Package evaluation to test QuasiNewtonMethods on Julia 1.14.0-DEV.2265 (73323c5146*) started at 2026-05-31T17:59:53.309 ################################################################################ # Set-up # Installing PkgEval dependencies (TestEnv)... Activating project at `~/.julia/environments/v1.14` Set-up completed after 16.0s ################################################################################ # Installation # Installing QuasiNewtonMethods... Resolving package versions... Updating `~/.julia/environments/v1.14/Project.toml` [64452400] + QuasiNewtonMethods v0.1.4 Updating `~/.julia/environments/v1.14/Manifest.toml` [79e6a3ab] + Adapt v4.6.0 [4fba245c] + ArrayInterface v7.25.0 [62783981] + BitTwiddlingConvenienceFunctions v0.1.6 ⌃ [2a0fbf3d] + CPUSummary v0.2.6 [fb6a15b2] + CloseOpenIntervals v0.1.13 [34da2185] + Compat v4.18.1 [adafc99b] + CpuId v0.3.1 [ffbed154] + DocStringExtensions v0.9.5 [3e5b6fbb] + HostCPUFeatures v0.1.18 [615f187c] + IfElse v0.1.1 [10f19ff3] + LayoutPointers v0.1.17 [bdcacae8] + LoopVectorization v0.12.174 [d125e4d3] + ManualMemory v0.1.8 [6fe1bfb0] + OffsetArrays v1.17.0 [1d0040c9] + PolyesterWeave v0.2.2 [aea7be01] + PrecompileTools v1.3.4 [21216c6a] + Preferences v1.5.2 [64452400] + QuasiNewtonMethods v0.1.4 [94e857df] + SIMDTypes v0.1.0 [476501e8] + SLEEFPirates v0.6.46 [431bcebd] + SciMLPublic v1.0.1 ⌅ [aedffcd0] + Static v0.8.10 [0d7ed370] + StaticArrayInterface v1.10.0 ⌅ [7792a7ef] + StrideArraysCore v0.4.17 [8290d209] + ThreadingUtilities v0.5.6 [3a884ed6] + UnPack v1.0.2 [3d5dd08c] + VectorizationBase v0.21.74 [56f22d72] + Artifacts v1.11.0 [2a0f44e3] + Base64 v1.11.0 [ade2ca70] + Dates v1.11.0 [ac6e5ff7] + JuliaSyntaxHighlighting v1.13.0 [8f399da3] + Libdl v1.11.0 [37e2e46d] + LinearAlgebra v1.14.0 [d6f4376e] + Markdown v1.11.0 [de0858da] + Printf v1.11.0 [9a3f8284] + Random v1.11.0 [ea8e919c] + SHA v1.13.0 [f489334b] + StyledStrings v1.13.0 [fa267f1f] + TOML v1.0.3 [cf7118a7] + UUIDs v1.11.0 [4ec0a83e] + Unicode v1.11.0 [e66e0078] + CompilerSupportLibraries_jll v1.5.2+0 [4536629a] + OpenBLAS_jll v0.3.33+0 [8e850b90] + libblastrampoline_jll v5.15.0+0 Info Packages marked with ⌃ and ⌅ have new versions available. Those with ⌃ may be upgradable, but those with ⌅ are restricted by compatibility constraints from upgrading. To see why use `status --outdated -m` Installation completed after 4.43s ################################################################################ # Precompilation # Precompiling PkgEval dependencies... Precompiling package dependencies... Precompiling project... 5.7 s ✓ StaticArrayInterface 1.2 s ✓ StaticArrayInterface → StaticArrayInterfaceOffsetArraysExt 1.5 s ✓ LayoutPointers 1.2 s ✓ CloseOpenIntervals 19.3 s ✓ VectorizationBase 2.2 s ✓ StrideArraysCore 3.6 s ✓ SLEEFPirates 4.1 s ✓ VectorizedRNG 42.6 s ✓ LoopVectorization 5.2 s ✓ VectorizedRNG → VectorizedRNGStaticArraysExt 44.5 s ✓ VectorizedStatistics 13.6 s ✓ QuasiNewtonMethods 14.5 s ✓ Octavian 16.0 s ✓ StrideArrays 14 dependencies successfully precompiled in 175 seconds. 