Package evaluation to test MatrixProductBP on Julia 1.14.0-DEV.2275 (3ea3bac2a3*) started at 2026-06-03T04:45:18.727 ################################################################################ # Set-up # Installing PkgEval dependencies (TestEnv)... Activating project at `~/.julia/environments/v1.14` Set-up completed after 14.8s ################################################################################ # Installation # Installing MatrixProductBP... Resolving package versions... Updating `~/.julia/environments/v1.14/Project.toml` [3d39929c] + MatrixProductBP v0.9.0 Updating `~/.julia/environments/v1.14/Manifest.toml` [7d9f7c33] + Accessors v0.1.44 [79e6a3ab] + Adapt v4.6.0 [66dad0bd] + AliasTables v1.1.3 [dce04be8] + ArgCheck v2.5.0 [ec485272] + ArnoldiMethod v0.4.0 [4fba245c] + ArrayInterface v7.25.0 [198e06fe] + BangBang v0.4.9 [9718e550] + Baselet v0.1.1 [62783981] + BitTwiddlingConvenienceFunctions v0.1.6 [2a0fbf3d] + CPUSummary v0.2.7 [49dc2e85] + Calculus v0.5.2 [217fe2f1] + CavityTools v1.3.2 [d360d2e6] + ChainRulesCore v1.26.1 [fb6a15b2] + CloseOpenIntervals v0.1.13 [f70d9fcc] + CommonWorldInvalidations v1.0.0 [34da2185] + Compat v4.18.1 [a33af91c] + CompositionsBase v0.1.2 [187b0558] + ConstructionBase v1.6.0 [6add18c4] + ContextVariablesX v0.1.3 [adafc99b] + CpuId v0.3.1 [9a962f9c] + DataAPI v1.16.0 [864edb3b] + DataStructures v0.19.5 [e2d170a0] + DataValueInterfaces v1.0.0 [244e2a9f] + DefineSingletons v0.1.2 [b552c78f] + DiffRules v1.16.0 [31c24e10] + Distributions v0.25.125 [ffbed154] + DocStringExtensions v0.9.5 [cc61a311] + FLoops v0.2.2 [b9860ae5] + FLoopsBase v0.1.1 [9aa1b823] + FastClosures v0.3.2 [1a297f60] + FillArrays v1.16.0 [9c68100b] + FoldsThreads v0.1.2 [069b7b12] + FunctionWrappers v1.1.3 [46192b85] + GPUArraysCore v0.2.0 [86223c79] + Graphs v1.14.0 [f0d1745a] + HalfIntegers v1.6.0 [3e5b6fbb] + HostCPUFeatures v0.1.18 [34004b35] + HypergeometricFunctions v0.3.28 [615f187c] + IfElse v0.1.1 [8a731c18] + IndexedGraphs v0.6.1 [d25df0c9] + Inflate v0.1.5 [22cec73e] + InitialValues v0.3.1 [18e54dd8] + IntegerMathUtils v0.1.3 [3587e190] + InverseFunctions v0.1.17 [41ab1584] + InvertedIndices v1.3.1 [92d709cd] + IrrationalConstants v0.2.6 [82899510] + IteratorInterfaceExtensions v1.0.0 [692b3bcd] + JLLWrappers v1.8.0 [b14d175d] + JuliaVariables v0.2.4 [2c470bb0] + Kronecker v0.5.5 ⌅ [0b1a1467] + KrylovKit v0.8.3 [8ac3fa9e] + LRUCache v1.6.2 [10f19ff3] + LayoutPointers v0.1.17 [50d2b5c4] + Lazy v0.15.1 [1fad7336] + LazyStack v0.1.3 ⌅ [2ab3a3ac] + LogExpFunctions v0.3.29 [aa2f6b4e] + LogarithmicNumbers v1.4.1 [e6f89c97] + LoggingExtras v1.2.0 [bdcacae8] + LoopVectorization v0.12.174 ⌅ [33e6dc65] + MKL v0.7.0 [d8e11817] + MLStyle v0.4.17 ⌅ [bb1c41ca] + MPSKit v0.11.6 [1914dd2f] + MacroTools v0.5.16 [d125e4d3] + ManualMemory v0.1.8 [3d39929c] + MatrixProductBP v0.9.0 [eff96d63] + Measurements v2.14.1 [128add7d] + MicroCollections v0.2.0 [e1d29d7a] + Missings v1.2.0 [77ba4419] + NaNMath v1.1.3 [71a1bf82] + NameResolution v0.1.5 [356022a1] + NamedDims v1.2.3 [6fe1bfb0] + OffsetArrays v1.17.0 ⌅ [77e91f04] + OptimKit v0.3.1 ⌅ [bac558e1] + OrderedCollections v1.8.2 [90014a1f] + PDMats v0.11.37 [65ce6f38] + PackageExtensionCompat v1.0.2 [1d0040c9] + PolyesterWeave v0.2.2 [aea7be01] + PrecompileTools v1.3.4 [21216c6a] + Preferences v1.5.2 [8162dcfd] + PrettyPrint v0.2.0 [27ebfcd6] + Primes v0.5.7 [92933f4c] + ProgressMeter v1.11.0 [43287f4e] + PtrArrays v1.4.0 [1fd47b50] + QuadGK v2.11.3 [308eb6b3] + RationalRoots v0.2.1 [3cdcf5f2] + RecipesBase v1.3.4 [189a3867] + Reexport v1.2.2 [ae029012] + Requires v1.3.1 [79098fc4] + Rmath v0.9.0 [94e857df] + SIMDTypes v0.1.0 [476501e8] + SLEEFPirates v0.6.46 [431bcebd] + SciMLPublic v1.0.1 [efcf1570] + Setfield v1.1.2 [699a6c99] + SimpleTraits v0.9.6 [a2af1166] + SortingAlgorithms v1.2.2 [276daf66] + SpecialFunctions v2.8.0 [171d559e] + SplittablesBase v0.1.15 [aedffcd0] + Static v1.4.0 [0d7ed370] + StaticArrayInterface v1.10.0 [90137ffa] + StaticArrays v1.9.18 [1e83bf80] + StaticArraysCore v1.4.4 [10745b16] + Statistics v1.11.1 [82ae8749] + StatsAPI v1.8.0 [2913bbd2] + StatsBase v0.34.11 ⌅ [4c63d2b9] + StatsFuns v1.5.2 [5e0ebb24] + Strided v2.5.0 [4db3bf67] + StridedViews v0.5.1 [3783bdb8] + TableTraits v1.0.1 [bd369af6] + Tables v1.12.1 [02d47bb6] + TensorCast v0.4.9 ⌅ [07d1fe3e] + TensorKit v0.12.0 ⌅ [11fa318c] + TensorKitManifolds v0.6.2 ⌅ [6aa20fa7] + TensorOperations v4.0.6 ⌅ [89893e69] + TensorTrains v0.12.1 [8290d209] + ThreadingUtilities v0.5.6 [d94bfb22] + TrackingHeaps v0.1.0 [28d57a85] + Transducers v0.4.85 [24ddb15e] + TransmuteDims v0.1.17 [bc48ee85] + Tullio v0.3.9 [9d95972d] + TupleTools v1.6.0 [3a884ed6] + UnPack v1.0.2 [41fe7b60] + Unzip v0.2.0 ⌅ [409d34a3] + VectorInterface v0.4.9 [3d5dd08c] + VectorizationBase v0.21.74 [9f57e263] + WignerSymbols v2.0.0 ⌅ [1d5cc7b8] + IntelOpenMP_jll v2024.2.1+0 ⌅ [856f044c] + MKL_jll v2024.2.0+0 [efe28fd5] + OpenSpecFun_jll v0.5.6+0 [f50d1b31] + Rmath_jll v0.5.1+0 [1317d2d5] + oneTBB_jll v2022.3.0+0 [0dad84c5] + ArgTools v1.1.2 [56f22d72] + Artifacts v1.11.0 [2a0f44e3] + Base64 v1.11.0 [ade2ca70] + Dates v1.11.0 [8ba89e20] + Distributed v1.11.0 [f43a241f] + Downloads v1.7.0 [7b1f6079] + FileWatching v1.11.0 [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 v1.14.0 [56ddb016] + Logging v1.11.0 [d6f4376e] + Markdown v1.11.0 [ca575930] + NetworkOptions v1.3.0 [44cfe95a] + Pkg v1.14.0 [de0858da] + Printf v1.11.0 [9a3f8284] + Random v1.11.0 [ea8e919c] + SHA v1.13.0 [9e88b42a] + Serialization v1.11.0 [6462fe0b] + Sockets v1.11.0 [2f01184e] + SparseArrays v1.13.0 [f489334b] + StyledStrings v1.13.0 [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 v1.5.2+0 [deac9b47] + LibCURL_jll v8.20.0+1 [e37daf67] + LibGit2_jll v1.9.4+0 [29816b5a] + LibSSH2_jll v1.11.101+0 [14a3606d] + MozillaCACerts_jll v2026.5.14 [4536629a] + OpenBLAS_jll v0.3.33+0 [05823500] + OpenLibm_jll v0.8.7+0 [458c3c95] + OpenSSL_jll v3.5.6+0 [efcefdf7] + PCRE2_jll v10.47.0+0 [bea87d4a] + SuiteSparse_jll v7.10.1+0 [83775a58] + Zlib_jll v1.3.2+0 [3161d3a3] + Zstd_jll v1.5.7+1 [8e850b90] + libblastrampoline_jll v5.15.0+0 [8e850ede] + nghttp2_jll v1.69.0+0 [3f19e933] + p7zip_jll v17.8.0+0 Info Packages marked with ⌅ have new versions available but compatibility constraints restrict them from upgrading. To see why use `status --outdated -m` Installation completed after 7.14s ################################################################################ # Precompilation # Precompiling PkgEval dependencies... Precompiling package dependencies... Precompiling project... 5.0 s ✓ IndexedGraphs 34.4 s ✓ TensorTrains WARNING: Imported binding CavityTools.ExponentialQueue was undeclared at import time during import to MatrixProductBP. 59.0 s ✓ MatrixProductBP 3 dependencies successfully precompiled in 101 seconds. 215 already precompiled. 