ-θᴬᵢ₋₁|) = 0.03911 & max(|θᴮᵢ-θᴮᵢ₋₁|) = 0.04432 Iteration 23: logtot = -194373.825948, max(|θᴬᵢ-θᴬᵢ₋₁|) = 0.03692 & max(|θᴮᵢ-θᴮᵢ₋₁|) = 0.04153 Iteration 24: logtot = -194365.315249, max(|θᴬᵢ-θᴬᵢ₋₁|) = 0.03494 & max(|θᴮᵢ-θᴮᵢ₋₁|) = 0.03865 Iteration 25: logtot = -194358.089854, max(|θᴬᵢ-θᴬᵢ₋₁|) = 0.03311 & max(|θᴮᵢ-θᴮᵢ₋₁|) = 0.03576 Iteration 26: logtot = -194351.942582, max(|θᴬᵢ-θᴬᵢ₋₁|) = 0.03175 & max(|θᴮᵢ-θᴮᵢ₋₁|) = 0.03291 Iteration 27: logtot = -194346.697739, max(|θᴬᵢ-θᴬᵢ₋₁|) = 0.03181 & max(|θᴮᵢ-θᴮᵢ₋₁|) = 0.03014 Iteration 28: logtot = -194342.207427, max(|θᴬᵢ-θᴬᵢ₋₁|) = 0.03176 & max(|θᴮᵢ-θᴮᵢ₋₁|) = 0.02748 Iteration 29: logtot = -194338.347882, max(|θᴬᵢ-θᴬᵢ₋₁|) = 0.03161 & max(|θᴮᵢ-θᴮᵢ₋₁|) = 0.02496 Iteration 30: logtot = -194335.015995, max(|θᴬᵢ-θᴬᵢ₋₁|) = 0.03138 & max(|θᴮᵢ-θᴮᵢ₋₁|) = 0.02258 Iteration 31: logtot = -194332.126142, max(|θᴬᵢ-θᴬᵢ₋₁|) = 0.03108 & max(|θᴮᵢ-θᴮᵢ₋₁|) = 0.02036 Iteration 32: logtot = -194329.607362, max(|θᴬᵢ-θᴬᵢ₋₁|) = 0.03072 & max(|θᴮᵢ-θᴮᵢ₋₁|) = 0.0183 Iteration 33: logtot = -194327.400901, max(|θᴬᵢ-θᴬᵢ₋₁|) = 0.03032 & max(|θᴮᵢ-θᴮᵢ₋₁|) = 0.01638 Iteration 34: logtot = -194325.458116, max(|θᴬᵢ-θᴬᵢ₋₁|) = 0.02988 & max(|θᴮᵢ-θᴮᵢ₋₁|) = 0.01462 Iteration 35: logtot = -194323.738707, max(|θᴬᵢ-θᴬᵢ₋₁|) = 0.02941 & max(|θᴮᵢ-θᴮᵢ₋₁|) = 0.01301 Iteration 36: logtot = -194322.209239, max(|θᴬᵢ-θᴬᵢ₋₁|) = 0.02893 & max(|θᴮᵢ-θᴮᵢ₋₁|) = 0.01153 Iteration 37: logtot = -194320.841922, max(|θᴬᵢ-θᴬᵢ₋₁|) = 0.02843 & max(|θᴮᵢ-θᴮᵢ₋₁|) = 0.01056 Iteration 38: logtot = -194319.613603, max(|θᴬᵢ-θᴬᵢ₋₁|) = 0.02792 & max(|θᴮᵢ-θᴮᵢ₋₁|) = 0.01015 Iteration 39: logtot = -194318.50494, max(|θᴬᵢ-θᴬᵢ₋₁|) = 0.0274 & max(|θᴮᵢ-θᴮᵢ₋₁|) = 0.00974 Iteration 40: logtot = -194317.49973, max(|θᴬᵢ-θᴬᵢ₋₁|) = 0.02689 & max(|θᴮᵢ-θᴮᵢ₋₁|) = 0.00935 Iteration 41: logtot = -194316.58435, max(|θᴬᵢ-θᴬᵢ₋₁|) = 0.02637 & max(|θᴮᵢ-θᴮᵢ₋₁|) = 0.00897 Iteration 42: logtot = -194315.747316, max(|θᴬᵢ-θᴬᵢ₋₁|) = 0.02586 & max(|θᴮᵢ-θᴮᵢ₋₁|) = 0.00859 Iteration 43: logtot = -194314.978909, max(|θᴬᵢ-θᴬᵢ₋₁|) = 0.02536 & max(|θᴮᵢ-θᴮᵢ₋₁|) = 0.00823 Iteration 44: logtot = -194314.270872, max(|θᴬᵢ-θᴬᵢ₋₁|) = 0.02487 & max(|θᴮᵢ-θᴮᵢ₋₁|) = 0.00789 Iteration 45: logtot = -194313.616172, max(|θᴬᵢ-θᴬᵢ₋₁|) = 0.02438 & max(|θᴮᵢ-θᴮᵢ₋₁|) = 0.00756 Iteration 46: logtot = -194313.008791, max(|θᴬᵢ-θᴬᵢ₋₁|) = 0.0239 & max(|θᴮᵢ-θᴮᵢ₋₁|) = 0.00724 Iteration 47: logtot = -194312.443563, max(|θᴬᵢ-θᴬᵢ₋₁|) = 0.02354 & max(|θᴮᵢ-θᴮᵢ₋₁|) = 0.00693 Iteration 48: logtot = -194311.916036, max(|θᴬᵢ-θᴬᵢ₋₁|) = 0.02332 & max(|θᴮᵢ-θᴮᵢ₋₁|) = 0.00664 Iteration 49: logtot = -194311.42236, max(|θᴬᵢ-θᴬᵢ₋₁|) = 0.0231 & max(|θᴮᵢ-θᴮᵢ₋₁|) = 0.0064 Iteration 50: logtot = -194310.959195, max(|θᴬᵢ-θᴬᵢ₋₁|) = 0.02287 & max(|θᴮᵢ-θᴮᵢ₋₁|) = 0.00642 Iteration 51: logtot = -194310.52363, max(|θᴬᵢ-θᴬᵢ₋₁|) = 0.02265 & max(|θᴮᵢ-θᴮᵢ₋₁|) = 0.00643 Iteration 52: logtot = -194310.113123, max(|θᴬᵢ-θᴬᵢ₋₁|) = 0.02243 & max(|θᴮᵢ-θᴮᵢ₋₁|) = 0.00641 Iteration 53: logtot = -194309.725442, max(|θᴬᵢ-θᴬᵢ₋₁|) = 0.0222 & max(|θᴮᵢ-θᴮᵢ₋₁|) = 0.00638 Iteration 54: logtot = -194309.358624, max(|θᴬᵢ-θᴬᵢ₋₁|) = 0.02198 & max(|θᴮᵢ-θᴮᵢ₋₁|) = 0.00633 Iteration 55: logtot = -194309.010935, max(|θᴬᵢ-θᴬᵢ₋₁|) = 0.02176 & max(|θᴮᵢ-θᴮᵢ₋₁|) = 0.00627 Iteration 56: logtot = -194308.680839, max(|θᴬᵢ-θᴬᵢ₋₁|) = 0.02154 & max(|θᴮᵢ-θᴮᵢ₋₁|) = 0.0062 Iteration 57: logtot = -194308.36697, max(|θᴬᵢ-θᴬᵢ₋₁|) = 0.02132 & max(|θᴮᵢ-θᴮᵢ₋₁|) = 0.00612 Iteration 58: logtot = -194308.068112, max(|θᴬᵢ-θᴬᵢ₋₁|) = 0.0211 & max(|θᴮᵢ-θᴮᵢ₋₁|) = 0.00603 Iteration 59: logtot = -194307.783174, max(|θᴬᵢ-θᴬᵢ₋₁|) = 0.02088 & max(|θᴮᵢ-θᴮᵢ₋₁|) = 0.00594 Iteration 60: logtot = -194307.51118, max(|θᴬᵢ-θᴬᵢ₋₁|) = 0.02066 & max(|θᴮᵢ-θᴮᵢ₋₁|) = 0.00584 Iteration 61: logtot = -194307.251249, max(|θᴬᵢ-θᴬᵢ₋₁|) = 0.02044 & max(|θᴮᵢ-θᴮᵢ₋₁|) = 0.00573 Iteration 62: logtot = -194307.002589, max(|θᴬᵢ-θᴬᵢ₋₁|) = 0.02022 & max(|θᴮᵢ-θᴮᵢ₋₁|) = 0.00562 Iteration 63: logtot = -194306.76448, max(|θᴬᵢ-θᴬᵢ₋₁|) = 0.02 & max(|θᴮᵢ-θᴮᵢ₋₁|) = 0.00551 Iteration 64: logtot = -194306.536269, max(|θᴬᵢ-θᴬᵢ₋₁|) = 0.01978 & max(|θᴮᵢ-θᴮᵢ₋₁|) = 0.00539 