56 already precompiled. Precompilation completed after 200.0s ################################################################################ # Testing # Testing QuasiNewtonMethods Status `/tmp/jl_w6F2vj/Project.toml` [4c88cf16] Aqua v0.8.14 [64452400] QuasiNewtonMethods v0.1.4 [d1fa6d79] StrideArrays v0.1.29 [8dfed614] Test v1.11.0 Status `/tmp/jl_w6F2vj/Manifest.toml` [79e6a3ab] Adapt v4.6.0 [4c88cf16] Aqua v0.8.14 [4fba245c] ArrayInterface v7.25.0 [62783981] BitTwiddlingConvenienceFunctions v0.1.6 ⌃ [2a0fbf3d] CPUSummary v0.2.6 [fb6a15b2] CloseOpenIntervals v0.1.13 [34da2185] Compat v4.18.1 [adafc99b] CpuId v0.3.1 [ffbed154] DocStringExtensions v0.9.5 [3e5b6fbb] HostCPUFeatures v0.1.18 [615f187c] IfElse v0.1.1 [10f19ff3] LayoutPointers v0.1.17 [bdcacae8] LoopVectorization v0.12.174 [d125e4d3] ManualMemory v0.1.8 [6fd5a793] Octavian v0.3.29 [6fe1bfb0] OffsetArrays v1.17.0 [1d0040c9] PolyesterWeave v0.2.2 [aea7be01] PrecompileTools v1.3.4 [21216c6a] Preferences v1.5.2 [64452400] QuasiNewtonMethods v0.1.4 [94e857df] SIMDTypes v0.1.0 [476501e8] SLEEFPirates v0.6.46 [431bcebd] SciMLPublic v1.0.1 ⌅ [aedffcd0] Static v0.8.10 [0d7ed370] StaticArrayInterface v1.10.0 [1e83bf80] StaticArraysCore v1.4.4 [10745b16] Statistics v1.11.1 [d1fa6d79] StrideArrays v0.1.29 ⌅ [7792a7ef] StrideArraysCore v0.4.17 [8290d209] ThreadingUtilities v0.5.6 [3a884ed6] UnPack v1.0.2 [3d5dd08c] VectorizationBase v0.21.74 [33b4df10] VectorizedRNG v0.2.26 [3b853605] VectorizedStatistics v0.5.11 [0dad84c5] ArgTools v1.1.2 [56f22d72] Artifacts v1.11.0 [2a0f44e3] Base64 v1.11.0 [ade2ca70] Dates v1.11.0 [8ba89e20] Distributed v1.11.0 [f43a241f] Downloads v1.7.0 [7b1f6079] FileWatching v1.11.0 [b77e0a4c] InteractiveUtils v1.11.0 [ac6e5ff7] JuliaSyntaxHighlighting v1.13.0 [b27032c2] LibCURL v1.0.0 [76f85450] LibGit2 v1.11.0 [8f399da3] Libdl v1.11.0 [37e2e46d] LinearAlgebra v1.14.0 [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 [f489334b] StyledStrings v1.13.0 [fa267f1f] TOML v1.0.3 [a4e569a6] Tar v1.10.0 [8dfed614] Test v1.11.0 [cf7118a7] UUIDs v1.11.0 [4ec0a83e] Unicode v1.11.0 [e66e0078] CompilerSupportLibraries_jll v1.5.2+0 [deac9b47] LibCURL_jll v8.20.0+1 [e37daf67] LibGit2_jll v1.9.3+0 [29816b5a] LibSSH2_jll v1.11.101+0 [14a3606d] MozillaCACerts_jll v2026.5.14 [4536629a] OpenBLAS_jll v0.3.33+0 [458c3c95] OpenSSL_jll v3.5.6+0 [efcefdf7] PCRE2_jll v10.47.0+0 [83775a58] Zlib_jll v1.3.2+0 [3161d3a3] Zstd_jll v1.5.7+1 [8e850b90] libblastrampoline_jll v5.15.0+0 [8e850ede] nghttp2_jll v1.69.0+0 [3f19e933] p7zip_jll v17.8.0+0 Info Packages marked with ⌃ and ⌅ have new versions available. Those with ⌃ may be upgradable, but those with ⌅ are restricted by compatibility constraints from upgrading. Testing Running tests... WARNING: Method definition boundscheck() in module StrideArraysCore at /home/pkgeval/.julia/packages/StrideArraysCore/COJRJ/src/ptr_array.jl:897 overwritten at /home/pkgeval/.julia/packages/StrideArraysCore/COJRJ/src/StrideArraysCore.jl:75. Base.PkgId(Base.UUID("64452400-c6f4-4a1d-a4f6-ad403655768a"), "QuasiNewtonMethods") does not declare a compat entry for the following extras: 1-element Vector{Base.PkgId}: Test [8dfed614-e22c-5e08-85e1-65c5234f0b40] Base.PkgId(Base.UUID("64452400-c6f4-4a1d-a4f6-ad403655768a"), "QuasiNewtonMethods") extras: Test Failed at /home/pkgeval/.julia/packages/Aqua/MCcFg/src/deps_compat.jl:60 