1 dependency had output during precompilation: ┌ MatrixProductBP │ WARNING: Imported binding CavityTools.ExponentialQueue was undeclared at import time during import to MatrixProductBP. └ Precompilation completed after 127.88s ################################################################################ # Testing # Testing MatrixProductBP Status `/tmp/jl_TgrZQ2/Project.toml` [4c88cf16] Aqua v0.8.15 [31c24e10] Distributions v0.25.125 [86223c79] Graphs v1.14.0 [8a731c18] IndexedGraphs v0.6.1 [3d39929c] MatrixProductBP v0.9.0 ⌅ [89893e69] TensorTrains v0.12.1 [9a3f8284] Random v1.11.0 [2f01184e] SparseArrays v1.13.0 [8dfed614] Test v1.11.0 Status `/tmp/jl_TgrZQ2/Manifest.toml` [7d9f7c33] Accessors v0.1.44 [79e6a3ab] Adapt v4.6.0 [66dad0bd] AliasTables v1.1.3 [4c88cf16] Aqua v0.8.15 [dce04be8] ArgCheck v2.5.0 [ec485272] ArnoldiMethod v0.4.0 [4fba245c] ArrayInterface v7.25.0 [198e06fe] BangBang v0.4.9 [9718e550] Baselet v0.1.1 [62783981] BitTwiddlingConvenienceFunctions v0.1.6 [2a0fbf3d] CPUSummary v0.2.7 [49dc2e85] Calculus v0.5.2 [217fe2f1] CavityTools v1.3.2 [d360d2e6] ChainRulesCore v1.26.1 [fb6a15b2] CloseOpenIntervals v0.1.13 [f70d9fcc] CommonWorldInvalidations v1.0.0 [34da2185] Compat v4.18.1 [a33af91c] CompositionsBase v0.1.2 [187b0558] ConstructionBase v1.6.0 [6add18c4] ContextVariablesX v0.1.3 [adafc99b] CpuId v0.3.1 [9a962f9c] DataAPI v1.16.0 [864edb3b] DataStructures v0.19.5 [e2d170a0] DataValueInterfaces v1.0.0 [244e2a9f] DefineSingletons v0.1.2 [b552c78f] DiffRules v1.16.0 [31c24e10] Distributions v0.25.125 [ffbed154] DocStringExtensions v0.9.5 [cc61a311] FLoops v0.2.2 [b9860ae5] FLoopsBase v0.1.1 [9aa1b823] FastClosures v0.3.2 [1a297f60] FillArrays v1.16.0 [9c68100b] FoldsThreads v0.1.2 [069b7b12] FunctionWrappers v1.1.3 [46192b85] GPUArraysCore v0.2.0 [86223c79] Graphs v1.14.0 [f0d1745a] HalfIntegers v1.6.0 [3e5b6fbb] HostCPUFeatures v0.1.18 [34004b35] HypergeometricFunctions v0.3.28 [615f187c] IfElse v0.1.1 [8a731c18] IndexedGraphs v0.6.1 [d25df0c9] Inflate v0.1.5 [22cec73e] InitialValues v0.3.1 [18e54dd8] IntegerMathUtils v0.1.3 [3587e190] InverseFunctions v0.1.17 [41ab1584] InvertedIndices v1.3.1 [92d709cd] IrrationalConstants v0.2.6 [82899510] IteratorInterfaceExtensions v1.0.0 [692b3bcd] JLLWrappers v1.8.0 [b14d175d] JuliaVariables v0.2.4 [2c470bb0] Kronecker v0.5.5 ⌅ [0b1a1467] KrylovKit v0.8.3 [8ac3fa9e] LRUCache v1.6.2 [10f19ff3] LayoutPointers v0.1.17 [50d2b5c4] Lazy v0.15.1 [1fad7336] LazyStack v0.1.3 ⌅ [2ab3a3ac] LogExpFunctions v0.3.29 [aa2f6b4e] LogarithmicNumbers v1.4.1 [e6f89c97] LoggingExtras v1.2.0 [bdcacae8] LoopVectorization v0.12.174 ⌅ [33e6dc65] MKL v0.7.0 [d8e11817] MLStyle v0.4.17 ⌅ [bb1c41ca] MPSKit v0.11.6 [1914dd2f] MacroTools v0.5.16 [d125e4d3] ManualMemory v0.1.8 [3d39929c] MatrixProductBP v0.9.0 [eff96d63] Measurements v2.14.1 [128add7d] MicroCollections v0.2.0 [e1d29d7a] Missings v1.2.0 [77ba4419] NaNMath v1.1.3 [71a1bf82] NameResolution v0.1.5 [356022a1] NamedDims v1.2.3 [6fe1bfb0] OffsetArrays v1.17.0 ⌅ [77e91f04] OptimKit v0.3.1 ⌅ [bac558e1] OrderedCollections v1.8.2 [90014a1f] PDMats v0.11.37 [65ce6f38] PackageExtensionCompat v1.0.2 [1d0040c9] PolyesterWeave v0.2.2 [aea7be01] PrecompileTools v1.3.4 [21216c6a] Preferences v1.5.2 [8162dcfd] PrettyPrint v0.2.0 [27ebfcd6] Primes v0.5.7 [92933f4c] ProgressMeter v1.11.0 [43287f4e] PtrArrays v1.4.0 [1fd47b50] QuadGK v2.11.3 [308eb6b3] RationalRoots v0.2.1 [3cdcf5f2] RecipesBase v1.3.4 [189a3867] Reexport v1.2.2 [ae029012] Requires v1.3.1 [79098fc4] Rmath v0.9.0 [94e857df] SIMDTypes v0.1.0 [476501e8] SLEEFPirates v0.6.46 [431bcebd] SciMLPublic v1.0.1 [efcf1570] Setfield v1.1.2 [699a6c99] SimpleTraits v0.9.6 [a2af1166] SortingAlgorithms v1.2.2 [276daf66] SpecialFunctions v2.8.0 [171d559e] SplittablesBase v0.1.15 [aedffcd0] Static v1.4.0 [0d7ed370] StaticArrayInterface v1.10.0 [90137ffa] StaticArrays v1.9.18 [1e83bf80] StaticArraysCore v1.4.4 [10745b16] Statistics v1.11.1 [82ae8749] StatsAPI v1.8.0 [2913bbd2] StatsBase v0.34.11 ⌅ [4c63d2b9] StatsFuns v1.5.2 [5e0ebb24] Strided v2.5.0 [4db3bf67] StridedViews v0.5.1 [3783bdb8] TableTraits v1.0.1 [bd369af6] Tables v1.12.1 [02d47bb6] TensorCast v0.4.9 ⌅ [07d1fe3e] TensorKit v0.12.0 ⌅ [11fa318c] TensorKitManifolds v0.6.2 ⌅ [6aa20fa7] TensorOperations v4.0.6 ⌅ [89893e69] TensorTrains v0.12.1 [8290d209] ThreadingUtilities v0.5.6 [d94bfb22] TrackingHeaps v0.1.0 [28d57a85] Transducers v0.4.85 [24ddb15e] TransmuteDims v0.1.17 [bc48ee85] Tullio v0.3.9 [9d95972d] TupleTools v1.6.0 [3a884ed6] UnPack v1.0.2 [41fe7b60] Unzip v0.2.0 ⌅ [409d34a3] VectorInterface v0.4.9 [3d5dd08c] VectorizationBase v0.21.74 [9f57e263] WignerSymbols v2.0.0 ⌅ [1d5cc7b8] IntelOpenMP_jll v2024.2.1+0 ⌅ 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v1.11.0 [4ec0a83e] Unicode v1.11.0 [e66e0078] CompilerSupportLibraries_jll v1.5.2+0 [deac9b47] LibCURL_jll v8.20.0+1 [e37daf67] LibGit2_jll v1.9.4+0 [29816b5a] LibSSH2_jll v1.11.101+0 [14a3606d] MozillaCACerts_jll v2026.5.14 [4536629a] OpenBLAS_jll v0.3.33+0 [05823500] OpenLibm_jll v0.8.7+0 [458c3c95] OpenSSL_jll v3.5.6+0 [efcefdf7] PCRE2_jll v10.47.0+0 [bea87d4a] SuiteSparse_jll v7.10.1+0 [83775a58] Zlib_jll v1.3.2+0 [3161d3a3] Zstd_jll v1.5.7+1 [8e850b90] libblastrampoline_jll v5.15.0+0 [8e850ede] nghttp2_jll v1.69.0+0 [3f19e933] p7zip_jll v17.8.0+0 Info Packages marked with ⌅ have new versions available but compatibility constraints restrict them from upgrading. Testing Running tests... Test Summary: | Pass Total Time Aqua | 11 11 4m29.2s Running PopDyn: iter 3 Time: 0:00:00 it: 3/100 ε: 0.002446636374557/1.0e-15     Running PopDyn: iter 11 Time: 0:00:00 it: 11/100 ε: 0.010642758339185/1.0e-15     Running PopDyn: iter 15 Time: 0:00:00 it: 15/100 ε: 0.034047606560661/1.0e-15     Running PopDyn: iter 18 Time: 0:00:00 it: 18/100 ε: 0.074417212941338/1.0e-15     Running PopDyn: iter 21 Time: 0:00:00 it: 21/100 ε: 0.146434492351746/1.0e-15     Running PopDyn: iter 24 Time: 0:00:01 it: 24/100 ε: 0.331292216698303/1.0e-15     Running PopDyn: iter 28 Time: 0:00:01 it: 28/100 ε: 0.847199340062728/1.0e-15     Running PopDyn: iter 31 Time: 0:00:01 it: 31/100 ε: 1.465137117559856/1.0e-15     Running PopDyn: iter 34 Time: 0:00:01 it: 34/100 ε: 2.066828642789514/1.0e-15     Running PopDyn: iter 37 Time: 0:00:01 it: 37/100 ε: 2.462426958703678/1.0e-15     Running PopDyn: iter 40 Time: 0:00:01 it: 40/100 ε: 2.562470401854498/1.0e-15     Running PopDyn: iter 43 Time: 0:00:01 it: 43/100 ε: 2.599227952222204/1.0e-15     Running PopDyn: iter 46 Time: 0:00:01 it: 46/100 ε: 2.604485292911272/1.0e-15     Running PopDyn: iter 49 Time: 0:00:01 it: 49/100 ε: 2.606247110875494/1.0e-15     Running PopDyn: iter 52 Time: 0:00:02 it: 52/100 ε: 2.606488690036844/1.0e-15     Running PopDyn: iter 55 Time: 0:00:02 it: 55/100 ε: 2.606568974748095/1.0e-15     Running PopDyn: iter 59 Time: 0:00:02 it: 59/100 ε: 2.6065822986124/1.0e-15     Running PopDyn: iter 62 Time: 0:00:02 it: 62/100 ε: 2.606583700549783/1.0e-15     Running PopDyn: iter 65 Time: 0:00:02 it: 65/100 ε: 2.606584165801302/1.0e-15     Running PopDyn: iter 68 Time: 0:00:02 it: 68/100 ε: 2.60658422954716/1.0e-15     Running PopDyn: iter 71 Time: 0:00:02 it: 71/100 ε: 2.606584250672342/1.0e-15     Running PopDyn: iter 74 Time: 0:00:02 it: 74/100 ε: 2.606584253560728/1.0e-15     Running PopDyn: iter 78 Time: 0:00:03 it: 78/100 ε: 2.606584254559513/1.0e-15     Running PopDyn: iter 81 Time: 0:00:03 it: 81/100 ε: 2.606584254681042/1.0e-15     Running PopDyn: iter 85 Time: 0:00:03 it: 85/100 ε: 2.606584254701336/1.0e-15     Running PopDyn: iter 88 Time: 0:00:03 it: 88/100 ε: 2.606584254703457/1.0e-15     Running PopDyn: iter 92 Time: 0:00:03 it: 92/100 ε: 2.606584254704202/1.0e-15     Running PopDyn: iter 95 Time: 0:00:03 it: 95/100 ε: 2.60658425470431/1.0e-15     Running PopDyn: iter 99 Time: 0:00:03 it: 99/100 ε: 2.606584254704319/1.0e-15  ┌ Warning: Population dynamics did not converge. Error 2.606584254704319 └ @ MatrixProductBP.Models ~/.julia/packages/MatrixProductBP/Hhmig/src/Models/glauber/equilibrium.jl:113 Test Summary: | Pass Total Time Equilibrium | 1 1 0.2s Running MPBP: iter 2 Time: 0:03:20 Δ: 0.4933186766876243 trunc: ("SVD tolerance", "0.0")     Running MPBP: iter 5 Time: 0:03:20 Δ: 0.056869431649393176 trunc: ("SVD tolerance", "0.0")     Running MPBP: iter 6 Time: 0:03:20 Δ: 0.05448554234985603 trunc: ("SVD tolerance", "0.0")     Running MPBP: iter 7 Time: 0:03:21 Δ: 0.0234124610459594 trunc: ("SVD tolerance", "0.0")     Running MPBP: iter 8 Time: 0:03:21 Δ: 0.028095059614638318 trunc: ("SVD tolerance", "0.0")     Running MPBP: iter 9 Time: 0:03:21 Δ: 0.017350502967337755 trunc: ("SVD tolerance", "0.0")     Running MPBP: iter 