Iteration 65: logtot = -194306.317363, max(|θᴬᵢ-θᴬᵢ₋₁|) = 0.01956 & max(|θᴮᵢ-θᴮᵢ₋₁|) = 0.00527 Iteration 66: logtot = -194306.107219, max(|θᴬᵢ-θᴬᵢ₋₁|) = 0.01934 & max(|θᴮᵢ-θᴮᵢ₋₁|) = 0.00516 Iteration 67: logtot = -194305.905342, max(|θᴬᵢ-θᴬᵢ₋₁|) = 0.01912 & max(|θᴮᵢ-θᴮᵢ₋₁|) = 0.00504 Iteration 68: logtot = -194305.711276, max(|θᴬᵢ-θᴬᵢ₋₁|) = 0.0189 & max(|θᴮᵢ-θᴮᵢ₋₁|) = 0.00492 Iteration 69: logtot = -194305.524603, max(|θᴬᵢ-θᴬᵢ₋₁|) = 0.01868 & max(|θᴮᵢ-θᴮᵢ₋₁|) = 0.0048 Iteration 70: logtot = -194305.344937, max(|θᴬᵢ-θᴬᵢ₋₁|) = 0.01846 & max(|θᴮᵢ-θᴮᵢ₋₁|) = 0.00468 Iteration 71: logtot = -194305.171921, max(|θᴬᵢ-θᴬᵢ₋₁|) = 0.01824 & max(|θᴮᵢ-θᴮᵢ₋₁|) = 0.00457 Iteration 72: logtot = -194305.005225, max(|θᴬᵢ-θᴬᵢ₋₁|) = 0.01802 & max(|θᴮᵢ-θᴮᵢ₋₁|) = 0.00445 Iteration 73: logtot = -194304.844543, max(|θᴬᵢ-θᴬᵢ₋₁|) = 0.0178 & max(|θᴮᵢ-θᴮᵢ₋₁|) = 0.00434 Iteration 74: logtot = -194304.68959, max(|θᴬᵢ-θᴬᵢ₋₁|) = 0.01757 & max(|θᴮᵢ-θᴮᵢ₋₁|) = 0.00422 Iteration 75: logtot = -194304.5401, max(|θᴬᵢ-θᴬᵢ₋₁|) = 0.01735 & max(|θᴮᵢ-θᴮᵢ₋₁|) = 0.00411 Iteration 76: logtot = -194304.395825, max(|θᴬᵢ-θᴬᵢ₋₁|) = 0.01712 & max(|θᴮᵢ-θᴮᵢ₋₁|) = 0.00401 Iteration 77: logtot = -194304.256533, max(|θᴬᵢ-θᴬᵢ₋₁|) = 0.0169 & max(|θᴮᵢ-θᴮᵢ₋₁|) = 0.0039 Iteration 78: logtot = -194304.122007, max(|θᴬᵢ-θᴬᵢ₋₁|) = 0.01667 & max(|θᴮᵢ-θᴮᵢ₋₁|) = 0.0038 Iteration 79: logtot = -194303.992042, max(|θᴬᵢ-θᴬᵢ₋₁|) = 0.01645 & max(|θᴮᵢ-θᴮᵢ₋₁|) = 0.00369 Iteration 80: logtot = -194303.866447, max(|θᴬᵢ-θᴬᵢ₋₁|) = 0.01622 & max(|θᴮᵢ-θᴮᵢ₋₁|) = 0.00359 Iteration 81: logtot = -194303.74504, max(|θᴬᵢ-θᴬᵢ₋₁|) = 0.01599 & max(|θᴮᵢ-θᴮᵢ₋₁|) = 0.0035 Iteration 82: logtot = -194303.627651, max(|θᴬᵢ-θᴬᵢ₋₁|) = 0.01576 & max(|θᴮᵢ-θᴮᵢ₋₁|) = 0.0034 Iteration 83: logtot = -194303.514118, max(|θᴬᵢ-θᴬᵢ₋₁|) = 0.01553 & max(|θᴮᵢ-θᴮᵢ₋₁|) = 0.00331 Iteration 84: logtot = -194303.404289, max(|θᴬᵢ-θᴬᵢ₋₁|) = 0.0153 & max(|θᴮᵢ-θᴮᵢ₋₁|) = 0.00322 Iteration 85: logtot = -194303.298019, max(|θᴬᵢ-θᴬᵢ₋₁|) = 0.01507 & max(|θᴮᵢ-θᴮᵢ₋₁|) = 0.00313 Iteration 86: logtot = -194303.195171, max(|θᴬᵢ-θᴬᵢ₋₁|) = 0.01484 & max(|θᴮᵢ-θᴮᵢ₋₁|) = 0.00304 Iteration 87: logtot = -194303.095614, max(|θᴬᵢ-θᴬᵢ₋₁|) = 0.01461 & max(|θᴮᵢ-θᴮᵢ₋₁|) = 0.00296 Iteration 88: logtot = -194302.999224, max(|θᴬᵢ-θᴬᵢ₋₁|) = 0.01438 & max(|θᴮᵢ-θᴮᵢ₋₁|) = 0.00288 Iteration 89: logtot = -194302.905883, max(|θᴬᵢ-θᴬᵢ₋₁|) = 0.01415 & max(|θᴮᵢ-θᴮᵢ₋₁|) = 0.0028 Iteration 90: logtot = -194302.815478, max(|θᴬᵢ-θᴬᵢ₋₁|) = 0.01392 & max(|θᴮᵢ-θᴮᵢ₋₁|) = 0.00272 Iteration 91: logtot = -194302.727901, max(|θᴬᵢ-θᴬᵢ₋₁|) = 0.01369 & max(|θᴮᵢ-θᴮᵢ₋₁|) = 0.00265 Iteration 92: logtot = -194302.64305, max(|θᴬᵢ-θᴬᵢ₋₁|) = 0.01346 & max(|θᴮᵢ-θᴮᵢ₋₁|) = 0.00258 Iteration 93: logtot = -194302.560826, max(|θᴬᵢ-θᴬᵢ₋₁|) = 0.01323 & max(|θᴮᵢ-θᴮᵢ₋₁|) = 0.00251 Iteration 94: logtot = -194302.481135, max(|θᴬᵢ-θᴬᵢ₋₁|) = 0.013 & max(|θᴮᵢ-θᴮᵢ₋₁|) = 0.00244 Iteration 95: logtot = -194302.403888, max(|θᴬᵢ-θᴬᵢ₋₁|) = 0.01277 & max(|θᴮᵢ-θᴮᵢ₋₁|) = 0.00237 Iteration 96: logtot = -194302.328996, max(|θᴬᵢ-θᴬᵢ₋₁|) = 0.01254 & max(|θᴮᵢ-θᴮᵢ₋₁|) = 0.00231 Iteration 97: logtot = -194302.256379, max(|θᴬᵢ-θᴬᵢ₋₁|) = 0.01232 & max(|θᴮᵢ-θᴮᵢ₋₁|) = 0.00225 Iteration 98: logtot = -194302.185956, max(|θᴬᵢ-θᴬᵢ₋₁|) = 0.01209 & max(|θᴮᵢ-θᴮᵢ₋₁|) = 0.00219 Iteration 99: logtot = -194302.11765, max(|θᴬᵢ-θᴬᵢ₋₁|) = 0.01186 & max(|θᴮᵢ-θᴮᵢ₋₁|) = 0.00213 Iteration 100: logtot = -194302.051388, max(|θᴬᵢ-θᴬᵢ₋₁|) = 0.01164 & max(|θᴮᵢ-θᴮᵢ₋₁|) = 0.00207 Iteration 101: logtot = -194301.987101, max(|θᴬᵢ-θᴬᵢ₋₁|) = 0.01141 & max(|θᴮᵢ-θᴮᵢ₋₁|) = 0.00202 Iteration 102: logtot = -194301.924719, max(|θᴬᵢ-θᴬᵢ₋₁|) = 0.01119 & max(|θᴮᵢ-θᴮᵢ₋₁|) = 0.00196 Iteration 103: logtot = -194301.864177, max(|θᴬᵢ-θᴬᵢ₋₁|) = 0.01097 & max(|θᴮᵢ-θᴮᵢ₋₁|) = 0.00191 Iteration 104: logtot = -194301.805413, max(|θᴬᵢ-θᴬᵢ₋₁|) = 0.01075 & max(|θᴮᵢ-θᴮᵢ₋₁|) = 0.00186 Iteration 105: logtot = -194301.748366, max(|θᴬᵢ-θᴬᵢ₋₁|) = 0.01053 & max(|θᴮᵢ-θᴮᵢ₋₁|) = 0.00181 Iteration 106: logtot = -194301.692978, max(|θᴬᵢ-θᴬᵢ₋₁|) = 0.01032 & max(|θᴮᵢ-θᴮᵢ₋₁|) = 0.00176 Iteration 107: logtot = -194301.639192, max(|θᴬᵢ-θᴬᵢ₋₁|) = 0.0101 & max(|θᴮᵢ-θᴮᵢ₋₁|) = 0.00172 Iteration 108: logtot = -194301.586954, max(|θᴬᵢ-θᴬᵢ₋₁|) = 0.00989 & max(|θᴮᵢ-θᴮᵢ₋₁|) = 0.00167 Iteration 109: logtot = -194301.536213, max(|θᴬᵢ-θᴬᵢ₋₁|) = 0.00968 & max(|θᴮᵢ-θᴮᵢ₋₁|) = 0.00163 Iteration 110: logtot = -194301.486918, max(|θᴬᵢ-θᴬᵢ₋₁|) = 0.00947 & max(|θᴮᵢ-θᴮᵢ₋₁|) = 0.00159 Iteration 111: logtot = -194301.43902, max(|θᴬᵢ-θᴬᵢ₋₁|) = 0.00927 & max(|θᴮᵢ-θᴮᵢ₋₁|) = 0.00155 Iteration 112: logtot = -194301.392472, max(|θᴬᵢ-θᴬᵢ₋₁|) = 0.00906 & max(|θᴮᵢ-θᴮᵢ₋₁|) = 0.00151 Iteration 113: logtot = -194301.34723, max(|θᴬᵢ-θᴬᵢ₋₁|) = 0.00886 & max(|θᴮᵢ-θᴮᵢ₋₁|) = 0.00147 Iteration 114: logtot = -194301.303251, max(|θᴬᵢ-θᴬᵢ₋₁|) = 0.00866 & max(|θᴮᵢ-θᴮᵢ₋₁|) = 0.00143 Iteration 115: logtot = -194301.260491, max(|θᴬᵢ-θᴬᵢ₋₁|) = 0.00846 & max(|θᴮᵢ-θᴮᵢ₋₁|) = 0.00139 Iteration 116: logtot = -194301.218912, max(|θᴬᵢ-θᴬᵢ₋₁|) = 0.00827 & max(|θᴮᵢ-θᴮᵢ₋₁|) = 0.00137 Iteration 117: logtot = -194301.178473, max(|θᴬᵢ-θᴬᵢ₋₁|) = 0.00808 & max(|θᴮᵢ-θᴮᵢ₋₁|) = 0.00136 Iteration 118: logtot = -194301.139137, max(|θᴬᵢ-θᴬᵢ₋₁|) = 0.00789 & max(|θᴮᵢ-θᴮᵢ₋₁|) = 0.00134 Iteration 119: logtot = -194301.100868, max(|θᴬᵢ-θᴬᵢ₋₁|) = 0.0077 & max(|θᴮᵢ-θᴮᵢ₋₁|) = 0.00133 Iteration 120: logtot = -194301.063631, max(|θᴬᵢ-θᴬᵢ₋₁|) = 0.00751 & max(|θᴮᵢ-θᴮᵢ₋₁|) = 0.00131 Iteration 121: logtot = -194301.027393, max(|θᴬᵢ-θᴬᵢ₋₁|) = 0.00733 & max(|θᴮᵢ-θᴮᵢ₋₁|) = 0.00129 Iteration 122: logtot = -194300.99212, max(|θᴬᵢ-θᴬᵢ₋₁|) = 0.00715 & max(|θᴮᵢ-θᴮᵢ₋₁|) = 0.00128 Iteration 123: logtot = -194300.957781, max(|θᴬᵢ-θᴬᵢ₋₁|) = 0.00697 & max(|θᴮᵢ-θᴮᵢ₋₁|) = 0.00126 Iteration 124: logtot = -194300.924346, max(|θᴬᵢ-θᴬᵢ₋₁|) = 0.0068 & max(|θᴮᵢ-θᴮᵢ₋₁|) = 0.00125 Iteration 125: logtot = -194300.891787, max(|θᴬᵢ-θᴬᵢ₋₁|) = 0.00663 & max(|θᴮᵢ-θᴮᵢ₋₁|) = 0.00123 Iteration 126: logtot = -194300.860073, max(|θᴬᵢ-θᴬᵢ₋₁|) = 0.00646 & max(|θᴮᵢ-θᴮᵢ₋₁|) = 0.00122 Iteration 127: logtot = -194300.82918, max(|θᴬᵢ-θᴬᵢ₋₁|) = 0.00629 & max(|θᴮᵢ-θᴮᵢ₋₁|) = 0.00121 Iteration 128: logtot = -194300.79908, max(|θᴬᵢ-θᴬᵢ₋₁|) = 0.00613 & max(|θᴮᵢ-θᴮᵢ₋₁|) = 0.00119 Iteration 129: logtot = -194300.769747, max(|θᴬᵢ-θᴬᵢ₋₁|) = 0.00597 & max(|θᴮᵢ-θᴮᵢ₋₁|) = 0.00118 Iteration 130: logtot = -194300.741159, max(|θᴬᵢ-θᴬᵢ₋₁|) = 0.00581 & max(|θᴮᵢ-θᴮᵢ₋₁|) = 0.00116 Iteration 131: logtot = -194300.713291, max(|θᴬᵢ-θᴬᵢ₋₁|) = 0.00566 & max(|θᴮᵢ-θᴮᵢ₋₁|) = 0.00115 Iteration 132: logtot = -194300.686121, max(|θᴬᵢ-θᴬᵢ₋₁|) = 0.00551 & max(|θᴮᵢ-θᴮᵢ₋₁|) = 0.00114 Iteration 133: logtot = -194300.659626, max(|θᴬᵢ-θᴬᵢ₋₁|) = 0.00536 & max(|θᴮᵢ-θᴮᵢ₋₁|) = 0.00112 Iteration 134: logtot = -194300.633786, max(|θᴬᵢ-θᴬᵢ₋₁|) = 0.00521 & max(|θᴮᵢ-θᴮᵢ₋₁|) = 0.00111 Iteration 135: logtot = -194300.608581, max(|θᴬᵢ-θᴬᵢ₋₁|) = 0.00507 & max(|θᴮᵢ-θᴮᵢ₋₁|) = 0.0011 Iteration 136: logtot = -194300.583991, max(|θᴬᵢ-θᴬᵢ₋₁|) = 0.00493 & max(|θᴮᵢ-θᴮᵢ₋₁|) = 0.00109 Iteration 137: logtot = -194300.559996, max(|θᴬᵢ-θᴬᵢ₋₁|) = 0.00479 & max(|θᴮᵢ-θᴮᵢ₋₁|) = 0.00107 Iteration 138: logtot = -194300.53658, max(|θᴬᵢ-θᴬᵢ₋₁|) = 0.00465 & max(|θᴮᵢ-θᴮᵢ₋₁|) = 0.00106 Iteration 139: logtot = -194300.513724, max(|θᴬᵢ-θᴬᵢ₋₁|) = 0.00452 & max(|θᴮᵢ-θᴮᵢ₋₁|) = 0.00105 Iteration 140: logtot = -194300.491411, max(|θᴬᵢ-θᴬᵢ₋₁|) = 0.00439 & max(|θᴮᵢ-θᴮᵢ₋₁|) = 0.00104 Iteration 141: logtot = -194300.469625, max(|θᴬᵢ-θᴬᵢ₋₁|) = 0.00426 & max(|θᴮᵢ-θᴮᵢ₋₁|) = 0.00103 Iteration 142: logtot = -194300.44835, max(|θᴬᵢ-θᴬᵢ₋₁|) = 0.00414 & max(|θᴮᵢ-θᴮᵢ₋₁|) = 0.00101 Iteration 143: logtot = -194300.427572, max(|θᴬᵢ-θᴬᵢ₋₁|) = 0.00401 & max(|θᴮᵢ-θᴮᵢ₋₁|) = 0.001 Iteration 144: logtot = -194300.407275, max(|θᴬᵢ-θᴬᵢ₋₁|) = 0.00389 & max(|θᴮᵢ-θᴮᵢ₋₁|) = 0.00099 Iteration 145: logtot = -194300.387445, max(|θᴬᵢ-θᴬᵢ₋₁|) = 0.00378 & max(|θᴮᵢ-θᴮᵢ₋₁|) = 0.00098 Iteration 146: logtot = -194300.368069, max(|θᴬᵢ-θᴬᵢ₋₁|) = 0.00366 & max(|θᴮᵢ-θᴮᵢ₋₁|) = 0.00097 Iteration 147: logtot = -194300.349133, max(|θᴬᵢ-θᴬᵢ₋₁|) = 0.00355 & max(|θᴮᵢ-θᴮᵢ₋₁|) = 0.00096 Iteration 148: logtot = -194300.330626, max(|θᴬᵢ-θᴬᵢ₋₁|) = 0.00344 & max(|θᴮᵢ-θᴮᵢ₋₁|) = 0.00095 Iteration 149: logtot = -194300.312533, max(|θᴬᵢ-θᴬᵢ₋₁|) = 0.00333 & max(|θᴮᵢ-θᴮᵢ₋₁|) = 0.00094 Iteration 150: logtot = -194300.294845, max(|θᴬᵢ-θᴬᵢ₋₁|) = 0.00323 & max(|θᴮᵢ-θᴮᵢ₋₁|) = 0.00093 Iteration 151: logtot = -194300.277549, max(|θᴬᵢ-θᴬᵢ₋₁|) = 0.00313 & max(|θᴮᵢ-θᴮᵢ₋₁|) = 0.00092 Iteration 152: logtot = -194300.260634, max(|θᴬᵢ-θᴬᵢ₋₁|) = 0.00303 & max(|θᴮᵢ-θᴮᵢ₋₁|) = 0.00091 Iteration 153: logtot = -194300.244089, max(|θᴬᵢ-θᴬᵢ₋₁|) = 0.00293 & max(|θᴮᵢ-θᴮᵢ₋₁|) = 0.0009 Iteration 154: logtot = -194300.227905, max(|θᴬᵢ-θᴬᵢ₋₁|) = 0.00283 & max(|θᴮᵢ-θᴮᵢ₋₁|) = 0.00089 Iteration 155: logtot = -194300.212072, max(|θᴬᵢ-θᴬᵢ₋₁|) = 0.00274 & max(|θᴮᵢ-θᴮᵢ₋₁|) = 0.00088 Iteration 156: logtot = -194300.196579, max(|θᴬᵢ-θᴬᵢ₋₁|) = 0.00265 & max(|θᴮᵢ-θᴮᵢ₋₁|) = 0.00087 Iteration 157: logtot = -194300.181418, max(|θᴬᵢ-θᴬᵢ₋₁|) = 0.00256 & max(|θᴮᵢ-θᴮᵢ₋₁|) = 0.00086 Iteration 158: logtot = -194300.16658, max(|θᴬᵢ-θᴬᵢ₋₁|) = 0.00247 & max(|θᴮᵢ-θᴮᵢ₋₁|) = 0.00085 Iteration 159: logtot = -194300.152056, max(|θᴬᵢ-θᴬᵢ₋₁|) = 0.00239 & max(|θᴮᵢ-θᴮᵢ₋₁|) = 0.00084 Iteration 160: logtot = -194300.137837, max(|θᴬᵢ-θᴬᵢ₋₁|) = 0.0023 & max(|θᴮᵢ-θᴮᵢ₋₁|) = 0.00083 Iteration 161: logtot = -194300.123916, max(|θᴬᵢ-θᴬᵢ₋₁|) = 0.00222 & max(|θᴮᵢ-θᴮᵢ₋₁|) = 0.00083 Iteration 162: logtot = -194300.110285, max(|θᴬᵢ-θᴬᵢ₋₁|) = 0.00215 & max(|θᴮᵢ-θᴮᵢ₋₁|) = 0.00082 Iteration 163: logtot = -194300.096936, max(|θᴬᵢ-θᴬᵢ₋₁|) = 0.00207 & max(|θᴮᵢ-θᴮᵢ₋₁|) = 0.00081 Iteration 164: logtot = -194300.083861, max(|θᴬᵢ-θᴬᵢ₋₁|) = 0.00199 & max(|θᴮᵢ-θᴮᵢ₋₁|) = 0.0008 Iteration 165: logtot = -194300.071055, max(|θᴬᵢ-θᴬᵢ₋₁|) = 0.00192 & max(|θᴮᵢ-θᴮᵢ₋₁|) = 0.00079 Iteration 166: logtot = -194300.05851, max(|θᴬᵢ-θᴬᵢ₋₁|) = 0.00185 & max(|θᴮᵢ-θᴮᵢ₋₁|) = 0.00078 Iteration 167: logtot = -194300.046219, max(|θᴬᵢ-θᴬᵢ₋₁|) = 0.00178 & max(|θᴮᵢ-θᴮᵢ₋₁|) = 0.00078 Iteration 168: logtot = -194300.034176, max(|θᴬᵢ-θᴬᵢ₋₁|) = 0.00171 & max(|θᴮᵢ-θᴮᵢ₋₁|) = 0.00077 Iteration 169: logtot = -194300.022375, max(|θᴬᵢ-θᴬᵢ₋₁|) = 0.00165 & max(|θᴮᵢ-θᴮᵢ₋₁|) = 0.00076 Iteration 170: logtot = -194300.01081, max(|θᴬᵢ-θᴬᵢ₋₁|) = 0.00158 & max(|θᴮᵢ-θᴮᵢ₋₁|) = 0.00075 Iteration 171: logtot = -194299.999475, max(|θᴬᵢ-θᴬᵢ₋₁|) = 0.00152 & max(|θᴮᵢ-θᴮᵢ₋₁|) = 0.00074 Iteration 172: logtot = -194299.988364, max(|θᴬᵢ-θᴬᵢ₋₁|) = 0.00148 & max(|θᴮᵢ-θᴮᵢ₋₁|) = 0.00074 Iteration 173: logtot = -194299.977472, max(|θᴬᵢ-θᴬᵢ₋₁|) = 0.00147 & max(|θᴮᵢ-θᴮᵢ₋₁|) = 0.00073 Iteration 174: logtot = -194299.966794, max(|θᴬᵢ-θᴬᵢ₋₁|) = 0.00146 & max(|θᴮᵢ-θᴮᵢ₋₁|) = 0.00072 Iteration 175: logtot = -194299.956324, max(|θᴬᵢ-θᴬᵢ₋₁|) = 0.00145 & max(|θᴮᵢ-θᴮᵢ₋₁|) = 0.00072 Iteration 176: logtot = -194299.946057, max(|θᴬᵢ-θᴬᵢ₋₁|) = 0.00144 & max(|θᴮᵢ-θᴮᵢ₋₁|) = 0.00071 Iteration 177: logtot = -194299.93599, max(|θᴬᵢ-θᴬᵢ₋₁|) = 0.00143 & max(|θᴮᵢ-θᴮᵢ₋₁|) = 0.0007 Iteration 178: logtot = -194299.926116, max(|θᴬᵢ-θᴬᵢ₋₁|) = 0.00142 & max(|θᴮᵢ-θᴮᵢ₋₁|) = 0.00069 Iteration 179: logtot = -194299.916432, max(|θᴬᵢ-θᴬᵢ₋₁|) = 0.00141 & max(|θᴮᵢ-θᴮᵢ₋₁|) = 0.00069 Iteration 180: logtot = -194299.906933, max(|θᴬᵢ-θᴬᵢ₋₁|) = 0.0014 & max(|θᴮᵢ-θᴮᵢ₋₁|) = 0.00068 Iteration 181: logtot = -194299.897615, max(|θᴬᵢ-θᴬᵢ₋₁|) = 0.00139 & max(|θᴮᵢ-θᴮᵢ₋₁|) = 0.00067 Iteration 182: logtot = -194299.888473, max(|θᴬᵢ-θᴬᵢ₋₁|) = 0.00139 & max(|θᴮᵢ-θᴮᵢ₋₁|) = 0.00067 Iteration 183: logtot = -194299.879504, max(|θᴬᵢ-θᴬᵢ₋₁|) = 0.00138 & max(|θᴮᵢ-θᴮᵢ₋₁|) = 0.00066 Iteration 184: logtot = -194299.870704, max(|θᴬᵢ-θᴬᵢ₋₁|) = 0.00137 & max(|θᴮᵢ-θᴮᵢ₋₁|) = 0.00065 Iteration 185: logtot = -194299.862069, max(|θᴬᵢ-θᴬᵢ₋₁|) = 0.00136 & max(|θᴮᵢ-θᴮᵢ₋₁|) = 0.00065 Iteration 186: logtot = -194299.853595, max(|θᴬᵢ-θᴬᵢ₋₁|) = 0.00135 & max(|θᴮᵢ-θᴮᵢ₋₁|) = 0.00064 Iteration 187: logtot = -194299.845278, max(|θᴬᵢ-θᴬᵢ₋₁|) = 0.00134 & max(|θᴮᵢ-θᴮᵢ₋₁|) = 0.00064 Iteration 188: logtot = -194299.837116, max(|θᴬᵢ-θᴬᵢ₋₁|) = 0.00133 & max(|θᴮᵢ-θᴮᵢ₋₁|) = 0.00063 Iteration 189: logtot = -194299.829104, max(|θᴬᵢ-θᴬᵢ₋₁|) = 0.00132 & max(|θᴮᵢ-θᴮᵢ₋₁|) = 0.00062 Iteration 190: logtot = -194299.82124, max(|θᴬᵢ-θᴬᵢ₋₁|) = 0.00131 & max(|θᴮᵢ-θᴮᵢ₋₁|) = 0.00062 Iteration 191: logtot = -194299.813521, max(|θᴬᵢ-θᴬᵢ₋₁|) = 0.0013 & max(|θᴮᵢ-θᴮᵢ₋₁|) = 0.00061 Iteration 192: logtot = -194299.805942, max(|θᴬᵢ-θᴬᵢ₋₁|) = 0.00129 & max(|θᴮᵢ-θᴮᵢ₋₁|) = 0.00061 Iteration 193: logtot = -194299.798501, max(|θᴬᵢ-θᴬᵢ₋₁|) = 0.00128 & max(|θᴮᵢ-θᴮᵢ₋₁|) = 0.0006 Iteration 194: logtot = -194299.791196, max(|θᴬᵢ-θᴬᵢ₋₁|) = 0.00127 & max(|θᴮᵢ-θᴮᵢ₋₁|) = 0.0006 Iteration 195: logtot = -194299.784023, max(|θᴬᵢ-θᴬᵢ₋₁|) = 0.00126 & max(|θᴮᵢ-θᴮᵢ₋₁|) = 0.00059 Iteration 196: logtot = -194299.776979, max(|θᴬᵢ-θᴬᵢ₋₁|) = 0.00125 & max(|θᴮᵢ-θᴮᵢ₋₁|) = 0.00058 Iteration 197: logtot = -194299.770062, max(|θᴬᵢ-θᴬᵢ₋₁|) = 0.00124 & max(|θᴮᵢ-θᴮᵢ₋₁|) = 0.00058 Iteration 198: logtot = -194299.763269, max(|θᴬᵢ-θᴬᵢ₋₁|) = 0.00123 & max(|θᴮᵢ-θᴮᵢ₋₁|) = 0.00057 Iteration 199: logtot = -194299.756598, max(|θᴬᵢ-θᴬᵢ₋₁|) = 0.00123 & max(|θᴮᵢ-θᴮᵢ₋₁|) = 0.00057 Iteration 200: logtot = -194299.750045, max(|θᴬᵢ-θᴬᵢ₋₁|) = 0.00122 & max(|θᴮᵢ-θᴮᵢ₋₁|) = 0.00056 Iteration 201: logtot = -194299.743609, max(|θᴬᵢ-θᴬᵢ₋₁|) = 0.00121 & max(|θᴮᵢ-θᴮᵢ₋₁|) = 0.00056 Iteration 202: logtot = -194299.737288, max(|θᴬᵢ-θᴬᵢ₋₁|) = 0.0012 & max(|θᴮᵢ-θᴮᵢ₋₁|) = 0.00055 Iteration 203: logtot = -194299.731078, max(|θᴬᵢ-θᴬᵢ₋₁|) = 0.00119 & max(|θᴮᵢ-θᴮᵢ₋₁|) = 0.00055 Iteration 204: logtot = -194299.724977, max(|θᴬᵢ-θᴬᵢ₋₁|) = 0.00118 & max(|θᴮᵢ-θᴮᵢ₋₁|) = 0.00054 Iteration 205: logtot = -194299.718984, max(|θᴬᵢ-θᴬᵢ₋₁|) = 0.00117 & max(|θᴮᵢ-θᴮᵢ₋₁|) = 0.00054 Iteration 206: logtot = -194299.713096, max(|θᴬᵢ-θᴬᵢ₋₁|) = 0.00116 & max(|θᴮᵢ-θᴮᵢ₋₁|) = 0.00053 Iteration 207: logtot = -194299.707311, max(|θᴬᵢ-θᴬᵢ₋₁|) = 0.00115 & max(|θᴮᵢ-θᴮᵢ₋₁|) = 0.00053 Iteration 208: logtot = -194299.701627, max(|θᴬᵢ-θᴬᵢ₋₁|) = 0.00115 & max(|θᴮᵢ-θᴮᵢ₋₁|) = 0.00052 Iteration 209: logtot = -194299.696041, max(|θᴬᵢ-θᴬᵢ₋₁|) = 0.00114 & max(|θᴮᵢ-θᴮᵢ₋₁|) = 0.00052 Iteration 210: logtot = -194299.690553, max(|θᴬᵢ-θᴬᵢ₋₁|) = 0.00113 & max(|θᴮᵢ-θᴮᵢ₋₁|) = 0.00051 Iteration 211: logtot = -194299.68516, max(|θᴬᵢ-θᴬᵢ₋₁|) = 0.00112 & max(|θᴮᵢ-θᴮᵢ₋₁|) = 0.00051 Iteration 212: logtot = -194299.67986, max(|θᴬᵢ-θᴬᵢ₋₁|) = 0.00111 & max(|θᴮᵢ-θᴮᵢ₋₁|) = 0.0005 Iteration 213: logtot = -194299.674651, max(|θᴬᵢ-θᴬᵢ₋₁|) = 0.0011 & max(|θᴮᵢ-θᴮᵢ₋₁|) = 0.0005 Iteration 214: logtot = -194299.669532, max(|θᴬᵢ-θᴬᵢ₋₁|) = 0.0011 & max(|θᴮᵢ-θᴮᵢ₋₁|) = 0.0005 Iteration 215: logtot = -194299.664501, max(|θᴬᵢ-θᴬᵢ₋₁|) = 0.00109 & max(|θᴮᵢ-θᴮᵢ₋₁|) = 0.00049 Iteration 216: logtot = -194299.659556, max(|θᴬᵢ-θᴬᵢ₋₁|) = 0.00108 & max(|θᴮᵢ-θᴮᵢ₋₁|) = 0.00049 Iteration 217: logtot = -194299.654695, max(|θᴬᵢ-θᴬᵢ₋₁|) = 0.00107 & max(|θᴮᵢ-θᴮᵢ₋₁|) = 0.00048 Iteration 218: logtot = -194299.649917, max(|θᴬᵢ-θᴬᵢ₋₁|) = 0.00106 & max(|θᴮᵢ-θᴮᵢ₋₁|) = 0.00048 Iteration 219: logtot = -194299.645221, max(|θᴬᵢ-θᴬᵢ₋₁|) = 0.00105 & max(|θᴮᵢ-θᴮᵢ₋₁|) = 0.00047 Iteration 220: logtot = -194299.640604, max(|θᴬᵢ-θᴬᵢ₋₁|) = 0.00105 & max(|θᴮᵢ-θᴮᵢ₋₁|) = 0.00047 Iteration 221: logtot = -194299.636065, max(|θᴬᵢ-θᴬᵢ₋₁|) = 0.00104 & max(|θᴮᵢ-θᴮᵢ₋₁|) = 0.00047 Iteration 222: logtot = -194299.631603, max(|θᴬᵢ-θᴬᵢ₋₁|) = 0.00103 & max(|θᴮᵢ-θᴮᵢ₋₁|) = 0.00046 Iteration 223: logtot = -194299.627216, max(|θᴬᵢ-θᴬᵢ₋₁|) = 0.00102 & max(|θᴮᵢ-θᴮᵢ₋₁|) = 0.00046 Iteration 224: logtot = -194299.622903, max(|θᴬᵢ-θᴬᵢ₋₁|) = 0.00102 & max(|θᴮᵢ-θᴮᵢ₋₁|) = 0.00045 Iteration 225: logtot = -194299.618663, max(|θᴬᵢ-θᴬᵢ₋₁|) = 0.00102 & max(|θᴮᵢ-θᴮᵢ₋₁|) = 0.00045 Iteration 226: logtot = -194299.614494, max(|θᴬᵢ-θᴬᵢ₋₁|) = 0.00103 & max(|θᴮᵢ-θᴮᵢ₋₁|) = 0.00045 Iteration 227: logtot = -194299.610394, max(|θᴬᵢ-θᴬᵢ₋₁|) = 0.00104 & max(|θᴮᵢ-θᴮᵢ₋₁|) = 0.00044 Iteration 228: logtot = -194299.606363, max(|θᴬᵢ-θᴬᵢ₋₁|) = 0.00104 & max(|θᴮᵢ-θᴮᵢ₋₁|) = 0.00044 Iteration 229: logtot = -194299.602399, max(|θᴬᵢ-θᴬᵢ₋₁|) = 0.00105 & max(|θᴮᵢ-θᴮᵢ₋₁|) = 0.00043 Iteration 230: logtot = -194299.598501, max(|θᴬᵢ-θᴬᵢ₋₁|) = 0.00105 & max(|θᴮᵢ-θᴮᵢ₋₁|) = 0.00043 Iteration 231: logtot = -194299.594667, max(|θᴬᵢ-θᴬᵢ₋₁|) = 0.00106 & max(|θᴮᵢ-θᴮᵢ₋₁|) = 0.00043 Iteration 232: logtot = -194299.590898, max(|θᴬᵢ-θᴬᵢ₋₁|) = 0.00106 & max(|θᴮᵢ-θᴮᵢ₋₁|) = 0.00042 Iteration 233: logtot = -194299.58719, max(|θᴬᵢ-θᴬᵢ₋₁|) = 0.00107 & max(|θᴮᵢ-θᴮᵢ₋₁|) = 0.00042 Iteration 234: logtot = -194299.583544, max(|θᴬᵢ-θᴬᵢ₋₁|) = 0.00107 & max(|θᴮᵢ-θᴮᵢ₋₁|) = 0.00042 Iteration 235: logtot = -194299.579958, max(|θᴬᵢ-θᴬᵢ₋₁|) = 0.00107 & max(|θᴮᵢ-θᴮᵢ₋₁|) = 0.00041 Iteration 236: logtot = -194299.576431, max(|θᴬᵢ-θᴬᵢ₋₁|) = 0.00108 & max(|θᴮᵢ-θᴮᵢ₋₁|) = 0.00041 Iteration 237: logtot = -194299.572962, max(|θᴬᵢ-θᴬᵢ₋₁|) = 0.00108 & max(|θᴮᵢ-θᴮᵢ₋₁|) = 0.00041 Iteration 238: logtot = -194299.56955, max(|θᴬᵢ-θᴬᵢ₋₁|) = 0.00108 & max(|θᴮᵢ-θᴮᵢ₋₁|) = 0.0004 Iteration 239: logtot = -194299.566193, max(|θᴬᵢ-θᴬᵢ₋₁|) = 0.00109 & max(|θᴮᵢ-θᴮᵢ₋₁|) = 0.0004 Iteration 240: logtot = -194299.562892, max(|θᴬᵢ-θᴬᵢ₋₁|) = 0.00109 & max(|θᴮᵢ-θᴮᵢ₋₁|) = 0.0004 Iteration 241: logtot = -194299.559644, max(|θᴬᵢ-θᴬᵢ₋₁|) = 0.00109 & max(|θᴮᵢ-θᴮᵢ₋₁|) = 0.00039 Iteration 242: logtot = -194299.55645, max(|θᴬᵢ-θᴬᵢ₋₁|) = 0.00109 & max(|θᴮᵢ-θᴮᵢ₋₁|) = 0.00039 Iteration 243: logtot = -194299.553307, max(|θᴬᵢ-θᴬᵢ₋₁|) = 0.0011 & max(|θᴮᵢ-θᴮᵢ₋₁|) = 0.00039 Iteration 244: logtot = -194299.550215, max(|θᴬᵢ-θᴬᵢ₋₁|) = 0.0011 & max(|θᴮᵢ-θᴮᵢ₋₁|) = 0.00038 Iteration 245: logtot = -194299.547174, max(|θᴬᵢ-θᴬᵢ₋₁|) = 0.0011 & max(|θᴮᵢ-θᴮᵢ₋₁|) = 0.00038 Iteration 246: logtot = -194299.544182, max(|θᴬᵢ-θᴬᵢ₋₁|) = 0.0011 & max(|θᴮᵢ-θᴮᵢ₋₁|) = 0.00038 Iteration 247: logtot = -194299.541238, max(|θᴬᵢ-θᴬᵢ₋₁|) = 0.0011 & max(|θᴮᵢ-θᴮᵢ₋₁|) = 0.00037 Iteration 248: logtot = -194299.538341, max(|θᴬᵢ-θᴬᵢ₋₁|) = 0.0011 & max(|θᴮᵢ-θᴮᵢ₋₁|) = 0.00037 Iteration 249: logtot = -194299.535492, max(|θᴬᵢ-θᴬᵢ₋₁|) = 0.0011 & max(|θᴮᵢ-θᴮᵢ₋₁|) = 0.00037 Iteration 250: logtot = -194299.532688, max(|θᴬᵢ-θᴬᵢ₋₁|) = 0.0011 & max(|θᴮᵢ-θᴮᵢ₋₁|) = 0.00036 Iteration 251: logtot = -194299.529929, max(|θᴬᵢ-θᴬᵢ₋₁|) = 0.0011 & max(|θᴮᵢ-θᴮᵢ₋₁|) = 0.00036 Iteration 252: logtot = -194299.527215, max(|θᴬᵢ-θᴬᵢ₋₁|) = 0.0011 & max(|θᴮᵢ-θᴮᵢ₋₁|) = 0.00036 Iteration 253: logtot = -194299.524544, max(|θᴬᵢ-θᴬᵢ₋₁|) = 0.0011 & max(|θᴮᵢ-θᴮᵢ₋₁|) = 0.00035 Iteration 254: logtot = -194299.521916, max(|θᴬᵢ-θᴬᵢ₋₁|) = 0.0011 & max(|θᴮᵢ-θᴮᵢ₋₁|) = 0.00035 Iteration 255: logtot = -194299.51933, max(|θᴬᵢ-θᴬᵢ₋₁|) = 0.0011 & max(|θᴮᵢ-θᴮᵢ₋₁|) = 0.00035 Iteration 256: logtot = -194299.516785, max(|θᴬᵢ-θᴬᵢ₋₁|) = 0.0011 & max(|θᴮᵢ-θᴮᵢ₋₁|) = 0.00035 Iteration 257: logtot = -194299.51428, max(|θᴬᵢ-θᴬᵢ₋₁|) = 0.0011 & max(|θᴮᵢ-θᴮᵢ₋₁|) = 0.00034 Iteration 258: logtot = -194299.511816, max(|θᴬᵢ-θᴬᵢ₋₁|) = 0.0011 & max(|θᴮᵢ-θᴮᵢ₋₁|) = 0.00034 Iteration 259: logtot = -194299.50939, max(|θᴬᵢ-θᴬᵢ₋₁|) = 0.0011 & max(|θᴮᵢ-θᴮᵢ₋₁|) = 0.00034 Iteration 260: logtot = -194299.507004, max(|θᴬᵢ-θᴬᵢ₋₁|) = 0.0011 & max(|θᴮᵢ-θᴮᵢ₋₁|) = 0.00033 Iteration 261: logtot = -194299.504655, max(|θᴬᵢ-θᴬᵢ₋₁|) = 0.0011 & max(|θᴮᵢ-θᴮᵢ₋₁|) = 0.00033 Iteration 262: logtot = -194299.502343, max(|θᴬᵢ-θᴬᵢ₋₁|) = 0.0011 & max(|θᴮᵢ-θᴮᵢ₋₁|) = 0.00033 Iteration 263: logtot = -194299.500068, max(|θᴬᵢ-θᴬᵢ₋₁|) = 0.0011 & max(|θᴮᵢ-θᴮᵢ₋₁|) = 0.00033 Iteration 264: logtot = -194299.497828, max(|θᴬᵢ-θᴬᵢ₋₁|) = 0.0011 & max(|θᴮᵢ-θᴮᵢ₋₁|) = 0.00032 Iteration 265: logtot = -194299.495624, max(|θᴬᵢ-θᴬᵢ₋₁|) = 0.0011 & max(|θᴮᵢ-θᴮᵢ₋₁|) = 0.00032 Iteration 266: logtot = -194299.493455, max(|θᴬᵢ-θᴬᵢ₋₁|) = 0.00109 & max(|θᴮᵢ-θᴮᵢ₋₁|) = 0.00032 Iteration 267: logtot = -194299.49132, max(|θᴬᵢ-θᴬᵢ₋₁|) = 0.00109 & max(|θᴮᵢ-θᴮᵢ₋₁|) = 0.00032 Iteration 268: logtot = -194299.489218, max(|θᴬᵢ-θᴬᵢ₋₁|) = 0.00109 & max(|θᴮᵢ-θᴮᵢ₋₁|) = 0.00031 Iteration 269: logtot = -194299.487149, max(|θᴬᵢ-θᴬᵢ₋₁|) = 0.00109 & max(|θᴮᵢ-θᴮᵢ₋₁|) = 0.00031 Iteration 270: logtot = -194299.485113, max(|θᴬᵢ-θᴬᵢ₋₁|) = 0.00109 & max(|θᴮᵢ-θᴮᵢ₋₁|) = 0.00031 Iteration 271: logtot = -194299.483109, max(|θᴬᵢ-θᴬᵢ₋₁|) = 0.00109 & max(|θᴮᵢ-θᴮᵢ₋₁|) = 0.00031 Iteration 272: logtot = -194299.481136, max(|θᴬᵢ-θᴬᵢ₋₁|) = 0.00108 & max(|θᴮᵢ-θᴮᵢ₋₁|) = 0.0003 Iteration 273: logtot = -194299.479193, max(|θᴬᵢ-θᴬᵢ₋₁|) = 0.00108 & max(|θᴮᵢ-θᴮᵢ₋₁|) = 0.0003 Iteration 274: logtot = -194299.477281, max(|θᴬᵢ-θᴬᵢ₋₁|) = 0.00108 & max(|θᴮᵢ-θᴮᵢ₋₁|) = 0.0003 Iteration 275: logtot = -194299.475399, max(|θᴬᵢ-θᴬᵢ₋₁|) = 