Expression: isempty(result) Evaluated: isempty(Base.PkgId[Base.PkgId(Base.UUID("8dfed614-e22c-5e08-85e1-65c5234f0b40"), "Test")]) Stacktrace: [1] macro expansion @ /opt/julia/share/julia/stdlib/v1.14/Test/src/Test.jl:784 [inlined] [2] test_deps_compat(pkg::Base.PkgId, deps_type::String; broken::Bool, kwargs::@Kwargs{}) @ Aqua ~/.julia/packages/Aqua/MCcFg/src/deps_compat.jl:60 [3] test_deps_compat @ ~/.julia/packages/Aqua/MCcFg/src/deps_compat.jl:55 [inlined] [4] macro expansion @ ~/.julia/packages/Aqua/MCcFg/src/deps_compat.jl:45 [inlined] [5] get_testset_depth() @ Test /opt/julia/share/julia/stdlib/v1.14/Test/src/Test.jl:2246 [inlined] [6] test_deps_compat(pkg::Base.PkgId; check_julia::Bool, check_extras::Bool, check_weakdeps::Bool, kwargs::@Kwargs{}) @ Aqua ~/.julia/packages/Aqua/MCcFg/src/deps_compat.jl:45 n = 2 QuasiNewtonMethods.optimum(state) .- 1 = [-2.699940271355672e-11, -3.2893576751291675e-11] QuasiNewtonMethods.optimum(state) .- 1 = [6.89268642162233e-11, 1.5940648800949475e-10] n = 3 QuasiNewtonMethods.optimum(state) .- 1 = [2.8983482280864337e-12, 6.282752096353761e-12, 7.835954107804355e-13] QuasiNewtonMethods.optimum(state) .- 1 = [-7.000611201846141e-11, -1.5657963814419418e-10, 4.5468295795103586e-11] n = 4 QuasiNewtonMethods.optimum(state) .- 1 = [3.074329679719767e-10, -7.377078947712334e-10, 6.344276215486389e-10, -1.4697238981398186e-9] QuasiNewtonMethods.optimum(state) .- 1 = [1.9757528946229286e-12, -3.2275293548877926e-12, 3.93840515755528e-12, -6.5888405842429165e-12] n = 5 QuasiNewtonMethods.optimum(state) .- 1 = [4.461542246758654e-12, -2.038080815225385e-11, 9.483080987138237e-12, -3.81377152081086e-11, -3.479949661766568e-11] QuasiNewtonMethods.optimum(state) .- 1 = [-1.0780931702925045e-11, 2.4402924125865866e-11, -2.0585533277994728e-11, 5.491251897637994e-11, 3.08317815722603e-11] n = 6 QuasiNewtonMethods.optimum(state) .- 1 = [-5.798361790709805e-12, 2.407962718109502e-11, 2.7547297776209234e-11, -1.263689153319092e-11, 4.23636681290418e-11, 5.583800088970747e-11] QuasiNewtonMethods.optimum(state) .- 1 = [9.643641440959527e-11, -1.331257326597779e-11, -9.648060128597535e-12, 1.9925461280934087e-10, -2.8671065521734818e-11, -1.5293877275723844e-11] n = 7 QuasiNewtonMethods.optimum(state) .- 1 = [-2.4944379894975555e-11, -3.2600588895093097e-12, -1.6621337639577405e-10, -5.7208349169002304e-11, -1.984112873998356e-11, -3.165551154538093e-10, -2.6050261947574427e-10] QuasiNewtonMethods.optimum(state) .- 1 = [-9.829914660031136e-13, 4.786393503763975e-12, -1.5355272608985615e-11, -3.956279748251745e-12, 1.4116041668899015e-11, -3.0145885787646876e-11, 3.752553823233029e-14] n = 8 QuasiNewtonMethods.optimum(state) .- 1 = [-1.470801258562915e-11, 2.5369706335709452e-11, 4.793498931121576e-12, -3.0861646571622714e-11, -2.8323121625817294e-11, 5.060729613148851e-11, 8.785860927673639e-12, -6.255584938941183e-11] QuasiNewtonMethods.optimum(state) .- 1 = [-6.863398738232718e-12, 2.5550672688723353e-12, -1.1966316826317325e-11, 4.720668300706166e-12, -8.031908471650695e-12, 2.8035351817834453e-12, -2.3865465159644828e-11, 8.503642234813924e-12] n = 9 QuasiNewtonMethods.optimum(state) .