10 Time: 0:03:21 Δ: 0.005799671073017709 trunc: ("SVD tolerance", "0.0")     Running MPBP: iter 11 Time: 0:03:21 Δ: 0.008249678113051218 trunc: ("SVD tolerance", "0.0")     Running MPBP: iter 12 Time: 0:03:21 Δ: 0.005895222904046982 trunc: ("SVD tolerance", "0.0")     Running MPBP: iter 13 Time: 0:03:21 Δ: 0.0034664624869109595 trunc: ("SVD tolerance", "0.0")     Running MPBP: iter 14 Time: 0:03:21 Δ: 0.002279822415556687 trunc: ("SVD tolerance", "0.0")     Running MPBP: iter 15 Time: 0:03:22 Δ: 0.001844032057162881 trunc: ("SVD tolerance", "0.0")     Running MPBP: iter 16 Time: 0:03:22 Δ: 0.0011750558203060812 trunc: ("SVD tolerance", "0.0")     Running MPBP: iter 17 Time: 0:03:22 Δ: 0.0006758868013936326 trunc: ("SVD tolerance", "0.0")     Running MPBP: iter 18 Time: 0:03:22 Δ: 0.0007534624752842944 trunc: ("SVD tolerance", "0.0")     Running MPBP: iter 19 Time: 0:03:22 Δ: 0.00048648685169228045 trunc: ("SVD tolerance", "0.0")     Running MPBP: iter 20 Time: 0:03:22 Δ: 0.0001292888616923893 trunc: ("SVD tolerance", "0.0")     Running MPBP: iter 21 Time: 0:03:22 Δ: 0.00024224243956116887 trunc: ("SVD tolerance", "0.0")     Running MPBP: iter 22 Time: 0:03:23 Δ: 0.00015162459784989757 trunc: ("SVD tolerance", "0.0")     Running MPBP: iter 23 Time: 0:03:23 Δ: 8.489830052371694e-5 trunc: ("SVD tolerance", "0.0")     Running MPBP: iter 24 Time: 0:03:23 Δ: 7.575588020158897e-5 trunc: ("SVD tolerance", "0.0")     Running MPBP: iter 25 Time: 0:03:23 Δ: 5.143014305031279e-5 trunc: ("SVD tolerance", "0.0")     Running MPBP: iter 26 Time: 0:03:23 Δ: 2.7838475467500956e-5 trunc: ("SVD tolerance", "0.0")     Running MPBP: iter 27 Time: 0:03:23 Δ: 2.362249409082473e-5 trunc: ("SVD tolerance", "0.0")     Running MPBP: iter 28 Time: 0:03:23 Δ: 2.134037391621213e-5 trunc: ("SVD tolerance", "0.0")     Running MPBP: iter 29 Time: 0:03:23 Δ: 1.3485689381420585e-5 trunc: ("SVD tolerance", "0.0")     Running MPBP: iter 30 Time: 0:03:24 Δ: 5.134074807289224e-6 trunc: ("SVD tolerance", "0.0")     Running MPBP: iter 31 Time: 0:03:24 Δ: 6.79500065281502e-6 trunc: ("SVD tolerance", "0.0")     Running MPBP: iter 32 Time: 0:03:24 Δ: 4.294573034968607e-6 trunc: ("SVD tolerance", "0.0")     Running MPBP: iter 33 Time: 0:03:24 Δ: 1.8645818367080125e-6 trunc: ("SVD tolerance", "0.0")     Running MPBP: iter 34 Time: 0:03:24 Δ: 2.3964953010935375e-6 trunc: ("SVD tolerance", "0.0")     Running MPBP: iter 35 Time: 0:03:24 Δ: 1.6203037385142949e-6 trunc: ("SVD tolerance", "0.0")     Running MPBP: iter 36 Time: 0:03:24 Δ: 6.086776103142455e-7 trunc: ("SVD tolerance", "0.0")     Running MPBP: iter 37 Time: 0:03:24 Δ: 7.539254449628885e-7 trunc: ("SVD tolerance", "0.0")     Running MPBP: iter 38 Time: 0:03:25 Δ: 5.707849657365927e-7 trunc: ("SVD tolerance", "0.0")     Running MPBP: iter 39 Time: 0:03:25 Δ: 3.5424014233065293e-7 trunc: ("SVD tolerance", "0.0")     Running MPBP: iter 40 Time: 0:03:25 Δ: 2.00192384891551e-7 trunc: ("SVD tolerance", "0.0")     Running MPBP: iter 41 Time: 0:03:25 Δ: 1.8215452124437093e-7 trunc: ("SVD tolerance", "0.0")     Running MPBP: iter 42 Time: 0:03:25 Δ: 1.1360508889168841e-7 trunc: ("SVD tolerance", "0.0")     Running MPBP: iter 43 Time: 0:03:25 Δ: 6.22535716310324e-8 trunc: ("SVD tolerance", "0.0")     Running MPBP: iter 44 Time: 0:03:25 Δ: 7.169933935458062e-8 trunc: ("SVD tolerance", "0.0")     Running MPBP: iter 45 Time: 0:03:25 Δ: 4.8031765675915494e-8 trunc: ("SVD tolerance", "0.0")     Running MPBP: iter 46 Time: 0:03:26 Δ: 1.2684827854769765e-8 trunc: ("SVD tolerance", "0.0")     Running MPBP: iter 47 Time: 0:03:26 Δ: 2.266647802784405e-8 trunc: ("SVD tolerance", "0.0")     Running MPBP: iter 48 Time: 0:03:26 Δ: 1.530861171161746e-8 trunc: ("SVD tolerance", "0.0")     Running MPBP: iter 49 Time: 0:03:26 Δ: 8.66609428662457e-9 trunc: ("SVD tolerance", "0.0")     Running MPBP: iter 50 Time: 0:03:26 Δ: 6.941314634190121e-9 trunc: ("SVD tolerance", "0.0")     Running MPBP: iter 51 Time: 0:03:26 Δ: 5.082483989227171e-9 trunc: ("SVD tolerance", "0.0")     Running MPBP: iter 52 Time: 0:03:26 Δ: 2.7943996006030147e-9 trunc: ("SVD tolerance", "0.0")     Running MPBP: iter 53 Time: 0:03:27 Δ: 2.1727855070707847e-9 trunc: ("SVD tolerance", "0.0")     Running MPBP: iter 54 Time: 0:03:27 Δ: 2.0397494804313965e-9 trunc: ("SVD tolerance", "0.0")     Running MPBP: iter 55 Time: 0:03:27 Δ: 1.346623257347801e-9 trunc: ("SVD tolerance", "0.0")     Running MPBP: iter 56 Time: 0:03:27 Δ: 4.435276590442072e-10 trunc: ("SVD tolerance", "0.0")     Running MPBP: iter 57 Time: 0:03:27 Δ: 6.474165648029384e-10 trunc: ("SVD tolerance", "0.0")     Running MPBP: iter 58 Time: 0:03:27 Δ: 4.304734346760597e-10 trunc: ("SVD tolerance", "0.0")     Running MPBP: iter 59 Time: 0:03:27 Δ: 1.9154078323424528e-10 trunc: ("SVD tolerance", "0.0")     Running MPBP: iter 60 Time: 0:03:28 Δ: 2.2299584401253014e-10 trunc: ("SVD tolerance", "0.0")     Running MPBP: iter 61 Time: 0:03:28 Δ: 1.6039747308127517e-10 trunc: ("SVD tolerance", "0.0")     Running MPBP: iter 62 Time: 0:03:28 Δ: 6.222844461944987e-11 trunc: ("SVD tolerance", "0.0")     Running MPBP: iter 63 Time: 0:03:28 Δ: 7.015232839080454e-11 trunc: ("SVD tolerance", "0.0")     Running MPBP: iter 64 Time: 0:03:28 Δ: 5.519207313398056e-11 trunc: ("SVD tolerance", "0.0")     Running MPBP: iter 65 Time: 0:03:28 Δ: 3.5598413106185944e-11 trunc: ("SVD tolerance", "0.0")     Running MPBP: iter 66 Time: 0:03:28 Δ: 1.791033987785795e-11 trunc: ("SVD tolerance", "0.0")     Running MPBP: iter 67 Time: 0:03:28 Δ: 1.758815315611173e-11 trunc: ("SVD tolerance", "0.0")     Running MPBP: iter 68 Time: 0:03:29 Δ: 1.1421308343528835e-11 trunc: ("SVD tolerance", "0.0")     Running MPBP: iter 69 Time: 0:03:29 Δ: 5.556000104434133e-12 trunc: ("SVD tolerance", "0.0")     Running MPBP: iter 70 Time: 0:03:29 Δ: 6.757039372473628e-12 trunc: ("SVD tolerance", "0.0")     Running MPBP: iter 71 Time: 0:03:29 Δ: 4.773070827468473e-12 trunc: ("SVD tolerance", "0.0")     Running MPBP: iter 72 Time: 0:03:29 Δ: 1.2878587085651816e-12 trunc: ("SVD tolerance", "0.0")     Running MPBP: iter 73 Time: 0:03:29 Δ: 2.135402965564026e-12 trunc: ("SVD tolerance", "0.0")     Running MPBP: iter 74 Time: 0:03:29 Δ: 1.5210055437364645e-12 trunc: ("SVD tolerance", "0.0")     Running MPBP: iter 75 Time: 0:03:30 Δ: 8.770761894538737e-13 trunc: ("SVD tolerance", "0.0")     Running MPBP: iter 76 Time: 0:03:30 Δ: 6.405986852087153e-13 trunc: ("SVD tolerance", "0.0")     Running MPBP: iter 77 Time: 0:03:30 Δ: 4.96713781217295e-13 trunc: ("SVD tolerance", "0.0")     Running MPBP: iter 78 Time: 0:03:30 Δ: 2.793321129956894e-13 trunc: ("SVD tolerance", "0.0")     Running MPBP: iter 79 Time: 0:03:30 Δ: 2.013944566670034e-13 trunc: ("SVD tolerance", "0.0")     Running MPBP: iter 80 Time: 0:03:30 Δ: 1.9473311851925246e-13 trunc: ("SVD tolerance", "0.0")     Running MPBP: iter 81 Time: 0:03:30 Δ: 1.3589129821411916e-13 trunc: ("SVD tolerance", "0.0")     Running MPBP: iter 82 Time: 0:03:30 Δ: 3.952393967665557e-14 trunc: ("SVD tolerance", "0.0")     Running MPBP: iter 83 Time: 0:03:31 Δ: 6.150635556423367e-14 trunc: ("SVD tolerance", "0.0")     Running MPBP: iter 84 Time: 0:03:31 Δ: 4.241051954068098e-14 trunc: ("SVD tolerance", "0.0")     Running MPBP: iter 85 Time: 0:03:31 Δ: 1.9761969838327786e-14 trunc: ("SVD tolerance", "0.0")     Running MPBP: iter 86 Time: 0:03:31 Δ: 1.865174681370263e-14 trunc: ("SVD tolerance", "0.0")     Running MPBP: iter 87 Time: 0:03:31 Δ: 1.6209256159527285e-14 trunc: ("SVD tolerance", "0.0")     Running MPBP: iter 88 Time: 0:03:31 Δ: 7.993605777301127e-15 trunc: ("SVD tolerance", "0.0")     Running MPBP: iter 89 Time: 0:03:31 Δ: 5.995204332975845e-15 trunc: ("SVD tolerance", "0.0")     Running MPBP: iter 90 Time: 