Package evaluation to test SmoothPeriodicStatsModels on Julia 1.10.10 (077106c818*) started at 2026-02-25T21:46:11.819 ################################################################################ # Set-up # Installing PkgEval dependencies (TestEnv)... Activating project at `~/.julia/environments/v1.10` Set-up completed after 3.0s ################################################################################ # Installation # Installing SmoothPeriodicStatsModels... Resolving package versions... Installed SciMLBase ─ v2.144.2 Updating `~/.julia/environments/v1.10/Project.toml` [3d8e1505] + SmoothPeriodicStatsModels v2.0.3 Updating `~/.julia/environments/v1.10/Manifest.toml` [47edcb42] + ADTypes v1.21.0 [1520ce14] + AbstractTrees v0.4.5 [7d9f7c33] + Accessors v0.1.43 [79e6a3ab] + Adapt v4.4.0 [66dad0bd] + AliasTables v1.1.3 [dce04be8] + ArgCheck v2.5.0 [ec485272] + ArnoldiMethod v0.4.0 [4fba245c] + ArrayInterface v7.22.0 [4c555306] + ArrayLayouts v1.12.2 [6e4b80f9] + BenchmarkTools v1.6.3 [7b33fef7] + BigCombinatorics v0.3.6 [e2ed5e7c] + Bijections v0.2.2 [62783981] + BitTwiddlingConvenienceFunctions v0.1.6 [8e7c35d0] + BlockArrays v1.9.3 [70df07ce] + BracketingNonlinearSolve v1.10.0 [2a0fbf3d] + CPUSummary v0.2.7 [d360d2e6] + ChainRulesCore v1.26.0 [fb6a15b2] + CloseOpenIntervals v0.1.13 [523fee87] + CodecBzip2 v0.8.5 [944b1d66] + CodecZlib v0.7.8 ⌅ [861a8166] + Combinatorics v1.0.2 ⌅ [a80b9123] + CommonMark v0.10.3 [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 v0.19.3 [2b5f629d] + DiffEqBase v6.210.0 [459566f4] + DiffEqCallbacks v4.12.0 [77a26b50] + DiffEqNoiseProcess v5.27.0 [163ba53b] + DiffResults v1.1.0 [b552c78f] + DiffRules v1.15.1 [a0c0ee7d] + DifferentiationInterface v0.7.16 [8d63f2c5] + DispatchDoctor v0.4.28 [31c24e10] + Distributions v0.25.123 [ffbed154] + DocStringExtensions v0.9.5 [5b8099bc] + DomainSets v0.7.16 [7c1d4256] + DynamicPolynomials v0.6.4 [06fc5a27] + DynamicQuantities v1.11.0 [4e289a0a] + EnumX v1.0.7 [f151be2c] + EnzymeCore v0.8.18 [e2ba6199] + ExprTools v0.1.10 [55351af7] + ExproniconLite v0.10.14 [7034ab61] + FastBroadcast v0.3.5 [9aa1b823] + FastClosures v0.3.2 [a4df4552] + FastPower v1.3.1 [1a297f60] + FillArrays v1.16.0 [64ca27bc] + FindFirstFunctions v1.8.0 [6a86dc24] + FiniteDiff v2.29.0 [1fa38f19] + Format v1.3.7 [f6369f11] + ForwardDiff v1.3.2 [069b7b12] + FunctionWrappers v1.1.3 [77dc65aa] + FunctionWrappersWrappers v0.1.3 [46192b85] + GPUArraysCore v0.2.0 [c27321d9] + Glob v1.4.0 [86223c79] + Graphs v1.13.4 [19dc6840] + HCubature v1.8.0 [34004b35] + HypergeometricFunctions v0.3.28 [615f187c] + IfElse v0.1.1 [3263718b] + ImplicitDiscreteSolve v1.7.0 [d25df0c9] + Inflate v0.1.5 [18e54dd8] + IntegerMathUtils v0.1.3 [8197267c] + IntervalSets v0.7.13 [3587e190] + InverseFunctions v0.1.17 [b6b21f68] + Ipopt v1.14.1 [92d709cd] + IrrationalConstants v0.2.6 [82899510] + IteratorInterfaceExtensions v1.0.0 [692b3bcd] + JLLWrappers v1.7.1 ⌃ [682c06a0] + JSON v0.21.4 [ae98c720] + Jieko v0.2.1 [4076af6c] + JuMP v1.29.4 [98e50ef6] + JuliaFormatter v2.3.0 ⌅ [70703baa] + JuliaSyntax v0.4.10 [ccbc3e58] + JumpProcesses v9.22.2 [ba0b0d4f] + Krylov v0.10.5 [5be7bae1] + LBFGSB v0.4.1 [b964fa9f] + LaTeXStrings v1.4.0 [984bce1d] + LambertW v1.0.0 [23fbe1c1] + Latexify v0.16.10 [10f19ff3] + LayoutPointers v0.1.17 [1d6d02ad] + LeftChildRightSiblingTrees v0.2.1 [87fe0de2] + LineSearch v0.1.6 ⌃ [d3d80556] + LineSearches v7.5.1 [7ed4a6bd] + LinearSolve v3.59.1 [2ab3a3ac] + LogExpFunctions v0.3.29 [e6f89c97] + LoggingExtras v1.2.0 [2fda8390] + LsqFit v0.15.1 [d8e11817] + MLStyle v0.4.17 [1914dd2f] + MacroTools v0.5.16 [d125e4d3] + ManualMemory v0.1.8 [b8f27783] + MathOptInterface v1.49.0 [bb5d69b7] + MaybeInplace v0.1.4 [e1d29d7a] + Missings v1.2.0 ⌅ [961ee093] + ModelingToolkit v10.32.1 [2e0e35c7] + Moshi v0.3.7 [46d2c3a1] + MuladdMacro v0.2.4 [102ac46a] + MultivariatePolynomials v0.5.13 [d8a4904e] + MutableArithmetics v1.6.7 [37188c8d] + MvNormalCDF v0.3.2 ⌅ [d41bc354] + NLSolversBase v7.10.0 [77ba4419] + NaNMath v1.1.3 ⌃ [be0214bd] + NonlinearSolveBase v2.11.2 ⌅ [5959db7a] + NonlinearSolveFirstOrder v1.11.1 [6fe1bfb0] + OffsetArrays v1.17.0 ⌅ [429524aa] + Optim v1.13.3 ⌅ [7f7a1694] + Optimization v4.8.0 ⌅ [bca83a33] + OptimizationBase v2.14.0 ⌅ [fd9f6733] + OptimizationMOI v0.5.7 [bac558e1] + OrderedCollections v1.8.1 [bbf590c4] + OrdinaryDiffEqCore v3.9.0 [90014a1f] + PDMats v0.11.37 [69de0a69] + Parsers v2.8.3 ⌅ [4873b48c] + PeriodicHiddenMarkovModels v0.1.5 [e409e4f3] + PoissonRandom v0.4.7 [85e3b03c] + PolyLog v2.6.1 [f517fe37] + Polyester v0.7.19 [1d0040c9] + PolyesterWeave v0.2.2 [85a6dd25] + PositiveFactorizations v0.2.4 ⌃ [d236fae5] + PreallocationTools v0.4.34 ⌅ [aea7be01] + PrecompileTools v1.2.1 [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 v2.11.2 [3cdcf5f2] + RecipesBase v1.3.4 [731186ca] + RecursiveArrayTools v3.48.0 [189a3867] + Reexport v1.2.2 [ae029012] + Requires v1.3.1 [ae5879a3] + ResettableStacks v1.2.0 [79098fc4] + Rmath v0.9.0 [f2b01f46] + Roots v2.2.12 [7e49a35a] + RuntimeGeneratedFunctions v0.5.17 [9dfe8606] + SCCNonlinearSolve v1.11.0 [94e857df] + SIMDTypes v0.1.0 [0bca4576] + SciMLBase v2.144.2 [19f34311] + SciMLJacobianOperators v0.1.12 [a6db7da4] + SciMLLogging v1.9.1 [c0aeaf25] + SciMLOperators v1.15.1 [431bcebd] + SciMLPublic v1.0.1 [53ae85a6] + SciMLStructures v1.10.0 [efcf1570] + Setfield v1.1.2 [1277b4bf] + ShiftedArrays v2.0.0 [727e6d20] + SimpleNonlinearSolve v2.11.0 [699a6c99] + SimpleTraits v0.9.5 [3d8e1505] + SmoothPeriodicStatsModels v2.0.3 [a2af1166] + SortingAlgorithms v1.2.2 [9f842d2f] + SparseConnectivityTracer v1.2.1 [0a514795] + SparseMatrixColorings v0.4.23 [276daf66] + SpecialFunctions v2.7.1 [aedffcd0] + Static v1.3.1 [0d7ed370] + StaticArrayInterface v1.9.0 [90137ffa] + StaticArrays v1.9.17 [1e83bf80] + StaticArraysCore v1.4.4 [82ae8749] + StatsAPI v1.8.0 [2913bbd2] + StatsBase v0.34.10 [4c63d2b9] + StatsFuns v1.5.2 [7792a7ef] + StrideArraysCore v0.5.8 [2efcf032] + SymbolicIndexingInterface v0.3.46 ⌅ [19f23fe9] + SymbolicLimits v0.2.3 ⌅ [d1185830] + SymbolicUtils v3.32.0 ⌅ [0c5d862f] + Symbolics v6.58.0 [ed4db957] + TaskLocalValues v0.1.3 [6aa5eb33] + TaylorSeries v0.20.10 [8ea1fca8] + TermInterface v2.0.0 [5d786b92] + TerminalLoggers v0.1.7 [1c621080] + TestItems v1.0.0 [8290d209] + ThreadingUtilities v0.5.5 [a759f4b9] + TimerOutputs v0.5.29 [3bb67fe8] + TranscodingStreams v0.11.3 [410a4b4d] + Tricks v0.1.13 [781d530d] + TruncatedStacktraces v1.4.0 [5c2747f8] + URIs v1.6.1 [3a884ed6] + UnPack v1.0.2 [1986cc42] + Unitful v1.28.0 [a7c27f48] + Unityper v0.1.6 [ae81ac8f] + ASL_jll v0.1.3+0 [6e34b625] + Bzip2_jll v1.0.9+0 [61579ee1] + Ghostscript_jll v9.55.1+0 [e33a78d0] + Hwloc_jll v2.13.0+0 [1d5cc7b8] + IntelOpenMP_jll v2025.2.0+0 [9cc047cb] + Ipopt_jll v300.1400.1901+0 [aacddb02] + JpegTurbo_jll v3.1.4+0 [81d17ec3] + L_BFGS_B_jll v3.0.1+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 v0.3.24+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 v0.18.1+0 [1317d2d5] + oneTBB_jll v2022.0.0+1 [0dad84c5] + ArgTools v1.1.1 [56f22d72] + Artifacts [2a0f44e3] + Base64 [ade2ca70] + Dates [8ba89e20] + Distributed [f43a241f] + Downloads v1.6.0 [7b1f6079] + FileWatching [9fa8497b] + Future [b77e0a4c] + InteractiveUtils [4af54fe1] + LazyArtifacts [b27032c2] + LibCURL v0.6.4 [76f85450] + LibGit2 [8f399da3] + Libdl [37e2e46d] + LinearAlgebra [56ddb016] + Logging [d6f4376e] + Markdown [a63ad114] + Mmap [ca575930] + NetworkOptions v1.2.0 [44cfe95a] + Pkg v1.10.0 [de0858da] + Printf [9abbd945] + Profile [3fa0cd96] + REPL [9a3f8284] + Random [ea8e919c] + SHA v0.7.0 [9e88b42a] + Serialization [6462fe0b] + Sockets [2f01184e] + SparseArrays v1.10.0 [10745b16] + Statistics v1.10.0 [4607b0f0] + SuiteSparse [fa267f1f] + TOML v1.0.3 [a4e569a6] + Tar v1.10.0 [8dfed614] + Test [cf7118a7] + UUIDs [4ec0a83e] + Unicode [e66e0078] + CompilerSupportLibraries_jll v1.1.1+0 [deac9b47] + LibCURL_jll v8.4.0+0 [e37daf67] + LibGit2_jll v1.6.4+0 [29816b5a] + LibSSH2_jll v1.11.0+1 [c8ffd9c3] + MbedTLS_jll v2.28.1010+0 [14a3606d] + MozillaCACerts_jll v2025.12.2 [4536629a] + OpenBLAS_jll v0.3.23+5 [05823500] + OpenLibm_jll v0.8.5+0 [bea87d4a] + SuiteSparse_jll v7.2.1+1 [83775a58] + Zlib_jll v1.2.13+1 [8e850b90] + libblastrampoline_jll v5.11.0+0 [8e850ede] + nghttp2_jll v1.52.0+1 [3f19e933] + p7zip_jll v17.6.1+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 9.9s ################################################################################ # Precompilation # Precompiling PkgEval dependencies... Precompiling packages... 778.1 ms ✓ TestEnv 1 dependency successfully precompiled in 3 seconds Precompiling package dependencies... Precompiling packages... 856.1 ms ✓ Combinatorics 691.7 ms ✓ FunctionWrappers 374.4 ms ✓ MuladdMacro 388.3 ms ✓ ConcreteStructs 418.4 ms ✓ LaTeXStrings 549.9 ms ✓ PositiveFactorizations 431.2 ms ✓ ExprTools 522.8 ms ✓ Glob 400.0 ms ✓ IteratorInterfaceExtensions 466.4 ms ✓ Tricks 412.4 ms ✓ StatsAPI 621.5 ms ✓ ADTypes 1872.9 ms ✓ ExproniconLite 848.4 ms ✓ OffsetArrays 937.2 ms ✓ Format 370.4 ms ✓ UnPack 981.4 ms ✓ FillArrays 380.7 ms ✓ IntegerMathUtils 463.7 ms ✓ InverseFunctions 8503.7 ms ✓ JuliaSyntax 504.6 ms ✓ PolyLog 354.2 ms ✓ CommonSolve 418.6 ms ✓ ArgCheck 403.5 ms ✓ CompilerSupportLibraries_jll 1984.6 ms ✓ MacroTools 431.2 ms ✓ ManualMemory 551.7 ms ✓ Preferences 409.5 ms ✓ ShiftedArrays 426.2 ms ✓ CompositeTypes 574.2 ms ✓ Compat 589.0 ms ✓ OrderedCollections 470.5 ms ✓ Requires 413.3 ms ✓ EnumX 374.0 ms ✓ Reexport 364.3 ms ✓ SIMDTypes 561.2 ms ✓ DocStringExtensions 550.3 ms ✓ AbstractTrees 1071.4 ms ✓ IrrationalConstants 526.5 ms ✓ IntervalSets 591.8 ms ✓ URIs 973.0 ms ✓ BigCombinatorics 373.0 ms ✓ CompositionsBase 848.5 ms ✓ ProgressMeter 348.5 ms ✓ TestItems 364.8 ms ✓ PtrArrays 582.7 ms ✓ TranscodingStreams 370.2 ms ✓ FastPower 358.9 ms ✓ TaskLocalValues 462.8 ms ✓ NaNMath 615.7 ms ✓ CpuId 12838.4 ms ✓ MLStyle 483.4 ms ✓ Inflate 647.8 ms ✓ EnzymeCore 359.4 ms ✓ IfElse 457.3 ms ✓ ConstructionBase 382.6 ms ✓ CommonWorldInvalidations 430.6 ms ✓ DataAPI 473.4 ms ✓ ProgressLogging 390.2 ms ✓ FastClosures 18160.8 ms ✓ Unitful 542.4 ms ✓ LoggingExtras 402.6 ms ✓ TermInterface 404.2 ms ✓ SciMLPublic 483.9 ms ✓ StaticArraysCore 453.2 ms ✓ Bijections 669.7 ms ✓ SuiteSparse 4545.5 ms ✓ MutableArithmetics 7795.0 ms ✓ Krylov 833.3 ms ✓ Statistics 3192.5 ms ✓ TaylorSeries 359.1 ms ✓ FunctionWrappersWrappers 413.6 ms ✓ RuntimeGeneratedFunctions 1219.7 ms ✓ TimerOutputs 1001.5 ms ✓ DifferentiationInterface 1313.6 ms ✓ Jieko 746.2 ms ✓ FillArrays → FillArraysSparseArraysExt 552.4 ms ✓ Primes 1114.0 ms ✓ InverseFunctions → InverseFunctionsTestExt 403.8 ms ✓ InverseFunctions → InverseFunctionsDatesExt 653.4 ms ✓ CommonSubexpressions 1171.5 ms ✓ SimpleTraits 794.6 ms ✓ ThreadingUtilities 472.8 ms ✓ JLLWrappers 408.3 ms ✓ PrecompileTools 508.4 ms ✓ TruncatedStacktraces 1807.9 ms ✓ DispatchDoctor 404.4 ms ✓ Compat → CompatLinearAlgebraExt 1740.2 ms ✓ DataStructures 438.8 ms ✓ Adapt 426.4 ms ✓ LeftChildRightSiblingTrees 660.4 ms ✓ LambertW 685.6 ms ✓ LogExpFunctions 413.0 ms ✓ IntervalSets → IntervalSetsRandomExt 434.1 ms ✓ CompositionsBase → CompositionsBaseInverseFunctionsExt 548.4 ms ✓ ConsoleProgressMonitor 461.1 ms ✓ AliasTables 480.5 ms ✓ CodecZlib 401.3 ms ✓ ADTypes → ADTypesEnzymeCoreExt 933.6 ms ✓ ConstructionBase → ConstructionBaseIntervalSetsExt 394.8 ms ✓ ConstructionBase → ConstructionBaseLinearAlgebraExt 394.7 ms ✓ ADTypes → ADTypesConstructionBaseExt 452.6 ms ✓ Missings 2374.8 ms ✓ Unitful → ConstructionBaseUnitfulExt 1074.5 ms ✓ Unitful → NaNMathExt 1138.5 ms ✓ Unitful → InverseFunctionsUnitfulExt 1075.3 ms ✓ Unitful → PrintfExt 548.7 ms ✓ SciMLLogging 392.2 ms ✓ DiffResults 913.2 ms ✓ PDMats 729.3 ms ✓ FillArrays → FillArraysStatisticsExt 688.2 ms ✓ IntervalSets → IntervalSetsStatisticsExt 705.0 ms ✓ DifferentiationInterface → DifferentiationInterfaceSparseArraysExt 7573.7 ms ✓ Moshi 4073.7 ms ✓ SparseConnectivityTracer 535.0 ms ✓ Bzip2_jll 541.2 ms ✓ Xorg_libpciaccess_jll 545.7 ms ✓ METIS_jll 515.7 ms ✓ Rmath_jll 533.9 ms ✓ ASL_jll 535.4 ms ✓ IntelOpenMP_jll 560.2 ms ✓ JpegTurbo_jll 554.0 ms ✓ oneTBB_jll 526.7 ms ✓ Libiconv_jll 536.0 ms ✓ L_BFGS_B_jll 550.8 ms ✓ OpenBLAS32_jll 556.8 ms ✓ OpenSpecFun_jll 6732.2 ms ✓ StaticArrays 1205.5 ms ✓ RecipesBase 8482.1 ms ✓ CommonMark 8158.3 ms ✓ Parsers 879.8 ms ✓ FindFirstFunctions 5123.6 ms ✓ SparseMatrixColorings 788.3 ms ✓ Static 4602.2 ms ✓ DynamicQuantities 419.6 ms ✓ DispatchDoctor → DispatchDoctorEnzymeCoreExt 1161.5 ms ✓ ChainRulesCore 1947.2 ms ✓ MultivariatePolynomials 490.1 ms ✓ SortingAlgorithms 1075.9 ms ✓ QuadGK 675.6 ms ✓ Adapt → AdaptSparseArraysExt 697.0 ms ✓ ArrayInterface 482.8 ms ✓ GPUArraysCore 498.3 ms ✓ OffsetArrays → OffsetArraysAdaptExt 386.3 ms ✓ EnzymeCore → AdaptExt 574.6 ms ✓ TerminalLoggers 491.3 ms ✓ LogExpFunctions → LogExpFunctionsInverseFunctionsExt 479.6 ms ✓ PoissonRandom 577.6 ms ✓ Unityper 1304.2 ms ✓ Setfield 2192.4 ms ✓ Accessors 727.8 ms ✓ FillArrays → FillArraysPDMatsExt 1344.0 ms ✓ SparseConnectivityTracer → SparseConnectivityTracerNaNMathExt 1257.0 ms ✓ SparseConnectivityTracer → SparseConnectivityTracerLogExpFunctionsExt 861.3 ms ✓ DifferentiationInterface → DifferentiationInterfaceSparseConnectivityTracerExt 456.2 ms ✓ CodecBzip2 559.5 ms ✓ MUMPS_seq_jll 685.7 ms ✓ Rmath 595.1 ms ✓ Ghostscript_jll 544.2 ms ✓ MKL_jll 569.9 ms ✓ XML2_jll 412.3 ms ✓ LBFGSB 2532.4 ms ✓ SpecialFunctions 1301.4 ms ✓ ArnoldiMethod 716.0 ms ✓ ResettableStacks 1026.8 ms ✓ StaticArrays → StaticArraysStatisticsExt 758.5 ms ✓ FillArrays → FillArraysStaticArraysExt 2532.9 ms ✓ DomainSets 721.6 ms ✓ ConstructionBase → ConstructionBaseStaticArraysExt 1176.1 ms ✓ TaylorSeries → TaylorSeriesSAExt 735.8 ms ✓ DifferentiationInterface → DifferentiationInterfaceStaticArraysExt 698.0 ms ✓ Adapt → AdaptStaticArraysExt 575.2 ms ✓ IntervalSets → IntervalSetsRecipesBaseExt 644.5 ms ✓ CommonMark → CommonMarkMarkdownExt 1648.3 ms ✓ JSON 905.0 ms ✓ DifferentiationInterface → DifferentiationInterfaceSparseMatrixColoringsExt 396.7 ms ✓ BitTwiddlingConvenienceFunctions 837.9 ms ✓ CPUSummary 3046.4 ms ✓ DynamicQuantities → DynamicQuantitiesUnitfulExt 881.6 ms ✓ DynamicQuantities → DynamicQuantitiesLinearAlgebraExt 698.3 ms ✓ ChainRulesCore → ChainRulesCoreSparseArraysExt 436.0 ms ✓ ADTypes → ADTypesChainRulesCoreExt 1364.5 ms ✓ PolyLog → PolyLogChainRulesExt 575.7 ms ✓ EnzymeCore → EnzymeCoreChainRulesCoreExt 477.6 ms ✓ DifferentiationInterface → DifferentiationInterfaceChainRulesCoreExt 633.4 ms ✓ DispatchDoctor → DispatchDoctorChainRulesCoreExt 1409.7 ms ✓ LogExpFunctions → LogExpFunctionsChainRulesCoreExt 901.7 ms ✓ SparseConnectivityTracer → SparseConnectivityTracerChainRulesCoreExt 754.6 ms ✓ StaticArrays → StaticArraysChainRulesCoreExt 1717.6 ms ✓ DynamicPolynomials 1988.8 ms ✓ MultivariatePolynomials → MultivariatePolynomialsChainRulesCoreExt 2171.1 ms ✓ StatsBase 1798.7 ms ✓ HCubature 1286.5 ms ✓ StaticArrayInterface 898.4 ms ✓ MaybeInplace 694.7 ms ✓ ArrayInterface → ArrayInterfaceSparseArraysExt 417.2 ms ✓ ArrayInterface → ArrayInterfaceChainRulesCoreExt 375.4 ms ✓ ArrayInterface → ArrayInterfaceStaticArraysCoreExt 586.0 ms ✓ SciMLStructures 739.8 ms ✓ PreallocationTools 395.8 ms ✓ DifferentiationInterface → DifferentiationInterfaceGPUArraysCoreExt 380.5 ms ✓ ArrayInterface → ArrayInterfaceGPUArraysCoreExt 853.7 ms ✓ Accessors → LinearAlgebraExt 1363.2 ms ✓ Accessors → TestExt 1398.5 ms ✓ Accessors → IntervalSetsExt 1163.6 ms ✓ Accessors → UnitfulExt 820.3 ms ✓ Accessors → StaticArraysExt 2332.4 ms ✓ Latexify 541.8 ms ✓ Hwloc_jll 1651.0 ms ✓ SpecialFunctions → SpecialFunctionsChainRulesCoreExt 969.1 ms ✓ HypergeometricFunctions 606.2 ms ✓ DiffRules 1486.8 ms ✓ SparseConnectivityTracer → SparseConnectivityTracerSpecialFunctionsExt 4234.8 ms ✓ Graphs 13202.4 ms ✓ ArrayLayouts 817.4 ms ✓ DomainSets → DomainSetsRandomExt 25163.1 ms ✓ JuliaFormatter 1550.8 ms ✓ BenchmarkTools 579.8 ms ✓ PolyesterWeave 771.2 ms ✓ PDMats → StatsBaseExt 781.7 ms ✓ StaticArrayInterface → StaticArrayInterfaceStaticArraysExt 454.2 ms ✓ StaticArrayInterface → StaticArrayInterfaceOffsetArraysExt 451.4 ms ✓ CloseOpenIntervals 562.6 ms ✓ LayoutPointers 691.1 ms ✓ MaybeInplace → MaybeInplaceSparseArraysExt 632.6 ms ✓ FiniteDiff 857.3 ms ✓ PreallocationTools → PreallocationToolsSparseConnectivityTracerExt 3154.0 ms ✓ Roots 2003.9 ms ✓ SciMLOperators 1549.6 ms ✓ SymbolicIndexingInterface 872.0 ms ✓ Latexify → SparseArraysExt 1547.6 ms ✓ Unitful → LatexifyExt 563.9 ms ✓ SPRAL_jll 