- 1 = [-5.830891325331322e-13, -7.967071447012586e-12, 7.164380200208598e-11, -8.503586723662693e-11, -5.938138869510112e-12, -1.4936496484097006e-11, 1.4731327269146277e-10, -1.7318813050337667e-10, -4.3059000809364534e-11] QuasiNewtonMethods.optimum(state) .- 1 = [4.1884273827008656e-12, 4.516964580147942e-11, 2.972955215341244e-11, 1.3888890038060708e-12, 7.363221143918963e-12, 8.715095312084031e-11, 6.089750925752924e-11, 2.1962431873134847e-12, 8.72635297355373e-14] n = 10 QuasiNewtonMethods.optimum(state) .- 1 = [-3.1532998434613546e-11, -1.5861756352819611e-12, 1.7814638653135262e-12, 3.433253681350834e-12, 2.206679283744961e-11, -6.417710807227195e-11, -2.2031265700661606e-12, 3.360423050935424e-12, 3.5214053895060715e-12, 4.2829517710174514e-11] QuasiNewtonMethods.optimum(state) .- 1 = [-4.135614073419447e-11, 2.49913423289172e-11, -2.0360824137810596e-10, 6.513922734541211e-11, 5.239630951336949e-11, -7.967182469315048e-11, 5.052602780608595e-11, -4.143548837376443e-10, 1.1938272592715293e-10, 1.044753172863011e-10] n = 11 QuasiNewtonMethods.optimum(state) .- 1 = [1.2560619211399171e-11, -6.900480187255198e-12, -2.3070212407105828e-11, 1.0506262526632781e-11, 5.204947584047659e-12, 2.3885338151785618e-11, -1.8665513579207982e-11, -4.684008736433043e-11, 2.0447643578336283e-11, 7.356781850376137e-12, 1.5190071422921392e-12] QuasiNewtonMethods.optimum(state) .- 1 = [1.8684609415231535e-11, -1.3610668148089644e-11, 1.0282752427315245e-10, -1.3859513536829127e-10, -6.156897214282253e-11, 4.48563408639302e-11, -3.8405723046253115e-11, 2.1485346834992924e-10, -2.8008961816539113e-10, -1.048097164613182e-10, -1.3046119740067752e-11] n = 12 QuasiNewtonMethods.optimum(state) .- 1 = [3.032307738237705e-11, -2.8655966488599915e-12, -3.76715325600685e-11, -1.457478582267413e-11, 5.613176590202329e-11, 3.249622793077833e-11, 6.144018627196601e-11, -7.256639733554948e-12, -7.601674845147954e-11, -3.182409891167026e-11, 1.1425638213324874e-10, 6.255995721460295e-11] QuasiNewtonMethods.optimum(state) .- 1 = [1.0394463068053028e-10, 1.2567125118323474e-10, 1.4188450414565068e-10, -3.566258399700928e-12, -4.4035330937219896e-11, 8.853229260807893e-11, 2.039715063517633e-10, 2.602309479016185e-10, 2.6190982715945665e-10, -1.585509501467186e-12, -9.421663449415973e-11, 1.7345125336021283e-10] n = 13 QuasiNewtonMethods.optimum(state) .- 1 = [-2.1089796575779474e-11, -2.5878188480987774e-12, 2.1962431873134847e-11, 8.741896095898483e-12, -5.077938070030541e-12, 1.0963896457383271e-11, -4.326261571208079e-11, -6.116551709567375e-12, 4.254041563456212e-11, 2.2150503653506348e-11, -1.1234235763879497e-11, 2.0854651339163865e-11, 4.544364884395691e-12] QuasiNewtonMethods.optimum(state) .- 1 = [2.556821421251243e-11, 1.574163022155517e-11, 2.326228099036598e-11, -7.35493888015526e-11, 1.8486545627638407e-11, -1.2764789225627737e-11, 5.5489390859975174e-11, 2.667821519253266e-11, 5.146572057412868e-11, -1.4705836548500884e-10, 4.1572301157088987e-11, -2.929445575006184e-11, -5.601963337653615e-12] n = 14 QuasiNewtonMethods.optimum(state) .