0:03:31 Δ: 6.661338147750939e-15 trunc: ("SVD tolerance", "0.0")     Running MPBP: iter 91 Time: 0:03:32 Δ: 3.774758283725532e-15 trunc: ("SVD tolerance", "0.0")     Running MPBP: iter 92 Time: 0:03:32 Δ: 3.3306690738754696e-15 trunc: ("SVD tolerance", "0.0")     Running MPBP: iter 93 Time: 0:03:32 Δ: 3.774758283725532e-15 trunc: ("SVD tolerance", "0.0")     Running MPBP: iter 94 Time: 0:03:32 Δ: 1.3322676295501878e-15 trunc: ("SVD tolerance", "0.0")     Running MPBP: iter 95 Time: 0:03:32 Δ: 3.1086244689504383e-15 trunc: ("SVD tolerance", "0.0")     Running MPBP: iter 96 Time: 0:03:32 Δ: 1.1102230246251565e-15 trunc: ("SVD tolerance", "0.0")     Running MPBP: iter 97 Time: 0:03:32 Δ: 1.5543122344752192e-15 trunc: ("SVD tolerance", "0.0")     Running MPBP: iter 98 Time: 0:03:32 Δ: 1.3322676295501878e-15 trunc: ("SVD tolerance", "0.0")     Running MPBP: iter 99 Time: 0:03:33 Δ: 1.7763568394002505e-15 trunc: ("SVD tolerance", "0.0")     Running MPBP: iter 100 Time: 0:03:33 Δ: 8.881784197001252e-16 trunc: ("SVD tolerance", "0.0")     Running MPBP: iter 101 Time: 0:03:43 Δ: 0.48881301730495164 trunc: ("SVD tolerance", "0.0")     Running MPBP: iter 102 Time: 0:03:44 Δ: 0.5260864054144496 trunc: ("SVD tolerance", "0.0")     Running MPBP: iter 103 Time: 0:03:44 Δ: 0.05525748603285985 trunc: ("SVD tolerance", "0.0")     Running MPBP: iter 104 Time: 0:03:45 Δ: 0.044943949630845914 trunc: ("SVD tolerance", "0.0")     Running MPBP: iter 105 Time: 0:03:46 Δ: 0.013056834336794054 trunc: ("SVD tolerance", "0.0")     Running MPBP: iter 106 Time: 0:03:46 Δ: 0.009702139975969581 trunc: ("SVD tolerance", "0.0")     Running MPBP: iter 107 Time: 0:03:47 Δ: 0.0020283160543947965 trunc: ("SVD tolerance", "0.0")     Running MPBP: iter 108 Time: 0:03:47 Δ: 0.0016775718997126265 trunc: ("SVD tolerance", "0.0")     Running MPBP: iter 109 Time: 0:03:48 Δ: 0.00039163536039721336 trunc: ("SVD tolerance", "0.0")     Running MPBP: iter 110 Time: 0:03:48 Δ: 0.000350630281132025 trunc: ("SVD tolerance", "0.0")     Running MPBP: iter 111 Time: 0:03:49 Δ: 6.882256652684937e-5 trunc: ("SVD tolerance", "0.0")     Running MPBP: iter 112 Time: 0:03:49 Δ: 6.112898798216193e-5 trunc: ("SVD tolerance", "0.0")     Running MPBP: iter 113 Time: 0:03:50 Δ: 1.2951035045061232e-5 trunc: ("SVD tolerance", "0.0")     Running MPBP: iter 114 Time: 0:03:50 Δ: 1.2519248067555111e-5 trunc: ("SVD tolerance", "0.0")     Running MPBP: iter 115 Time: 0:03:51 Δ: 2.462926455670811e-6 trunc: ("SVD tolerance", "0.0")     Running MPBP: iter 116 Time: 0:03:51 Δ: 2.2302080349145825e-6 trunc: ("SVD tolerance", "0.0")     Running MPBP: iter 117 Time: 0:03:52 Δ: 4.4618194383616583e-7 trunc: ("SVD tolerance", "0.0")     Running MPBP: iter 118 Time: 0:03:52 Δ: 4.398875883548925e-7 trunc: ("SVD tolerance", "0.0")     Running MPBP: iter 119 Time: 0:03:53 Δ: 8.51396693146711e-8 trunc: ("SVD tolerance", "0.0")     Running MPBP: iter 120 Time: 0:03:53 Δ: 7.963854509185353e-8 trunc: ("SVD tolerance", "0.0")     Running MPBP: iter 121 Time: 0:03:54 Δ: 1.5516956164418616e-8 trunc: ("SVD tolerance", "0.0")     Running MPBP: iter 122 Time: 0:03:54 Δ: 1.5274036480050768e-8 trunc: ("SVD tolerance", "0.0")     Running MPBP: iter 123 Time: 0:03:55 Δ: 2.9347495544840285e-9 trunc: ("SVD tolerance", "0.0")     Running MPBP: iter 124 Time: 0:03:56 Δ: 2.8276767594093144e-9 trunc: ("SVD tolerance", "0.0")     Running MPBP: iter 125 Time: 0:03:56 Δ: 6.112623740506251e-10 trunc: ("SVD tolerance", "0.0")     Running MPBP: iter 126 Time: 0:03:57 Δ: 5.283478099471495e-10 trunc: ("SVD tolerance", "0.0")     Running MPBP: iter 127 Time: 0:03:57 Δ: 1.2120038306306924e-10 trunc: ("SVD tolerance", "0.0")     Running MPBP: iter 128 Time: 0:03:58 Δ: 1.0002088046690005e-10 trunc: ("SVD tolerance", "0.0")     Running MPBP: iter 129 Time: 0:03:58 Δ: 2.5907942458047728e-11 trunc: ("SVD tolerance", "0.0")     Running MPBP: iter 130 Time: 0:03:59 Δ: 1.8525847522710137e-11 trunc: ("SVD tolerance", "0.0")     Running MPBP: iter 131 Time: 0:03:59 Δ: 5.189848550912757e-12 trunc: ("SVD tolerance", "0.0")     Running MPBP: iter 132 Time: 0:04:00 Δ: 3.5162983635927958e-12 trunc: ("SVD tolerance", "0.0")     Running MPBP: iter 133 Time: 0:04:00 Δ: 1.0724754417879012e-12 trunc: ("SVD tolerance", "0.0")     Running MPBP: iter 134 Time: 0:04:01 Δ: 6.532552276894421e-13 trunc: ("SVD tolerance", "0.0")     Running MPBP: iter 135 Time: 0:04:01 Δ: 2.142730437526552e-13 trunc: ("SVD tolerance", "0.0")     Running MPBP: iter 136 Time: 0:04:02 Δ: 1.2256862191861728e-13 trunc: ("SVD tolerance", "0.0")     Running MPBP: iter 137 Time: 0:04:02 Δ: 4.39648317751562e-14 trunc: ("SVD tolerance", "0.0")     Running MPBP: iter 138 Time: 0:04:03 Δ: 2.220446049250313e-14 trunc: ("SVD tolerance", "0.0")     Running MPBP: iter 139 Time: 0:04:03 Δ: 9.325873406851315e-15 trunc: ("SVD tolerance", "0.0")     Running MPBP: iter 140 Time: 0:04:04 Δ: 5.551115123125783e-15 trunc: ("SVD tolerance", "0.0")     Running MPBP: iter 141 Time: 0:04:04 Δ: 3.3306690738754696e-15 trunc: ("SVD tolerance", "0.0")     Running MPBP: iter 142 Time: 0:04:05 Δ: 2.220446049250313e-15 trunc: ("SVD tolerance", "0.0")     Running MPBP: iter 143 Time: 0:04:06 Δ: 1.7763568394002505e-15 trunc: ("SVD tolerance", "0.0")     Running MPBP: iter 144 Time: 0:04:06 Δ: 1.1102230246251565e-15 trunc: ("SVD tolerance", "0.0")     Running MPBP: iter 145 Time: 0:04:07 Δ: 2.220446049250313e-15 trunc: ("SVD tolerance", "0.0")     Running MPBP: iter 146 Time: 0:04:08 Δ: 1.3322676295501878e-15 trunc: ("SVD tolerance", "0.0")     Running MPBP: iter 147 Time: 0:04:08 Δ: 4.6629367034256575e-15 trunc: ("SVD tolerance", "0.0")     Running MPBP: iter 148 Time: 0:04:09 Δ: 4.440892098500626e-15 trunc: ("SVD tolerance", "0.0")     Running MPBP: iter 149 Time: 0:04:10 Δ: 1.9984014443252818e-15 trunc: ("SVD tolerance", "0.0")     Running MPBP: iter 150 Time: 0:04:10 Δ: 1.5543122344752192e-15 trunc: ("SVD tolerance", "0.0")     Running MPBP: iter 151 Time: 0:04:11 Δ: 2.4424906541753444e-15 trunc: ("SVD tolerance", "0.0")     Running MPBP: iter 152 Time: 0:04:11 Δ: 1.7763568394002505e-15 trunc: ("SVD tolerance", "0.0")     Running MPBP: iter 153 Time: 0:04:12 Δ: 1.3322676295501878e-15 trunc: ("SVD tolerance", "0.0")     Running MPBP: iter 154 Time: 0:04:12 Δ: 8.881784197001252e-16 trunc: ("SVD tolerance", "0.0")  Test Summary: | Pass Total Time Glauber infinite graph | 2 2 4m20.8s Running MPBP: iter 2 Time: 0:00:01 Δ: 0.37742576912571013 trunc: ("SVD tolerance", "0.0")     Running MPBP: iter 3 Time: 0:00:01 Δ: 0.04609225183478083 trunc: ("SVD tolerance", "0.0")     Running MPBP: iter 4 Time: 0:00:01 Δ: 0.004418285211023054 trunc: ("SVD tolerance", "0.0")     Running MPBP: iter 5 Time: 0:00:02 Δ: 0.00031583402928148097 trunc: ("SVD tolerance", "0.0")     Running MPBP: iter 6 Time: 0:00:02 Δ: 1.157513852323433e-5 trunc: ("SVD tolerance", "0.0")     Running MPBP: iter 7 Time: 0:00:02 Δ: 3.91236268315609e-6 trunc: ("SVD tolerance", "0.0")     Running MPBP: iter 8 Time: 0:00:02 Δ: 3.759997753149946e-7 trunc: ("SVD tolerance", "0.0")     Running MPBP: iter 9 Time: 0:00:02 Δ: 9.94778526219875e-9 trunc: ("SVD tolerance", "0.0")     Running MPBP: iter 10 Time: 0:00:02 Δ: 3.033072237812462e-9 trunc: ("SVD tolerance", "0.0")     Running MPBP: iter 11 Time: 0:00:02 Δ: 3.9728975664843347e-10 trunc: ("SVD tolerance", "0.0")     Running MPBP: iter 12 Time: 0:00:03 Δ: 1.614064437660545e-11 trunc: ("SVD tolerance", "0.0")     Running MPBP: iter 13 Time: 0:00:03 Δ: 1.9912960169676808e-12 trunc: ("SVD tolerance", "0.0")     Running MPBP: iter 14 Time: 0:00:03 Δ: 3.836930773104541e-13 trunc: ("SVD tolerance", "0.0")     Running MPBP: iter 15 Time: 0:00:03 Δ: 2.6867397195928788e-14 trunc: ("SVD tolerance", "0.0")     Running