1426.4 ms ✓ StatsFuns 3296.5 ms ✓ ForwardDiff 2374.5 ms ✓ BlockArrays 1625.0 ms ✓ ArrayLayouts → ArrayLayoutsSparseArraysExt 927.3 ms ✓ StrideArraysCore 678.7 ms ✓ FiniteDiff → FiniteDiffSparseArraysExt 705.0 ms ✓ FiniteDiff → FiniteDiffStaticArraysExt 503.8 ms ✓ DifferentiationInterface → DifferentiationInterfaceFiniteDiffExt 573.6 ms ✓ Roots → RootsChainRulesCoreExt 4700.3 ms ✓ Roots → RootsUnitfulExt 518.6 ms ✓ SciMLOperators → SciMLOperatorsStaticArraysCoreExt 817.2 ms ✓ SciMLOperators → SciMLOperatorsSparseArraysExt 3427.8 ms ✓ RecursiveArrayTools 20936.9 ms ✓ SymbolicUtils 552.3 ms ✓ Ipopt_jll 557.8 ms ✓ StatsFuns → StatsFunsInverseFunctionsExt 1513.8 ms ✓ StatsFuns → StatsFunsChainRulesCoreExt 4795.7 ms ✓ Distributions 862.6 ms ✓ ForwardDiff → ForwardDiffStaticArraysExt 529.6 ms ✓ PolyLog → PolyLogForwardDiffExt 529.8 ms ✓ FastPower → FastPowerForwardDiffExt 2382.2 ms ✓ Unitful → ForwardDiffExt 683.9 ms ✓ DifferentiationInterface → DifferentiationInterfaceForwardDiffExt 544.5 ms ✓ PreallocationTools → PreallocationToolsForwardDiffExt 32092.9 ms ✓ MathOptInterface 652.6 ms ✓ Roots → RootsForwardDiffExt 1438.5 ms ✓ BlockArrays → BlockArraysAdaptExt 697.7 ms ✓ Polyester 2111.7 ms ✓ RecursiveArrayTools → RecursiveArrayToolsStatisticsExt 1068.1 ms ✓ RecursiveArrayTools → RecursiveArrayToolsSparseArraysExt 750.8 ms ✓ RecursiveArrayTools → RecursiveArrayToolsForwardDiffExt 1097.7 ms ✓ TaylorSeries → TaylorSeriesRATExt 2622.7 ms ✓ SymbolicLimits 525.2 ms ✓ Ipopt 1511.8 ms ✓ Distributions → DistributionsTestExt 1454.1 ms ✓ Distributions → DistributionsChainRulesCoreExt 1327.0 ms ✓ MvNormalCDF 1722.6 ms ✓ PeriodicHiddenMarkovModels 983.2 ms ✓ NLSolversBase 17822.7 ms ✓ JuMP 714.7 ms ✓ FastBroadcast 15587.7 ms ✓ SciMLBase 18651.1 ms ✓ Ipopt → IpoptMathOptInterfaceExt 1095.7 ms ✓ LineSearches 1698.0 ms ✓ LsqFit 4000.7 ms ✓ SparseMatrixColorings → SparseMatrixColoringsJuMPExt 858.3 ms ✓ RecursiveArrayTools → RecursiveArrayToolsFastBroadcastExt 2318.7 ms ✓ SciMLBase → SciMLBaseDistributionsExt 2139.4 ms ✓ SciMLBase → SciMLBaseMLStyleExt 1814.7 ms ✓ SciMLBase → SciMLBaseChainRulesCoreExt 1766.2 ms ✓ SciMLBase → SciMLBaseDifferentiationInterfaceExt 2144.8 ms ✓ SciMLBase → SciMLBaseForwardDiffExt 1854.3 ms ✓ SCCNonlinearSolve 2862.5 ms ✓ Optim 10178.4 ms ✓ LinearSolve 23151.0 ms ✓ Symbolics 3061.9 ms ✓ OptimizationBase 3898.1 ms ✓ SciMLJacobianOperators 1801.0 ms ✓ SCCNonlinearSolve → SCCNonlinearSolveChainRulesCoreExt 2563.9 ms ✓ Optim → OptimMOIExt 4021.9 ms ✓ Copulas 7871.8 ms ✓ LinearSolve → LinearSolveForwardDiffExt 4163.5 ms ✓ LinearSolve → LinearSolveSparseArraysExt 10889.4 ms ✓ Symbolics → SymbolicsForwardDiffExt 4993.5 ms ✓ DifferentiationInterface → DifferentiationInterfaceSymbolicsExt 558.0 ms ✓ OptimizationBase → OptimizationForwardDiffExt 406.8 ms ✓ OptimizationBase → OptimizationFiniteDiffExt 2740.2 ms ✓ Optimization 5926.8 ms ✓ LineSearch 8427.1 ms ✓ NonlinearSolveBase 2221.4 ms ✓ LinearSolve → LinearSolveEnzymeExt 11051.7 ms ✓ Symbolics → SymbolicsPreallocationToolsExt 11852.1 ms ✓ OptimizationOptimJL 1999.4 ms ✓ LineSearch → LineSearchLineSearchesExt 3876.9 ms ✓ NonlinearSolveBase → NonlinearSolveBaseSparseMatrixColoringsExt 2221.4 ms ✓ NonlinearSolveBase → NonlinearSolveBaseForwardDiffExt 2018.1 ms ✓ NonlinearSolveBase → NonlinearSolveBaseSparseArraysExt 1867.7 ms ✓ NonlinearSolveBase → NonlinearSolveBaseLineSearchExt 4102.7 ms ✓ NonlinearSolveBase → NonlinearSolveBaseLinearSolveExt 1859.8 ms ✓ NonlinearSolveBase → NonlinearSolveBaseChainRulesCoreExt 4470.7 ms ✓ BracketingNonlinearSolve 32723.7 ms ✓ NonlinearSolveFirstOrder 2192.1 ms ✓ BracketingNonlinearSolve → BracketingNonlinearSolveForwardDiffExt 4018.1 ms ✓ DiffEqBase 1991.0 ms ✓ BracketingNonlinearSolve → BracketingNonlinearSolveChainRulesCoreExt 9600.1 ms ✓ SimpleNonlinearSolve 4475.9 ms ✓ DiffEqBase → DiffEqBaseChainRulesCoreExt 2822.1 ms ✓ DiffEqBase → DiffEqBaseUnitfulExt 2284.6 ms ✓ DiffEqBase → DiffEqBaseForwardDiffExt 2107.8 ms ✓ DiffEqBase → DiffEqBaseSparseArraysExt 2321.7 ms ✓ SimpleNonlinearSolve → SimpleNonlinearSolveChainRulesCoreExt 4073.6 ms ✓ DiffEqNoiseProcess 5838.8 ms ✓ DiffEqCallbacks 6018.0 ms ✓ OrdinaryDiffEqCore 5571.2 ms ✓ DiffEqNoiseProcess → DiffEqNoiseProcessOptimExt 4050.4 ms ✓ JumpProcesses 2495.6 ms ✓ OrdinaryDiffEqCore → OrdinaryDiffEqCoreSparseArraysExt 12372.3 ms ✓ ImplicitDiscreteSolve 143892.8 ms ✓ ModelingToolkit 25387.0 ms ✓ OptimizationBase → OptimizationMTKExt 25696.4 ms ✓ OptimizationMOI 35325.8 ms ✓ SmoothPeriodicStatsModels 334 dependencies successfully precompiled in 973 seconds. 8 already precompiled. 1 dependency had output during precompilation: ┌ OptimizationMOI │ WARNING: could not import ModelingToolkit.mergedefaults into OptimizationMOI └ Precompilation completed after 980.93s ################################################################################ # Testing # Testing SmoothPeriodicStatsModels Status `/tmp/jl_Hz9w9o/Project.toml` [31c24e10] Distributions v0.25.123 [b6b21f68] Ipopt v1.14.1 ⌅ [7f7a1694] Optimization v4.8.0 ⌅ [fd9f6733] 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[bea87d4a] SuiteSparse_jll v7.2.1+1 [83775a58] Zlib_jll v1.2.13+1 [8e850b90] libblastrampoline_jll v5.11.0+0 [8e850ede] nghttp2_jll v1.52.0+1 [3f19e933] p7zip_jll v17.6.1+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. 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 37.2s 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 7.6362772e+04 0.00e+00 1.00e+02 -1.0 0.00e+00 - 0.00e+00 0.00e+00 0 1 6.6404012e+04 0.00e+00 5.42e+01 -1.0 7.02e-01 2.0 1.00e+00 1.00e+00f 1 2 6.1250331e+04 0.00e+00 1.66e+01 -1.0 1.16e+00 1.5 1.00e+00 1.00e+00f 1 3 6.0581980e+04 0.00e+00 4.43e+00 -1.0 2.55e-01 1.0 1.00e+00 1.00e+00f 1 4 6.0468717e+04 0.00e+00 2.84e+00 -1.0 1.30e+00 - 1.00e+00 5.00e-01f 2 5 6.0424727e+04 0.00e+00 9.14e-01 -1.0 6.10e-01 - 1.00e+00 5.00e-01f 2 6 6.0417574e+04 0.00e+00 9.92e-02 -1.7 1.56e-01 - 1.00e+00 1.00e+00f 1 7 6.0417523e+04 0.00e+00 4.26e-03 -2.5 8.48e-03 - 1.00e+00 1.00e+00f 1 8 6.0417523e+04 0.00e+00 3.47e-07 -3.8 8.76e-05 - 1.00e+00 1.00e+00f 1 9 6.0417523e+04 0.00e+00 1.49e-13 -8.6 9.98e-08 - 1.00e+00 1.00e+00f 1 Number of Iterations....: 9 (scaled) (unscaled) Objective...............: 7.0808927323860837e+02 6.0417522534004573e+04 Dual infeasibility......: 1.4941379521190621e-13 1.2748690991770673e-11 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.......: 1.4941379521190621e-13 1.2748690991770673e-11 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 = 10.675 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/ivotG/src/cache.jl:49 