- 1 = [-3.2095459623349143e-10, 9.166001291305292e-13, -2.999678283543972e-11, -1.0603429245747975e-10, -7.571354654345441e-11, 1.8996848538677114e-10, -6.819667053292733e-11, -6.523710460726306e-10, 9.64339719189411e-12, -5.632372346298098e-11, -2.1224677571041184e-10, -1.5321510726806764e-10, 3.633464640273587e-10, -1.1871825744691478e-10] QuasiNewtonMethods.optimum(state) .- 1 = [-2.546144406423423e-10, -4.207612036566388e-11, -2.950006905422242e-11, 2.627531525689619e-10, 6.816880393500924e-11, -7.077360919538478e-11, -1.296879270640261e-10, -5.16827691754429e-10, -8.333611578592581e-11, -6.702227661747884e-11, 5.272311476289815e-10, 1.4100498546554263e-10, -1.4378098711631537e-10, -2.6583391043999427e-10] n = 15 QuasiNewtonMethods.optimum(state) .- 1 = [-8.304468224196171e-12, -1.000577398713176e-11, 2.5233370948285483e-11, 3.206102050512527e-12, 2.1671997529892906e-11, 1.1409762024072734e-11, 5.260236690673992e-12, -1.774347335725679e-11, -1.963773588187223e-11, 5.1037840620438146e-11, 5.630163002479094e-12, 4.321321078748497e-11, 2.5083046750751237e-11, 1.0499823233089955e-11, 3.1596947280831955e-13] QuasiNewtonMethods.optimum(state) .- 1 = [-4.1579739651353975e-11, -3.6034397687956243e-11, 6.15021367167401e-11, -7.228662113334394e-12, -3.50923734515618e-11, 7.05759894970015e-11, 1.2755796419128274e-11, -8.005240914599199e-11, -6.95509205783651e-11, 1.1746936756651394e-10, -1.601041521581692e-11, -6.938538632539348e-11, 1.4399303971401878e-10, 1.4321210883849744e-11, 2.3505641877363814e-12] n = 16 QuasiNewtonMethods.optimum(state) .- 1 = [3.419575733687452e-11, -1.9416024343854588e-11, 9.44850864215141e-11, -2.104372232025753e-11, 3.9196645928996077e-11, 1.957145556730211e-11, 1.3672618592863728e-11, -4.606925951833318e-11, 7.302802806918862e-11, -3.8788749989748794e-11, 1.9237722526099788e-10, -3.6494363087058446e-11, 7.239120414226363e-11, 3.9006353702575325e-11, 2.7392532686576487e-11, -9.406386780597131e-11] QuasiNewtonMethods.optimum(state) .- 1 = [1.7251977624255233e-10, 2.2672974608894947e-11, 2.3117019409824024e-10, 3.3238012342451384e-10, -3.136335635645082e-11, -5.90476556538988e-11, -1.343868349934496e-10, -2.4486690453073834e-10, 3.270350656947585e-10, 4.902700467823706e-11, 4.4965409173869375e-10, 6.768940963297609e-10, -6.51422249475786e-11, -1.3335688109350485e-10, -2.514961572330776e-10, -4.903287775803733e-10] n = 17 QuasiNewtonMethods.optimum(state) .- 1 = [-2.3859469955311852e-11, 4.856137714170927e-11, 1.3290479827787749e-11, -4.2649106468672926e-11, 4.3647307990113404e-11, -2.7641444688697447e-11, -1.1180834036395026e-11, 1.4850343177386094e-12, -4.3521186654515986e-11, 1.0516476578459333e-10, 3.529421199743865e-11, -8.4021234414422e-11, 8.38349389908899e-11, -5.673739256195631e-11, -2.632116746781321e-11, 6.891154313848347e-12, -8.558376229927944e-12] QuasiNewtonMethods.optimum(state) .- 1 = [8.795919548276743e-11, -8.312239785368547e-13, -4.9421133851978993e-11, -2.602495996484322e-11, -1.1197964777664993e-10, 8.871059442583373e-11, -2.2668422694493984e-11, -2.6452506851626367e-11, 1.772502145058752e-10, 4.474864923054156e-12, -1.0593415034065856e-10, -5.364930721896144e-11, -2.29937291429394e-10, 1.7570189747573295e-10, -4.880484905100957e-11, -5.316647122555196e-11, 1.1448619829934614e-12] n = 18 QuasiNewtonMethods.optimum(state) .