MPBP: iter 16 Time: 0:00:03 Δ: 2.886579864025407e-15 trunc: ("SVD tolerance", "0.0")     Running MPBP: iter 17 Time: 0:00:03 Δ: 4.440892098500626e-16 trunc: ("SVD tolerance", "0.0")     Running MPBP: iter 18 Time: 0:00:05 Δ: 0.4814217511863865 trunc: ("SVD tolerance", "0.0")     Running MPBP: iter 20 Time: 0:00:05 Δ: 0.045793239685444576 trunc: ("SVD tolerance", "0.0")     Running MPBP: iter 21 Time: 0:00:05 Δ: 0.004817938416089573 trunc: ("SVD tolerance", "0.0")     Running MPBP: iter 22 Time: 0:00:06 Δ: 0.0004655584267234669 trunc: ("SVD tolerance", "0.0")     Running MPBP: iter 23 Time: 0:00:06 Δ: 1.4981102886224562e-5 trunc: ("SVD tolerance", "0.0")     Running MPBP: iter 24 Time: 0:00:06 Δ: 4.1235162406838555e-6 trunc: ("SVD tolerance", "0.0")     Running MPBP: iter 25 Time: 0:00:07 Δ: 6.650030326404988e-7 trunc: ("SVD tolerance", "0.0")     Running MPBP: iter 26 Time: 0:00:07 Δ: 4.5314400676232935e-8 trunc: ("SVD tolerance", "0.0")     Running MPBP: iter 27 Time: 0:00:07 Δ: 1.9681003493587923e-9 trunc: ("SVD tolerance", "0.0")     Running MPBP: iter 28 Time: 0:00:07 Δ: 6.826261778059006e-10 trunc: ("SVD tolerance", "0.0")     Running MPBP: iter 29 Time: 0:00:08 Δ: 8.015743624412153e-11 trunc: ("SVD tolerance", "0.0")     Running MPBP: iter 30 Time: 0:00:08 Δ: 3.362199407774824e-12 trunc: ("SVD tolerance", "0.0")     Running MPBP: iter 31 Time: 0:00:08 Δ: 4.39870362356487e-13 trunc: ("SVD tolerance", "0.0")     Running MPBP: iter 32 Time: 0:00:09 Δ: 9.969802761133906e-14 trunc: ("SVD tolerance", "0.0")     Running MPBP: iter 33 Time: 0:00:09 Δ: 9.547918011776346e-15 trunc: ("SVD tolerance", "0.0")     Running MPBP: iter 34 Time: 0:00:09 Δ: 1.9984014443252818e-15 trunc: ("SVD tolerance", "0.0")     Running MPBP: iter 35 Time: 0:00:09 Δ: 2.220446049250313e-15 trunc: ("SVD tolerance", "0.0")     Running MPBP: iter 36 Time: 0:00:10 Δ: 1.5543122344752192e-15 trunc: ("SVD tolerance", "0.0")     Running MPBP: iter 37 Time: 0:00:10 Δ: 2.886579864025407e-15 trunc: ("SVD tolerance", "0.0")     Running MPBP: iter 38 Time: 0:00:10 Δ: 1.7763568394002505e-15 trunc: ("SVD tolerance", "0.0")     Running MPBP: iter 39 Time: 0:00:11 Δ: 1.3322676295501878e-15 trunc: ("SVD tolerance", "0.0")     Running MPBP: iter 40 Time: 0:00:11 Δ: 8.881784197001252e-16 trunc: ("SVD tolerance", "0.0")  Test Summary: | Pass Total Time Glauber infinite bipartite graph | 2 2 13.9s Computing joint probability 0%| | ETA: 6:35:01 Computing joint probability 100%|████████████████████████| Time: 0:00:01 Computing exact marginals 3%|▊ | ETA: 0:00:03 Computing exact marginals 38%|█████████▉ | ETA: 0:00:00 Computing exact marginals 73%|███████████████████ | ETA: 0:00:00 Computing exact marginals 100%|██████████████████████████| Time: 0:00:00 Computing exact marginals 23%|██████▏ | ETA: 0:00:00 Computing exact marginals 47%|████████████▏ | ETA: 0:00:00 Computing exact marginals 71%|██████████████████▌ | ETA: 0:00:00 Computing exact marginals 95%|████████████████████████▊ | ETA: 0:00:00 Computing exact marginals 100%|██████████████████████████| Time: 0:00:00 Computing joint probability 41%|██████████ | ETA: 0:00:00 Computing joint probability 83%|███████████████████▉ | ETA: 0:00:00 Computing joint probability 100%|████████████████████████| Time: 0:00:00 Computing exact marginals 24%|██████▎ | ETA: 0:00:00 Computing exact marginals 49%|████████████▋ | ETA: 0:00:00 Computing exact marginals 73%|██████████████████▉ | ETA: 0:00:00 Computing exact marginals 97%|█████████████████████████▏| ETA: 0:00:00 Computing exact marginals 100%|██████████████████████████| Time: 0:00:00 Test Summary: | Pass Total Time Glauber ±J small tree | 13 13 1m39.0s Computing joint probability 0%| | ETA: 1:05:43 Computing joint probability 100%|████████████████████████| Time: 0:00:00 Computing exact marginals 20%|█████▎ | ETA: 0:00:00 Computing exact marginals 100%|██████████████████████████| Time: 0:00:00 Computing exact marginals 99%|█████████████████████████▉| ETA: 0:00:00 Computing exact marginals 100%|██████████████████████████| Time: 0:00:00 Computing exact marginals 96%|████████████████████████▉ | ETA: 0:00:00 Computing exact marginals 100%|██████████████████████████| Time: 0:00:00 Computing exact pair marginals 0%| | ETA: 1:45:24 Computing exact pair marginals 2%|▍ | ETA: 0:00:26 Computing exact pair marginals 4%|▊ | ETA: 0:00:16 Computing exact pair marginals 5%|█▏ | ETA: 0:00:12 Computing exact pair marginals 7%|█▌ | ETA: 0:00:10 Computing exact pair marginals 9%|█▉ | ETA: 0:00:09 Computing exact pair marginals 11%|██▎ | ETA: 0:00:08 Computing exact pair marginals 13%|██▋ | ETA: 0:00:08 Computing exact pair marginals 15%|███ | ETA: 0:00:07 Computing exact pair marginals 16%|███▌ | ETA: 0:00:07 Computing exact pair marginals 18%|███▉ | ETA: 0:00:06 Computing exact pair marginals 20%|████▎ | ETA: 0:00:06 Computing exact pair marginals 23%|████▊ | ETA: 0:00:06 Computing exact pair marginals 25%|█████▎ | ETA: 0:00:05 Computing exact pair marginals 27%|█████▋ | ETA: 0:00:05 Computing exact pair marginals 29%|██████ | ETA: 0:00:05 Computing exact pair marginals 30%|██████▍ | ETA: 0:00:05 Computing exact pair marginals 32%|██████▊ | ETA: 0:00:05 Computing exact pair marginals 34%|███████▎ | ETA: 0:00:04 Computing exact pair marginals 36%|███████▋ | ETA: 0:00:04 Computing exact pair marginals 38%|████████ | ETA: 0:00:04 Computing exact pair marginals 40%|████████▍ | ETA: 0:00:04 Computing exact pair marginals 42%|████████▊ | ETA: 0:00:04 Computing exact pair marginals 44%|█████████▎ | ETA: 0:00:04 Computing exact pair marginals 46%|█████████▋ | ETA: 0:00:03 Computing exact pair marginals 48%|██████████ | ETA: 0:00:03 Computing exact pair marginals 50%|██████████▌ | ETA: 0:00:03 Computing exact pair marginals 52%|██████████▉ | ETA: 0:00:03 Computing exact pair marginals 54%|███████████▍ | ETA: 0:00:03 Computing exact pair marginals 56%|███████████▊ | ETA: 0:00:03 Computing exact pair marginals 58%|████████████▏ | ETA: 0:00:03 Computing exact pair marginals 60%|████████████▋ | ETA: 0:00:02 Computing exact pair marginals 62%|█████████████ | ETA: 0:00:02 Computing exact pair marginals 64%|█████████████▍ | ETA: 0:00:02 Computing exact pair marginals 66%|█████████████▉ | ETA: 0:00:02 Computing exact pair marginals 68%|██████████████▎ | ETA: 0:00:02 Computing exact pair marginals 70%|██████████████▊ | ETA: 0:00:02 Computing exact pair marginals 72%|███████████████▏ | ETA: 0:00:02 Computing exact pair marginals 74%|███████████████▌ | ETA: 0:00:02 Computing exact pair marginals 76%|███████████████▉ | ETA: 0:00:01 Computing exact pair marginals 78%|████████████████▎ | ETA: 0:00:01 Computing exact pair marginals 79%|████████████████▋ | ETA: 0:00:01 Computing exact pair marginals 81%|█████████████████ | ETA: 0:00:01 Computing exact pair marginals 83%|█████████████████▍ | ETA: 0:00:01 Computing exact pair marginals 85%|█████████████████▉ | ETA: 0:00:01 Computing exact pair marginals 87%|██████████████████▎ | ETA: 0:00:01 Computing exact pair marginals 89%|██████████████████▋ | ETA: 0:00:01 Computing exact pair marginals 91%|███████████████████ | ETA: 0:00:01 Computing exact pair marginals 92%|███████████████████▍ | ETA: 0:00:00 Computing exact pair marginals 94%|███████████████████▊ | ETA: 0:00:00 Computing exact pair marginals 96%|████████████████████▎| ETA: 0:00:00 Computing exact pair marginals 98%|████████████████████▋| ETA: 0:00:00 Computing exact pair marginals 99%|█████████████████████| ETA: 0:00:00 Computing exact pair marginals 100%|█████████████████████| Time: 0:00:05 Computing exact pair marginals 2%|▍ | ETA: 0:00:05 Computing exact pair marginals 4%|▉ | ETA: 0:00:05 Computing exact pair marginals 6%|█▎ | ETA: 0:00:05 Computing exact pair marginals 8%|█▋ | ETA: 0:00:05 Computing