Test Summary: | Pass Total Time Mixture: fit_mle_trig_exp2_Optim | 2 2 35.3s Test Summary: |Time Sample from HMM | None 2.1s 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): 45.411249 seconds (212.65 M allocations: 26.346 GiB, 3.05% gc time, 12.98% compilation time: <1% of which was recompilation) Test Summary: | Pass Total Time PeriodicHMM | 2 2 47.2s FitMLE SHMM (Baum Welch) K = 1, autoregressive_order = 0, degree_of_P = 0: 0.014175 seconds (14.25 k allocations: 1.250 MiB) FitMLE SHMM (Baum Welch) K = 1, autoregressive_order = 0, degree_of_P = 1: 0.014273 seconds (16.34 k allocations: 1.486 MiB) FitMLE SHMM (Baum Welch) K = 1, autoregressive_order = 0, degree_of_P = 2: 0.014586 seconds (19.08 k allocations: 1.820 MiB) FitMLE SHMM (Baum Welch) K = 1, autoregressive_order = 1, degree_of_P = 0: 0.022521 seconds (24.66 k allocations: 2.223 MiB) FitMLE SHMM (Baum Welch) K = 1, autoregressive_order = 1, degree_of_P = 1: 0.026784 seconds (28.94 k allocations: 2.677 MiB) FitMLE SHMM (Baum Welch) K = 1, autoregressive_order = 1, degree_of_P = 2: 0.037375 seconds (35.20 k allocations: 3.359 MiB) FitMLE SHMM (Baum Welch) K = 1, autoregressive_order = 2, degree_of_P = 0: 0.617648 seconds (562.82 k allocations: 40.223 MiB, 3.97% gc time, 91.96% compilation time) FitMLE SHMM (Baum Welch) K = 1, autoregressive_order = 2, degree_of_P = 1: 0.050149 seconds (53.00 k allocations: 4.933 MiB) FitMLE SHMM (Baum Welch) K = 1, autoregressive_order = 2, degree_of_P = 2: 0.114322 seconds (70.62 k allocations: 6.484 MiB) FitMLE SHMM (Baum Welch) K = 2, autoregressive_order = 0, degree_of_P = 0: 3.663370 seconds (2.26 M allocations: 204.425 MiB, 1.80% gc time) FitMLE SHMM (Baum Welch) K = 2, autoregressive_order = 0, degree_of_P = 1: 0.719502 seconds (484.10 k allocations: 45.188 MiB, 0.92% gc time) FitMLE SHMM (Baum Welch) K = 2, autoregressive_order = 0, degree_of_P = 2: 0.986657 seconds (826.62 k allocations: 81.676 MiB, 0.55% gc time) FitMLE SHMM (Baum Welch) K = 2, autoregressive_order = 1, degree_of_P = 0: 1.503612 seconds (1.03 M allocations: 91.548 MiB, 0.46% gc time) FitMLE SHMM (Baum Welch) K = 2, autoregressive_order = 1, degree_of_P = 1: 0.744442 seconds (458.95 k allocations: 42.113 MiB, 0.79% gc time) FitMLE SHMM (Baum Welch) K = 2, autoregressive_order = 1, degree_of_P = 2: 0.918741 seconds (687.91 k allocations: 66.965 MiB, 0.69% gc time) FitMLE SHMM (Baum Welch) K = 2, autoregressive_order = 2, degree_of_P = 0: 3.025232 seconds (1.93 M allocations: 171.083 MiB, 0.61% gc time) FitMLE SHMM (Baum Welch) K = 2, autoregressive_order = 2, degree_of_P = 1: 2.150149 seconds (1.59 M allocations: 147.652 MiB, 0.65% gc time) FitMLE SHMM (Baum Welch) K = 2, autoregressive_order = 2, degree_of_P = 2: 1.672964 seconds (1.24 M allocations: 120.705 MiB, 0.73% gc time) Test Summary: | Time Hierachical PeriodicHMM for many hyperparams | None 17.2s 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: 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: pmap worker: 110.210884 seconds (106.24 M allocations: 18.108 GiB, 1.51% gc time, 4.97% compilation time: 1% of which was recompilation) Test Summary: | Time Distributed PeriodicHMM | None 1m50.3s Testing SmoothPeriodicStatsModels tests passed Testing completed after 233.32s PkgEval succeeded after 1378.29s