- 1 = [9.031153602734321e-11, 3.054023700599373e-11, -1.0476075562593223e-10, -9.450651372588936e-11, -7.020950487657274e-11, -8.173650645204589e-11, 8.021761033205621e-11, -3.6306402328989407e-11, -7.988243400092188e-11, 1.7771828453305716e-10, 5.748890252732508e-11, -2.1471635580638804e-10, -1.9534440731661107e-10, -1.3872825110894382e-10, -1.732132215437332e-10, 1.5859513702309869e-10, -6.662326246242856e-11, -1.4621825972227498e-10] QuasiNewtonMethods.optimum(state) .- 1 = [-4.5229930911716565e-11, 1.5036993872286075e-10, -8.481759738998562e-11, -1.325425325049423e-10, -7.433642590370937e-11, 1.0485345924848843e-10, 1.3159273670737548e-10, -9.27535825923087e-12, 1.1481993134054846e-10, -9.364042874437928e-11, 2.986375591262913e-10, -1.656265125049572e-10, -2.540431198738702e-10, -1.4791567970462438e-10, 2.141407051681199e-10, 2.70598876639383e-10, -1.6969647909093055e-11, 2.2844504066199534e-10] n = 19 QuasiNewtonMethods.optimum(state) .- 1 = [3.232369927275158e-11, 3.640510115587858e-11, 4.5078607513460156e-11, -4.1698866581896255e-11, 2.364619611228136e-11, 8.836265052991621e-12, 9.900746889002221e-12, -5.560263360848694e-11, 3.740363574422645e-11, 5.790190549248564e-11, 7.349232333808686e-11, 8.953726648996962e-11, -8.190947919928249e-11, 4.8415049747063676e-11, 1.4603651621314384e-11, 2.461764125882837e-11, -1.1213707740154177e-10, 7.551936853644747e-11, -1.6206591624268185e-11] QuasiNewtonMethods.optimum(state) .- 1 = [1.8448154115446869e-10, -4.368294614920387e-11, 1.407189920143992e-10, -3.0006919171654545e-10, 8.575007370836829e-11, 2.8375302107974676e-11, 4.655571483880294e-10, 1.0149858731267614e-10, -2.332127824189456e-10, 3.623166211497164e-10, -8.107792215383824e-11, 2.7019786408288837e-10, -5.885997245158592e-10, 1.7478485325739257e-10, 5.201328256987381e-11, 9.351666108159407e-10, 1.8641155286047706e-10, -4.762825689397232e-10, -1.805633420559616e-11] n = 20 QuasiNewtonMethods.optimum(state) .- 1 = [-3.4603764298424267e-11, -2.8398949858399192e-11, 4.328648550711023e-11, -1.307076669121443e-10, -1.373012814553931e-12, -9.561240688071848e-12, 5.1559867486616895e-11, -7.932277057420833e-11, -3.3478775307571595e-12, 1.2843726082678586e-10, -6.245348682654139e-11, -5.4427573559223674e-11, 8.911582582982192e-11, -2.5603885678293636e-10, 2.928768338961163e-13, -1.6557311077747272e-11, 1.0072809253358628e-10, -1.6552614834353108e-10, -3.3668623444782497e-12, 2.646558527885645e-10] QuasiNewtonMethods.optimum(state) .- 1 = [8.594414069307277e-11, 4.5665027315067164e-11, -1.4104273304837989e-12, 6.943667862913117e-11, -2.8643531990724114e-11, -2.619315875307393e-11, 6.262101948095733e-11, 5.25011145668941e-11, 4.934386232946508e-11, 7.617795283465512e-11, 1.6508039379914408e-10, 8.70372662831187e-11, -9.619638419167131e-12, 1.3794454467586093e-10, -4.952038779038048e-11, -4.805555953169005e-11, 1.3192225090108423e-10, 9.52151690825076e-11, 1.0034750808074477e-10, 1.4903411837963176e-10] n = 21 QuasiNewtonMethods.optimum(state) .