exact pair marginals 10%|██▏ | ETA: 0:00:05 Computing exact pair marginals 12%|██▌ | ETA: 0:00:04 Computing exact pair marginals 14%|██▉ | ETA: 0:00:04 Computing exact pair marginals 16%|███▍ | ETA: 0:00:05 Computing exact pair marginals 18%|███▊ | ETA: 0:00:04 Computing exact pair marginals 20%|████▏ | ETA: 0:00:04 Computing exact pair marginals 22%|████▋ | ETA: 0:00:04 Computing exact pair marginals 24%|█████ | ETA: 0:00:04 Computing exact pair marginals 26%|█████▌ | ETA: 0:00:04 Computing exact pair marginals 28%|█████▉ | ETA: 0:00:04 Computing exact pair marginals 30%|██████▎ | ETA: 0:00:04 Computing exact pair marginals 32%|██████▊ | ETA: 0:00:04 Computing exact pair marginals 34%|███████▏ | ETA: 0:00:03 Computing exact pair marginals 36%|███████▌ | ETA: 0:00:03 Computing exact pair marginals 37%|███████▉ | ETA: 0:00:03 Computing exact pair marginals 39%|████████▎ | ETA: 0:00:03 Computing exact pair marginals 41%|████████▋ | ETA: 0:00:03 Computing exact pair marginals 43%|█████████ | ETA: 0:00:03 Computing exact pair marginals 45%|█████████▍ | ETA: 0:00:03 Computing exact pair marginals 46%|█████████▊ | ETA: 0:00:03 Computing exact pair marginals 48%|██████████▏ | ETA: 0:00:03 Computing exact pair marginals 50%|██████████▌ | ETA: 0:00:03 Computing exact pair marginals 52%|██████████▉ | ETA: 0:00:03 Computing exact pair marginals 53%|███████████▎ | ETA: 0:00:03 Computing exact pair marginals 55%|███████████▋ | ETA: 0:00:02 Computing exact pair marginals 57%|████████████ | ETA: 0:00:02 Computing exact pair marginals 59%|████████████▍ | ETA: 0:00:02 Computing exact pair marginals 61%|████████████▊ | ETA: 0:00:02 Computing exact pair marginals 63%|█████████████▏ | ETA: 0:00:02 Computing exact pair marginals 64%|█████████████▌ | ETA: 0:00:02 Computing exact pair marginals 66%|█████████████▉ | ETA: 0:00:02 Computing exact pair marginals 68%|██████████████▎ | ETA: 0:00:02 Computing exact pair marginals 70%|██████████████▋ | ETA: 0:00:02 Computing exact pair marginals 72%|███████████████ | ETA: 0:00:02 Computing exact pair marginals 74%|███████████████▌ | ETA: 0:00:01 Computing exact pair marginals 75%|███████████████▉ | ETA: 0:00:01 Computing exact pair marginals 77%|████████████████▎ | ETA: 0:00:01 Computing exact pair marginals 79%|████████████████▋ | ETA: 0:00:01 Computing exact pair marginals 81%|█████████████████ | ETA: 0:00:01 Computing exact pair marginals 82%|█████████████████▎ | ETA: 0:00:01 Computing exact pair marginals 84%|█████████████████▋ | ETA: 0:00:01 Computing exact pair marginals 86%|██████████████████ | ETA: 0:00:01 Computing exact pair marginals 88%|██████████████████▍ | ETA: 0:00:01 Computing exact pair marginals 89%|██████████████████▊ | ETA: 0:00:01 Computing exact pair marginals 91%|███████████████████▏ | ETA: 0:00:00 Computing exact pair marginals 93%|███████████████████▌ | ETA: 0:00:00 Computing exact pair marginals 95%|███████████████████▉ | ETA: 0:00:00 Computing exact pair marginals 96%|████████████████████▎| ETA: 0:00:00 Computing exact pair marginals 98%|████████████████████▋| ETA: 0:00:00 Computing exact pair marginals 100%|█████████████████████| Time: 0:00:05 Computing exact pair marginals 2%|▍ | ETA: 0:00:06 Computing exact pair marginals 4%|▊ | ETA: 0:00:05 Computing exact pair marginals 5%|█▏ | ETA: 0:00:05 Computing exact pair marginals 7%|█▌ | ETA: 0:00:05 Computing exact pair marginals 9%|█▉ | ETA: 0:00:05 Computing exact pair marginals 11%|██▎ | ETA: 0:00:05 Computing exact pair marginals 13%|██▋ | ETA: 0:00:05 Computing exact pair marginals 14%|███ | ETA: 0:00:05 Computing exact pair marginals 16%|███▍ | ETA: 0:00:05 Computing exact pair marginals 18%|███▊ | ETA: 0:00:05 Computing exact pair marginals 20%|████▏ | ETA: 0:00:05 Computing exact pair marginals 21%|████▌ | ETA: 0:00:05 Computing exact pair marginals 23%|████▉ | ETA: 0:00:04 Computing exact pair marginals 25%|█████▎ | ETA: 0:00:04 Computing exact pair marginals 26%|█████▌ | ETA: 0:00:04 Computing exact pair marginals 28%|█████▉ | ETA: 0:00:04 Computing exact pair marginals 30%|██████▎ | ETA: 0:00:04 Computing exact pair marginals 32%|██████▋ | ETA: 0:00:04 Computing exact pair marginals 34%|███████ | ETA: 0:00:04 Computing exact pair marginals 35%|███████▍ | ETA: 0:00:04 Computing exact pair marginals 37%|███████▊ | ETA: 0:00:04 Computing exact pair marginals 39%|████████▎ | ETA: 0:00:04 Computing exact pair marginals 41%|████████▋ | ETA: 0:00:04 Computing exact pair marginals 43%|█████████ | ETA: 0:00:03 Computing exact pair marginals 45%|█████████▍ | ETA: 0:00:03 Computing exact pair marginals 47%|█████████▉ | ETA: 0:00:03 Computing exact pair marginals 49%|██████████▎ | ETA: 0:00:03 Computing exact pair marginals 50%|██████████▋ | ETA: 0:00:03 Computing exact pair marginals 52%|███████████ | ETA: 0:00:03 Computing exact pair marginals 54%|███████████▍ | ETA: 0:00:03 Computing exact pair marginals 56%|███████████▊ | ETA: 0:00:03 Computing exact pair marginals 58%|████████████▏ | ETA: 0:00:03 Computing exact pair marginals 59%|████████████▌ | ETA: 0:00:02 Computing exact pair marginals 61%|████████████▉ | ETA: 0:00:02 Computing exact pair marginals 63%|█████████████▎ | ETA: 0:00:02 Computing exact pair marginals 65%|█████████████▋ | ETA: 0:00:02 Computing exact pair marginals 66%|██████████████ | ETA: 0:00:02 Computing exact pair marginals 68%|██████████████▍ | ETA: 0:00:02 Computing exact pair marginals 70%|██████████████▊ | ETA: 0:00:02 Computing exact pair marginals 72%|███████████████▏ | ETA: 0:00:02 Computing exact pair marginals 74%|███████████████▌ | ETA: 0:00:02 Computing exact pair marginals 75%|███████████████▉ | ETA: 0:00:01 Computing exact pair marginals 77%|████████████████▎ | ETA: 0:00:01 Computing exact pair marginals 79%|████████████████▋ | ETA: 0:00:01 Computing exact pair marginals 81%|█████████████████ | ETA: 0:00:01 Computing exact pair marginals 83%|█████████████████▍ | ETA: 0:00:01 Computing exact pair marginals 84%|█████████████████▊ | ETA: 0:00:01 Computing exact pair marginals 86%|██████████████████▏ | ETA: 0:00:01 Computing exact pair marginals 88%|██████████████████▌ | ETA: 0:00:01 Computing exact pair marginals 90%|██████████████████▉ | ETA: 0:00:01 Computing exact pair marginals 91%|███████████████████▎ | ETA: 0:00:01 Computing exact pair marginals 93%|███████████████████▋ | ETA: 0:00:00 Computing exact pair marginals 95%|███████████████████▉ | ETA: 0:00:00 Computing exact pair marginals 97%|████████████████████▎| ETA: 0:00:00 Computing exact pair marginals 98%|████████████████████▋| ETA: 0:00:00 Computing exact pair marginals 100%|█████████████████████| Time: 0:00:05 Computing exact marginals 86%|██████████████████████▍ | ETA: 0:00:00 Computing exact marginals 100%|██████████████████████████| Time: 0:00:00 Computing exact marginals 78%|████████████████████▍ | ETA: 0:00:00 Computing exact marginals 100%|██████████████████████████| Time: 0:00:00 Computing joint probability 95%|██████████████████████▊ | ETA: 0:00:00 Computing joint probability 100%|████████████████████████| Time: 0:00:00 Computing exact marginals 31%|███████▉ | ETA: 0:00:00 Computing exact marginals 100%|██████████████████████████| Time: 0:00:00 Computing exact pair marginals 2%|▍ | ETA: 0:00:05 Computing exact pair marginals 4%|▉ | ETA: 0:00:05 Computing exact pair marginals 6%|█▎ | ETA: 0:00:05 Computing exact pair marginals 8%|█▊ | ETA: 0:00:05 Computing exact pair marginals 10%|██▏ | ETA: 0:00:05 Computing exact pair marginals 12%|██▌ | ETA: 0:00:05 Computing exact pair marginals 14%|██▉ | ETA: 0:00:05 Computing exact pair marginals 16%|███▎ | ETA: 0:00:04 Computing exact pair marginals 17%|███▋ | ETA: 0:00:04 Computing exact pair marginals 19%|████ | ETA: 0:00:04 Computing exact pair marginals 21%|████▌ | ETA: 