0.00108 & max(|θᴮᵢ-θᴮᵢ₋₁|) = 0.0003 Iteration 276: logtot = -194299.473546, max(|θᴬᵢ-θᴬᵢ₋₁|) = 0.00107 & max(|θᴮᵢ-θᴮᵢ₋₁|) = 0.00029 Iteration 277: logtot = -194299.471722, max(|θᴬᵢ-θᴬᵢ₋₁|) = 0.00107 & max(|θᴮᵢ-θᴮᵢ₋₁|) = 0.00029 Iteration 278: logtot = -194299.469926, max(|θᴬᵢ-θᴬᵢ₋₁|) = 0.00107 & max(|θᴮᵢ-θᴮᵢ₋₁|) = 0.00029 Iteration 279: logtot = -194299.468158, max(|θᴬᵢ-θᴬᵢ₋₁|) = 0.00107 & max(|θᴮᵢ-θᴮᵢ₋₁|) = 0.00029 Iteration 280: logtot = -194299.466418, max(|θᴬᵢ-θᴬᵢ₋₁|) = 0.00106 & max(|θᴮᵢ-θᴮᵢ₋₁|) = 0.00028 Iteration 281: logtot = -194299.464704, max(|θᴬᵢ-θᴬᵢ₋₁|) = 0.00106 & max(|θᴮᵢ-θᴮᵢ₋₁|) = 0.00028 Iteration 282: logtot = -194299.463017, max(|θᴬᵢ-θᴬᵢ₋₁|) = 0.00106 & max(|θᴮᵢ-θᴮᵢ₋₁|) = 0.00028 Iteration 283: logtot = -194299.461356, max(|θᴬᵢ-θᴬᵢ₋₁|) = 0.00105 & max(|θᴮᵢ-θᴮᵢ₋₁|) = 0.00028 Iteration 284: logtot = -194299.459721, max(|θᴬᵢ-θᴬᵢ₋₁|) = 0.00105 & max(|θᴮᵢ-θᴮᵢ₋₁|) = 0.00028 Iteration 285: logtot = -194299.45811, max(|θᴬᵢ-θᴬᵢ₋₁|) = 0.00105 & max(|θᴮᵢ-θᴮᵢ₋₁|) = 0.00027 Iteration 286: logtot = -194299.456525, max(|θᴬᵢ-θᴬᵢ₋₁|) = 0.00105 & max(|θᴮᵢ-θᴮᵢ₋₁|) = 0.00027 Iteration 287: logtot = -194299.454964, max(|θᴬᵢ-θᴬᵢ₋₁|) = 0.00104 & max(|θᴮᵢ-θᴮᵢ₋₁|) = 0.00027 Iteration 288: logtot = -194299.453426, max(|θᴬᵢ-θᴬᵢ₋₁|) = 0.00104 & max(|θᴮᵢ-θᴮᵢ₋₁|) = 0.00027 Iteration 289: logtot = -194299.451913, max(|θᴬᵢ-θᴬᵢ₋₁|) = 0.00104 & max(|θᴮᵢ-θᴮᵢ₋₁|) = 0.00026 Iteration 290: logtot = -194299.450422, max(|θᴬᵢ-θᴬᵢ₋₁|) = 0.00103 & max(|θᴮᵢ-θᴮᵢ₋₁|) = 0.00026 Iteration 291: logtot = -194299.448955, max(|θᴬᵢ-θᴬᵢ₋₁|) = 0.00103 & max(|θᴮᵢ-θᴮᵢ₋₁|) = 0.00026 Iteration 292: logtot = -194299.44751, max(|θᴬᵢ-θᴬᵢ₋₁|) = 0.00103 & max(|θᴮᵢ-θᴮᵢ₋₁|) = 0.00026 Iteration 293: logtot = -194299.446087, max(|θᴬᵢ-θᴬᵢ₋₁|) = 0.00102 & max(|θᴮᵢ-θᴮᵢ₋₁|) = 0.00026 Iteration 294: logtot = -194299.444685, max(|θᴬᵢ-θᴬᵢ₋₁|) = 0.00102 & max(|θᴮᵢ-θᴮᵢ₋₁|) = 0.00025 Iteration 295: logtot = -194299.443305, max(|θᴬᵢ-θᴬᵢ₋₁|) = 0.00102 & max(|θᴮᵢ-θᴮᵢ₋₁|) = 0.00025 Iteration 296: logtot = -194299.441946, max(|θᴬᵢ-θᴬᵢ₋₁|) = 0.00101 & max(|θᴮᵢ-θᴮᵢ₋₁|) = 0.00025 Iteration 297: logtot = -194299.440608, max(|θᴬᵢ-θᴬᵢ₋₁|) = 0.00101 & max(|θᴮᵢ-θᴮᵢ₋₁|) = 0.00025 Iteration 298: logtot = -194299.43929, max(|θᴬᵢ-θᴬᵢ₋₁|) = 0.00101 & max(|θᴮᵢ-θᴮᵢ₋₁|) = 0.00025 Iteration 299: logtot = -194299.437992, max(|θᴬᵢ-θᴬᵢ₋₁|) = 0.001 & max(|θᴮᵢ-θᴮᵢ₋₁|) = 0.00024 Iteration 300: logtot = -194299.436714, max(|θᴬᵢ-θᴬᵢ₋₁|) = 0.001 & max(|θᴮᵢ-θᴮᵢ₋₁|) = 0.00024 Iteration 301: logtot = -194299.435455, max(|θᴬᵢ-θᴬᵢ₋₁|) = 0.00099 & max(|θᴮᵢ-θᴮᵢ₋₁|) = 0.00024 Iteration 302: logtot = -194299.434216, max(|θᴬᵢ-θᴬᵢ₋₁|) = 0.00099 & max(|θᴮᵢ-θᴮᵢ₋₁|) = 0.00024 Iteration 303: logtot = -194299.432994, max(|θᴬᵢ-θᴬᵢ₋₁|) = 0.00099 & max(|θᴮᵢ-θᴮᵢ₋₁|) = 0.00024 Iteration 304: logtot = -194299.431792, max(|θᴬᵢ-θᴬᵢ₋₁|) = 0.00098 & max(|θᴮᵢ-θᴮᵢ₋₁|) = 0.00023 Iteration 305: logtot = -194299.430608, max(|θᴬᵢ-θᴬᵢ₋₁|) = 0.00098 & max(|θᴮᵢ-θᴮᵢ₋₁|) = 0.00023 Iteration 306: logtot = -194299.429441, max(|θᴬᵢ-θᴬᵢ₋₁|) = 0.00098 & max(|θᴮᵢ-θᴮᵢ₋₁|) = 0.00023 Iteration 307: logtot = -194299.428292, max(|θᴬᵢ-θᴬᵢ₋₁|) = 0.00097 & max(|θᴮᵢ-θᴮᵢ₋₁|) = 0.00023 Iteration 308: logtot = -194299.42716, max(|θᴬᵢ-θᴬᵢ₋₁|) = 0.00097 & max(|θᴮᵢ-θᴮᵢ₋₁|) = 0.00023 Iteration 309: logtot = -194299.426046, max(|θᴬᵢ-θᴬᵢ₋₁|) = 0.00096 & max(|θᴮᵢ-θᴮᵢ₋₁|) = 0.00023 Iteration 310: logtot = -194299.424948, max(|θᴬᵢ-θᴬᵢ₋₁|) = 0.00096 & max(|θᴮᵢ-θᴮᵢ₋₁|) = 0.00022 Iteration 311: logtot = -194299.423867, max(|θᴬᵢ-θᴬᵢ₋₁|) = 0.00096 & max(|θᴮᵢ-θᴮᵢ₋₁|) = 0.00022 Iteration 312: logtot = -194299.422801, max(|θᴬᵢ-θᴬᵢ₋₁|) = 0.00095 & max(|θᴮᵢ-θᴮᵢ₋₁|) = 0.00022 Iteration 313: logtot = -194299.421752, max(|θᴬᵢ-θᴬᵢ₋₁|) = 0.00095 & max(|θᴮᵢ-θᴮᵢ₋₁|) = 0.00022 Iteration 314: logtot = -194299.420719, max(|θᴬᵢ-θᴬᵢ₋₁|) = 0.00094 & max(|θᴮᵢ-θᴮᵢ₋₁|) = 0.00022 Iteration 315: logtot = -194299.419701, max(|θᴬᵢ-θᴬᵢ₋₁|) = 0.00094 & max(|θᴮᵢ-θᴮᵢ₋₁|) = 0.00022 Iteration 316: logtot = -194299.418698, max(|θᴬᵢ-θᴬᵢ₋₁|) = 0.00094 & max(|θᴮᵢ-θᴮᵢ₋₁|) = 0.00021 Iteration 317: logtot = -194299.41771, max(|θᴬᵢ-θᴬᵢ₋₁|) = 