- 1 = [1.854556508362748e-10, -3.8465342022675486e-11, 1.3911916063591434e-10, -3.9391157002910404e-11, 1.6281198611522996e-11, 1.7152723685853744e-11, 1.1965006763148267e-10, 1.0532485994474428e-10, 1.4342593779304025e-10, -2.1012747097870488e-11, 3.7627034821241523e-10, -8.891443137315491e-11, 2.6784952034120124e-10, -9.45277189856597e-11, 4.0172754012246514e-11, 3.590039376888399e-11, 2.2827917334211634e-10, 2.080511318780509e-10, 2.8864266532480087e-10, -4.9155568504488656e-11, 1.740985133835693e-11] QuasiNewtonMethods.optimum(state) .- 1 = [-3.194744468970612e-11, -6.259348594994663e-11, -2.224764816816105e-11, 3.9889425096362174e-11, -5.918632250967448e-11, 2.0057067118273153e-11, 1.4295209460613023e-10, 6.61299903725876e-11, 1.4135670411974388e-10, -2.9654168010040394e-11, -7.575040594787197e-11, -1.1445189240788523e-10, -3.392641723110046e-11, 7.725331485630704e-11, -1.109961011991345e-10, 4.490829930148266e-11, 2.9353186548064514e-10, 1.299518270769795e-10, 2.87809998056332e-10, -5.768296951202956e-11, -5.7583937618232994e-12] n = 22 QuasiNewtonMethods.optimum(state) .- 1 = [2.272604326947203e-11, 9.197620443046617e-11, -4.04263289510709e-11, -4.867961589383185e-11, 1.4377454782277255e-10, 2.0704127301485187e-10, -2.3430701823201616e-11, 4.668110342720411e-11, -7.966938220249631e-11, 1.1157519352877898e-11, -4.8584025691411625e-11, 4.9395598722412615e-11, 1.8200352336350534e-10, -8.729827971620807e-11, -1.0188860866122695e-10, 2.975286683692957e-10, 4.154163679714884e-10, -5.3995030668829713e-11, 9.228040553921346e-11, -1.546677230734872e-10, 1.7787549211334408e-11, -1.0018474938533473e-10] QuasiNewtonMethods.optimum(state) .- 1 = [6.459055512664236e-12, 1.18813847649335e-11, -3.262823344840626e-11, 3.17375015157495e-11, 4.978195633498217e-11, -6.005906882933232e-11, -3.786781999082223e-11, -2.1039614495066417e-11, 3.088040934073888e-11, 9.59381463161435e-11, 1.6961987370223142e-12, 1.2728040843512645e-11, 2.4571011891794114e-11, -6.424827336815042e-11, 6.231926086286421e-11, 1.0656919791074415e-10, -1.1234713159780085e-10, -7.445943861483784e-11, -4.94682073082231e-11, 5.2813309281418697e-11, 1.903601720698589e-10, 5.589084750567963e-12] n = 23 QuasiNewtonMethods.optimum(state) .- 1 = [-1.425748408223626e-11, -1.922684234045846e-12, -5.108469203207733e-12, -7.164269177906135e-12, 3.746336574295128e-12, 1.626943024746197e-11, 7.432943149865423e-12, -4.714562074070727e-12, -8.599898571048925e-12, -1.6715517858756357e-11, -1.3389955810794163e-11, -2.7587043760490815e-11, -4.20052881366928e-12, -1.0305756248385478e-11, -1.4259482483680586e-11, 9.496847752643589e-12, 3.271094506374084e-11, 1.550559680651986e-11, -8.696710018796239e-12, -1.698219342927132e-11, -3.194833286812582e-11, -2.6809332531740893e-11, -6.046829703620915e-12] QuasiNewtonMethods.optimum(state) .- 1 = [4.05850908435923e-11, -2.310562852159137e-11, -3.595568287551032e-12, 1.964872708981602e-12, 1.5114798301851806e-11, 2.1528556715111336e-11, -2.591293846165854e-11, 5.611067166455541e-13, -1.885602785023366e-11, -4.097699957128498e-11, -2.134081800164722e-11, 8.05209232623838e-11, -4.366440542469263e-11, -5.277112080648294e-12, 3.687494753989995e-12, 3.1372238140647823e-11, 4.1036507525404886e-11, -5.240352596302955e-11, 4.0532022183015215e-12, -3.6213254617223356e-11, -8.150913277660266e-11, -4.438049927557586e-11, -3.284050809071459e-11] n = 24 QuasiNewtonMethods.optimum(state) .