0:00:04 Computing exact pair marginals 23%|████▉ | ETA: 0:00:04 Computing exact pair marginals 25%|█████▎ | ETA: 0:00:04 Computing exact pair marginals 27%|█████▊ | ETA: 0:00:04 Computing exact pair marginals 29%|██████▏ | ETA: 0:00:04 Computing exact pair marginals 31%|██████▌ | ETA: 0:00:04 Computing exact pair marginals 33%|███████ | ETA: 0:00:04 Computing exact pair marginals 35%|███████▍ | ETA: 0:00:03 Computing exact pair marginals 37%|███████▊ | ETA: 0:00:03 Computing exact pair marginals 39%|████████▎ | ETA: 0:00:03 Computing exact pair marginals 41%|████████▋ | ETA: 0:00:03 Computing exact pair marginals 43%|█████████ | ETA: 0:00:03 Computing exact pair marginals 45%|█████████▍ | ETA: 0:00:03 Computing exact pair marginals 47%|█████████▉ | ETA: 0:00:03 Computing exact pair marginals 49%|██████████▎ | ETA: 0:00:03 Computing exact pair marginals 51%|██████████▋ | ETA: 0:00:03 Computing exact pair marginals 53%|███████████ | ETA: 0:00:03 Computing exact pair marginals 55%|███████████▌ | ETA: 0:00:02 Computing exact pair marginals 57%|███████████▉ | ETA: 0:00:02 Computing exact pair marginals 59%|████████████▎ | ETA: 0:00:02 Computing exact pair marginals 61%|████████████▊ | ETA: 0:00:02 Computing exact pair marginals 63%|█████████████▏ | ETA: 0:00:02 Computing exact pair marginals 65%|█████████████▋ | ETA: 0:00:02 Computing exact pair marginals 67%|██████████████ | ETA: 0:00:02 Computing exact pair marginals 69%|██████████████▍ | ETA: 0:00:02 Computing exact pair marginals 71%|██████████████▉ | ETA: 0:00:02 Computing exact pair marginals 73%|███████████████▎ | ETA: 0:00:01 Computing exact pair marginals 75%|███████████████▊ | ETA: 0:00:01 Computing exact pair marginals 77%|████████████████▏ | ETA: 0:00:01 Computing exact pair marginals 79%|████████████████▋ | ETA: 0:00:01 Computing exact pair marginals 81%|█████████████████ | ETA: 0:00:01 Computing exact pair marginals 83%|█████████████████▍ | ETA: 0:00:01 Computing exact pair marginals 85%|█████████████████▉ | ETA: 0:00:01 Computing exact pair marginals 87%|██████████████████▎ | ETA: 0:00:01 Computing exact pair marginals 89%|██████████████████▊ | ETA: 0:00:01 Computing exact pair marginals 91%|███████████████████▏ | ETA: 0:00:00 Computing exact pair marginals 93%|███████████████████▌ | ETA: 0:00:00 Computing exact pair marginals 95%|███████████████████▉ | ETA: 0:00:00 Computing exact pair marginals 96%|████████████████████▎| ETA: 0:00:00 Computing exact pair marginals 98%|████████████████████▋| ETA: 0:00:00 Computing exact pair marginals 100%|█████████████████████| Time: 0:00:05 Computing joint probability 99%|███████████████████████▊| ETA: 0:00:00 Computing joint probability 100%|████████████████████████| Time: 0:00:00 Computing exact pair marginals 2%|▍ | ETA: 0:00:08 Computing exact pair marginals 4%|▊ | ETA: 0:00:07 Computing exact pair marginals 5%|█▏ | ETA: 0:00:06 Computing exact pair marginals 7%|█▌ | ETA: 0:00:06 Computing exact pair marginals 9%|█▉ | ETA: 0:00:06 Computing exact pair marginals 11%|██▎ | ETA: 0:00:05 Computing exact pair marginals 13%|██▋ | ETA: 0:00:05 Computing exact pair marginals 14%|███ | ETA: 0:00:05 Computing exact pair marginals 16%|███▍ | ETA: 0:00:05 Computing exact pair marginals 18%|███▉ | ETA: 0:00:05 Computing exact pair marginals 20%|████▎ | ETA: 0:00:05 Computing exact pair marginals 22%|████▋ | ETA: 0:00:05 Computing exact pair marginals 24%|█████ | ETA: 0:00:04 Computing exact pair marginals 25%|█████▍ | ETA: 0:00:04 Computing exact pair marginals 27%|█████▊ | ETA: 0:00:04 Computing exact pair marginals 29%|██████▏ | ETA: 0:00:04 Computing exact pair marginals 31%|██████▌ | ETA: 0:00:04 Computing exact pair marginals 33%|██████▉ | ETA: 0:00:04 Computing exact pair marginals 35%|███████▎ | ETA: 0:00:04 Computing exact pair marginals 37%|███████▋ | ETA: 0:00:04 Computing exact pair marginals 39%|████████▏ | ETA: 0:00:04 Computing exact pair marginals 41%|████████▌ | ETA: 0:00:03 Computing exact pair marginals 42%|████████▉ | ETA: 0:00:03 Computing exact pair marginals 44%|█████████▍ | ETA: 0:00:03 Computing exact pair marginals 46%|█████████▊ | ETA: 0:00:03 Computing exact pair marginals 48%|██████████▏ | ETA: 0:00:03 Computing exact pair marginals 50%|██████████▌ | ETA: 0:00:03 Computing exact pair marginals 52%|███████████ | ETA: 0:00:03 Computing exact pair marginals 54%|███████████▍ | ETA: 0:00:03 Computing exact pair marginals 56%|███████████▊ | ETA: 0:00:02 Computing exact pair marginals 58%|████████████▎ | ETA: 0:00:02 Computing exact pair marginals 60%|████████████▋ | ETA: 0:00:02 Computing exact pair marginals 62%|█████████████ | ETA: 0:00:02 Computing exact pair marginals 64%|█████████████▍ | ETA: 0:00:02 Computing exact pair marginals 66%|█████████████▉ | ETA: 0:00:02 Computing exact pair marginals 68%|██████████████▎ | ETA: 0:00:02 Computing exact pair marginals 70%|██████████████▋ | ETA: 0:00:02 Computing exact pair marginals 72%|███████████████ | ETA: 0:00:02 Computing exact pair marginals 74%|███████████████▌ | ETA: 0:00:01 Computing exact pair marginals 76%|███████████████▉ | ETA: 0:00:01 Computing exact pair marginals 78%|████████████████▎ | ETA: 0:00:01 Computing exact pair marginals 80%|████████████████▊ | ETA: 0:00:01 Computing exact pair marginals 82%|█████████████████▏ | ETA: 0:00:01 Computing exact pair marginals 84%|█████████████████▌ | ETA: 0:00:01 Computing exact pair marginals 86%|██████████████████ | ETA: 0:00:01 Computing exact pair marginals 88%|██████████████████▍ | ETA: 0:00:01 Computing exact pair marginals 90%|██████████████████▊ | ETA: 0:00:01 Computing exact pair marginals 91%|███████████████████▎ | ETA: 0:00:00 Computing exact pair marginals 93%|███████████████████▋ | ETA: 0:00:00 Computing exact pair marginals 95%|████████████████████ | ETA: 0:00:00 Computing exact pair marginals 97%|████████████████████▍| ETA: 0:00:00 Computing exact pair marginals 99%|████████████████████▉| ETA: 0:00:00 Computing exact pair marginals 100%|█████████████████████| Time: 0:00:05 Computing exact marginals 94%|████████████████████████▌ | ETA: 0:00:00 Computing exact marginals 100%|██████████████████████████| Time: 0:00:00 Computing exact marginals 92%|████████████████████████ | ETA: 0:00:00 Computing exact marginals 100%|██████████████████████████| Time: 0:00:00 Computing exact marginals 90%|███████████████████████▎ | ETA: 0:00:00 Computing exact marginals 100%|██████████████████████████| Time: 0:00:00 Test Summary: | Pass Total Time Glauber small tree | 20 20 1m38.5s Computing joint probability 0%|▏ | ETA: 0:00:43 Computing joint probability 100%|████████████████████████| Time: 0:00:00 WARNING: Method definition f(Any, Any) in module Main at /home/pkgeval/.julia/packages/MatrixProductBP/Hhmig/test/glauber_small_tree.jl:213 overwritten at /home/pkgeval/.julia/packages/MatrixProductBP/Hhmig/test/glauber_small_tree.jl:267. Glauber small tree - stationary: Error During Test at /home/pkgeval/.julia/packages/MatrixProductBP/Hhmig/test/glauber_small_tree.jl:320 Got exception outside of a @test DimensionMismatch: subdiagonal has wrong length. Has length 1, but should be 0. Stacktrace: [1] LinearAlgebra.SymTridiagonal{Float64, Vector{Float64}}(dv::Vector{Float64}, ev::Vector{Float64}) @ LinearAlgebra /opt/julia/share/julia/stdlib/v1.14/LinearAlgebra/src/tridiag.jl:12 [inlined] [2] (LinearAlgebra.SymTridiagonal{Float64, V} where V<:AbstractVector{Float64})(dv::Vector{Float64}, ev::Vector{Float64}) @ LinearAlgebra /opt/julia/share/julia/stdlib/v1.14/LinearAlgebra/src/tridiag.jl:71 [inlined] [3] LinearAlgebra.SymTridiagonal(dv::Vector{Float64}, ev::Vector{Float64}) @ LinearAlgebra /opt/julia/share/julia/stdlib/v1.14/LinearAlgebra/src/tridiag.jl:70 [inlined] [4] rayleighquotient(F::KrylovKit.LanczosFactorization{Vector{Float64}, Float64}) @ KrylovKit ~/.julia/packages/KrylovKit/xccMN/src/factorizations/lanczos.jl:54 [inlined] [5] eigsolve(A::Matrix{Float64}, x₀::Vector{Float64}, howmany::Int64, which::Symbol, alg::KrylovKit.Lanczos{KrylovKit.ModifiedGramSchmidt2, Float64}; alg_rrule::KrylovKit.Arnoldi{KrylovKit.ModifiedGramSchmidt2, Float64}) @ KrylovKit ~/.julia/packages/KrylovKit/xccMN/src/eigsolve/lanczos.jl:43 [6] eigsolve(f::Matrix{Float64}, x₀::Vector{Float64}, howmany::Int64, which::Symbol; kwargs::@Kwargs{}) @ KrylovKit ~/.julia/packages/KrylovKit/xccMN/src/eigsolve/eigsolve.jl:219 [inlined] [7] eigsolve(f::Matrix{Float64}, x₀::Vector{Float64}, howmany::Int64, which::Symbol) @ KrylovKit ~/.julia/packages/KrylovKit/xccMN/src/eigsolve/eigsolve.jl:193 [inlined] [8] eigsolve(A::Matrix{Float64}, howmany::Int64, which::Symbol, T::Type{Float64}; kwargs::@Kwargs{}) @ KrylovKit ~/.julia/packages/KrylovKit/xccMN/src/eigsolve/eigsolve.jl:186 [inlined] [9] eigsolve(A::Matrix{Float64}, howmany::Int64, which::Symbol, T::Type{Float64}) @ KrylovKit ~/.julia/packages/KrylovKit/xccMN/src/eigsolve/eigsolve.jl:180 [inlined] [10] _eigen(A::InfiniteUniformTensorTrain{Float64, 3}; B::Matrix{Float64}) @ TensorTrains ~/.julia/packages/TensorTrains/x1nwu/src/UniformTensorTrains/uniform_tensor_train.jl:191 [11] marginals(A::InfiniteUniformTensorTrain{Float64, 3}; B::Matrix{Float64}) @ TensorTrains ~/.julia/packages/TensorTrains/x1nwu/src/UniformTensorTrains/uniform_tensor_train.jl:226 [12] marginals(A::InfiniteUniformTensorTrain{Float64, 3}) @ TensorTrains ~/.julia/packages/TensorTrains/x1nwu/src/UniformTensorTrains/uniform_tensor_train.jl:225 [inlined] [13] (::MatrixProductBP.var"#500#501"{MatrixProductBP.var"#520#521", MPBP{IndexedBiDiGraph{Int64}, Float64, Vector{HomogeneousGlauberFactor{Float64}}, InfiniteUniformTensorTrain{Float64, 4}, InfiniteUniformTensorTrain{Float64, 3}}})(i::Int64) @ MatrixProductBP ~/.julia/packages/MatrixProductBP/Hhmig/src/stationary.jl:205 [14] iterate(::Base.Generator{UnitRange{Int64}, MatrixProductBP.var"#500#501"{MatrixProductBP.var"#520#521", MPBP{IndexedBiDiGraph{Int64}, Float64, Vector{HomogeneousGlauberFactor{Float64}}, InfiniteUniformTensorTrain{Float64, 4}, InfiniteUniformTensorTrain{Float64, 3}}}}) @ Base generator.jl:48 [inlined] [15] _collect(c::UnitRange{Int64}, itr::Base.Generator{UnitRange{Int64}, MatrixProductBP.var"#500#501"{MatrixProductBP.var"#520#521", MPBP{IndexedBiDiGraph{Int64}, Float64, Vector{HomogeneousGlauberFactor{Float64}}, InfiniteUniformTensorTrain{Float64, 4}, InfiniteUniformTensorTrain{Float64, 3}}}}, ::Base.EltypeUnknown, isz::Base.HasShape{1}) @ Base array.jl:853 [16] collect_similar(cont::UnitRange{Int64}, itr::Base.Generator{UnitRange{Int64}, MatrixProductBP.var"#500#501"{MatrixProductBP.var"#520#521", MPBP{IndexedBiDiGraph{Int64}, Float64, Vector{HomogeneousGlauberFactor{Float64}}, InfiniteUniformTensorTrain{Float64, 4}, InfiniteUniformTensorTrain{Float64, 3}}}}) @ Base array.jl:768 [17] map(f::MatrixProductBP.var"#500#501"{MatrixProductBP.var"#520#521", MPBP{IndexedBiDiGraph{Int64}, Float64, Vector{HomogeneousGlauberFactor{Float64}}, InfiniteUniformTensorTrain{Float64, 4}, InfiniteUniformTensorTrain{Float64, 3}}}, A::UnitRange{Int64}) @ Base abstractarray.jl:3468 [inlined] [18] means(f::MatrixProductBP.var"#520#521", bp::MPBP{IndexedBiDiGraph{Int64}, Float64, Vector{HomogeneousGlauberFactor{Float64}}, InfiniteUniformTensorTrain{Float64, 4}, InfiniteUniformTensorTrain{Float64, 3}}; sites::UnitRange{Int64}) @ MatrixProductBP ~/.julia/packages/MatrixProductBP/Hhmig/src/stationary.jl:204 [inlined] [19] means(f::MatrixProductBP.var"#520#521", bp::MPBP{IndexedBiDiGraph{Int64}, Float64, Vector{HomogeneousGlauberFactor{Float64}}, InfiniteUniformTensorTrain{Float64, 4}, InfiniteUniformTensorTrain{Float64, 3}}) @ MatrixProductBP ~/.julia/packages/MatrixProductBP/Hhmig/src/stationary.jl:203 [inlined] [20] CB_BPVUMPS(bp::MPBP{IndexedBiDiGraph{Int64}, Float64, Vector{HomogeneousGlauberFactor{Float64}}, InfiniteUniformTensorTrain{Float64, 4}, InfiniteUniformTensorTrain{Float64, 3}}; showprogress::Bool, f::MatrixProductBP.var"#520#521", info::String) @ MatrixProductBP ~/.julia/packages/MatrixProductBP/Hhmig/src/stationary.jl:273 [21] CB_BPVUMPS(bp::MPBP{IndexedBiDiGraph{Int64}, Float64, Vector{HomogeneousGlauberFactor{Float64}}, InfiniteUniformTensorTrain{Float64, 4}, InfiniteUniformTensorTrain{Float64, 3}}) @ MatrixProductBP ~/.julia/packages/MatrixProductBP/Hhmig/src/stationary.jl:268 [22] top-level scope @ ~/.julia/packages/MatrixProductBP/Hhmig/test/glauber_small_tree.jl:175 [23] macro expansion @ /opt/julia/share/julia/stdlib/v1.14/Test/src/Test.jl:2246 [inlined] [24] macro expansion @ ~/.julia/packages/MatrixProductBP/Hhmig/test/glauber_small_tree.jl:321 [inlined] [25] macro expansion @ /opt/julia/share/julia/stdlib/v1.14/Test/src/Test.jl:2246 [inlined] [26] macro expansion @ ~/.julia/packages/MatrixProductBP/Hhmig/test/glauber_small_tree.jl:338 [inlined] [27] include(mapexpr::Function, mod::Module, _path::String) @ Base Base.jl:327 [28] top-level scope @ ~/.julia/packages/MatrixProductBP/Hhmig/test/runtests.jl:15 [29] include(mapexpr::Function, mod::Module, _path::String) @ Base Base.jl:327 [30] top-level scope @ none:6 [31] eval(m::Module, e::Any) @ Core boot.jl:517 [32] exec_options(opts::Base.JLOptions) @ Base client.jl:321 [33] _start() @ Base client.jl:596 Test Summary: | Pass Error Total Time IntegerGlauber small tree | 16 1 17 1m31.8s Observables | 5 5 0.0s Glauber small tree integer - observe everything | 1 1 0.0s Glauber small tree - DampedFactor | 4 4 0.0s Glauber small tree - GenericFactor | 5 5 0.0s Glauber small tree - stationary | 1 1 2 42.5s RNG of the outermost testset: Xoshiro(0xbc29494b01f0cf6f, 0xe13a5459a3d24c66, 0xc1cff3b6a7b96140, 0x46ba4975a224d805, 0x18000b20a3088304) ERROR: LoadError: Some tests did not pass: 16 passed, 0 failed, 1 errored, 0 broken. in expression starting at /home/pkgeval/.julia/packages/MatrixProductBP/Hhmig/test/glauber_small_tree.jl:174 in expression starting at /home/pkgeval/.julia/packages/MatrixProductBP/Hhmig/test/runtests.jl:15 Testing failed after 882.77s ERROR: LoadError: Package MatrixProductBP errored during testing Stacktrace: [1] pkgerror(msg::String) @ Pkg.Types /opt/julia/share/julia/stdlib/v1.14/Pkg/src/Types.jl:68 [2] test(ctx::Pkg.Types.Context, pkgs::Vector{PackageSpec}; coverage::Bool, julia_args::Cmd, test_args::Cmd, test_fn::Nothing, force_latest_compatible_version::Bool, allow_earlier_backwards_compatible_versions::Bool, allow_reresolve::Bool) @ Pkg.Operations /opt/julia/share/julia/stdlib/v1.14/Pkg/src/Operations.jl:3247 [3] test(ctx::Pkg.Types.Context, pkgs::Vector{PackageSpec}; coverage::Bool, test_fn::Nothing, julia_args::Cmd, test_args::Cmd, force_latest_compatible_version::Bool, allow_earlier_backwards_compatible_versions::Bool, allow_reresolve::Bool, kwargs::@Kwargs{io::IOContext{IO}}) @ Pkg.API /opt/julia/share/julia/stdlib/v1.14/Pkg/src/API.jl:587 [4] test(pkgs::Vector{PackageSpec}; io::IOContext{IO}, kwargs::@Kwargs{julia_args::Cmd}) @ Pkg.API /opt/julia/share/julia/stdlib/v1.14/Pkg/src/API.jl:172 [5] test(pkgs::Vector{String}; kwargs::@Kwargs{julia_args::Cmd}) @ Pkg.API /opt/julia/share/julia/stdlib/v1.14/Pkg/src/API.jl:160 [6] test(pkg::String; kwargs::@Kwargs{julia_args::Cmd}) @ Pkg.API /opt/julia/share/julia/stdlib/v1.14/Pkg/src/API.jl:159 [inlined] [7] top-level scope @ /PkgEval.jl/scripts/evaluate.jl:223 [8] include(mod::Module, _path::String) @ Base Base.jl:326 [9] exec_options(opts::Base.JLOptions) @ Base client.jl:355 [10] _start() @ Base client.jl:596 in expression starting at /PkgEval.jl/scripts/evaluate.jl:214 PkgEval failed after 1051.6s: package tests unexpectedly errored