0.00093 & max(|θᴮᵢ-θᴮᵢ₋₁|) = 0.00021 EM converged in 317 iterations, logtot = -194299.4177103428 FitMLE SHMM (Baum Welch): 107.348235 seconds (412.22 M allocations: 26.307 GiB, 5.00% gc time, 22.83% compilation time) Test Summary: | Pass Total Time PeriodicHMM | 2 2 1m55.9s FitMLE SHMM (Baum Welch) K = 1, autoregressive_order = 0, degree_of_P = 0: 0.122490 seconds (46.56 k allocations: 2.630 MiB, 74.23% compilation time) FitMLE SHMM (Baum Welch) K = 1, autoregressive_order = 0, degree_of_P = 1: 0.028406 seconds (19.86 k allocations: 1.239 MiB) FitMLE SHMM (Baum Welch) K = 1, autoregressive_order = 0, degree_of_P = 2: 0.028988 seconds (22.95 k allocations: 1.530 MiB) FitMLE SHMM (Baum Welch) K = 1, autoregressive_order = 1, degree_of_P = 0: 0.044497 seconds (29.19 k allocations: 1.733 MiB) FitMLE SHMM (Baum Welch) K = 1, autoregressive_order = 1, degree_of_P = 1: 0.051928 seconds (34.14 k allocations: 2.141 MiB) FitMLE SHMM (Baum Welch) K = 1, autoregressive_order = 1, degree_of_P = 2: 0.066585 seconds (41.54 k allocations: 2.764 MiB) FitMLE SHMM (Baum Welch) K = 1, autoregressive_order = 2, degree_of_P = 0: 1.180224 seconds (1.04 M allocations: 61.197 MiB, 93.17% compilation time) FitMLE SHMM (Baum Welch) K = 1, autoregressive_order = 2, degree_of_P = 1: 0.087734 seconds (62.86 k allocations: 3.946 MiB) FitMLE SHMM (Baum Welch) K = 1, autoregressive_order = 2, degree_of_P = 2: 0.189764 seconds (85.35 k allocations: 5.490 MiB) FitMLE SHMM (Baum Welch) K = 2, autoregressive_order = 0, degree_of_P = 0: 6.667740 seconds (2.96 M allocations: 171.871 MiB, 1.30% gc time) FitMLE SHMM (Baum Welch) K = 2, autoregressive_order = 0, degree_of_P = 1: 1.325789 seconds (616.83 k allocations: 38.455 MiB) FitMLE SHMM (Baum Welch) K = 2, autoregressive_order = 0, degree_of_P = 2: 2.043441 seconds (1.03 M allocations: 69.739 MiB) FitMLE SHMM (Baum Welch) K = 2, autoregressive_order = 1, degree_of_P = 0: 4.881435 seconds (1.32 M allocations: 76.489 MiB, 2.56% gc time) FitMLE SHMM (Baum Welch) K = 2, autoregressive_order = 1, degree_of_P = 1: 1.117892 seconds (576.08 k allocations: 35.704 MiB) FitMLE SHMM (Baum Welch) K = 2, autoregressive_order = 1, degree_of_P = 2: 1.562993 seconds (849.67 k allocations: 57.184 MiB) FitMLE SHMM (Baum Welch) K = 2, autoregressive_order = 2, degree_of_P = 0: 4.845391 seconds (2.44 M allocations: 141.405 MiB) FitMLE SHMM (Baum Welch) K = 2, autoregressive_order = 2, degree_of_P = 1: 5.000887 seconds (1.98 M allocations: 123.906 MiB, 1.53% gc time) FitMLE SHMM (Baum Welch) K = 2, autoregressive_order = 2, degree_of_P = 2: 2.635818 seconds (1.52 M allocations: 102.582 MiB) Test Summary: | Total Time Hierachical PeriodicHMM for many hyperparams | 0 35.8s From worker 3: From worker 3: ****************************************************************************** From worker 3: This program contains Ipopt, a library for large-scale nonlinear optimization. From worker 3: Ipopt is released as open source code under the Eclipse Public License (EPL). From worker 3: For more information visit https://github.com/coin-or/Ipopt From worker 3: ****************************************************************************** From worker 3: From worker 2: From worker 2: ****************************************************************************** From worker 2: This program contains Ipopt, a library for large-scale nonlinear optimization. From worker 2: Ipopt is released as open source code under the Eclipse Public License (EPL). From worker 2: For more information visit https://github.com/coin-or/Ipopt From worker 2: ****************************************************************************** From worker 2: pmap worker: 262.939730 seconds (183.00 M allocations: 16.214 GiB, 0.93% gc time, 216 lock conflicts, 3.99% compilation time: <1% of which was recompilation) Test Summary: | Total Time Distributed PeriodicHMM | 0 4m23.1s Testing SmoothPeriodicStatsModels tests passed Testing completed after 516.28s PkgEval succeeded after 1220.92s