- 1 = [-1.1832090862640143e-11, 7.804001889155643e-11, 1.0228262681266642e-11, 8.330669487577325e-12, 1.5106804696074505e-11, 9.778600151832961e-11, 6.905587213168474e-13, 6.409406339002999e-11, 5.5367266327266407e-11, -5.850775419702359e-11, -1.1796785770457063e-11, 7.227307641244352e-11, -2.065447812782395e-11, 1.5030043876151922e-10, 1.951239170239205e-11, 2.016942168836522e-11, 3.456079866737127e-11, 2.0481394358284888e-10, -6.2099214659383506e-12, 1.338291699681804e-10, 1.1477863104403241e-10, -1.1163359125987427e-10, -2.5084712085288174e-11, 1.4386247748632286e-10] QuasiNewtonMethods.optimum(state) .- 1 = [-1.280198169695268e-11, -1.2498668766625087e-11, 9.029887948486248e-12, 1.6764811761049714e-11, 2.4684032595700955e-11, -2.1991186649472638e-11, -4.554601140682735e-11, 3.2218672174622043e-12, 4.631628414131228e-12, 1.982436437231172e-11, -2.6544322295762868e-11, 2.768874018954648e-11, -2.345779126500247e-11, -2.2631008178564116e-11, 1.3215650795928013e-11, 3.178812768567241e-11, 4.829647792803371e-11, -4.4306669444438285e-11, -9.153133806449887e-11, 6.057376822354854e-12, 8.895995051716454e-12, 4.101141648504836e-11, -5.373901323935115e-11, 5.757128107575227e-11] Test Summary: | Pass Fail Total Time QuasiNewtonMethods.jl | 148 1 149 4m43.1s Method ambiguity | 1 1 10.1s Unbound type parameters | 1 1 0.1s Undefined exports | 1 1 0.0s Compare Project.toml and test/Project.toml | 1 1 0.4s Stale dependencies | 1 1 7.3s Compat bounds | 3 1 4 12.5s julia | 1 1 0.1s Base.PkgId(Base.UUID("64452400-c6f4-4a1d-a4f6-ad403655768a"), "QuasiNewtonMethods") deps | 1 1 0.6s Base.PkgId(Base.UUID("64452400-c6f4-4a1d-a4f6-ad403655768a"), "QuasiNewtonMethods") extras | 1 1 11.7s Base.PkgId(Base.UUID("64452400-c6f4-4a1d-a4f6-ad403655768a"), "QuasiNewtonMethods") weakdeps | 1 1 0.0s Piracy | 1 1 0.2s Persistent tasks | 1 1 1m00.5s RNG of the outermost testset: Random.Xoshiro(0xd63cd5215bbebb46, 0x23e04250d53b3740, 0x3bc9964a622fe6ec, 0x5874830716fece6c, 0xd7fd20b967578896) ERROR: LoadError: Some tests did not pass: 148 passed, 1 failed, 0 errored, 0 broken. in expression starting at /home/pkgeval/.julia/packages/QuasiNewtonMethods/Pnhdf/test/runtests.jl:35 Testing failed after 304.44s ERROR: LoadError: Package QuasiNewtonMethods 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] Cmd(cmd::Cmd) @ Base /opt/julia/share/julia/stdlib/v1.14/Pkg/src/Operations.jl:3110 [inlined] [4] 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 [5] 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 [6] test(pkgs::Vector{String}; kwargs::@Kwargs{julia_args::Cmd}) @ Pkg.API /opt/julia/share/julia/stdlib/v1.14/Pkg/src/API.jl:160 [7] test @ /opt/julia/share/julia/stdlib/v1.14/Pkg/src/API.jl:160 [inlined] [8] test(pkg::String; kwargs::@Kwargs{julia_args::Cmd}) @ Pkg.API /opt/julia/share/julia/stdlib/v1.14/Pkg/src/API.jl:159 [inlined] [9] top-level scope @ /PkgEval.jl/scripts/evaluate.jl:223 [10] include(mod::Module, _path::String) @ Base ./Base.jl:326 [11] exec_options(opts::Base.JLOptions) @ Base ./client.jl:355 [12] _start() @ Base ./client.jl:596 in expression starting at /PkgEval.jl/scripts/evaluate.jl:214 PkgEval failed after 546.44s: package has test failures