Package evaluation to test QuasiNewtonMethods on Julia 1.14.0-DEV.2275 (3ea3bac2a3*) started at 2026-06-02T22:05:13.145 ################################################################################ # Set-up # Installing PkgEval dependencies (TestEnv)... Activating project at `~/.julia/environments/v1.14` Set-up completed after 15.03s ################################################################################ # 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 To see why use `status --outdated -m` Installation completed after 4.53s ################################################################################ # Precompilation # Precompiling PkgEval dependencies... Precompiling package dependencies... Precompiling project... 5.6 s ✓ StaticArrayInterface 1.1 s ✓ StaticArrayInterface → StaticArrayInterfaceOffsetArraysExt 1.4 s ✓ LayoutPointers 1.2 s ✓ CloseOpenIntervals 18.2 s ✓ VectorizationBase 2.2 s ✓ StrideArraysCore 3.6 s ✓ SLEEFPirates 3.9 s ✓ VectorizedRNG 44.0 s ✓ LoopVectorization 13.5 s ✓ VectorizedRNG → VectorizedRNGStaticArraysExt 42.4 s ✓ VectorizedStatistics 11.0 s ✓ QuasiNewtonMethods 10.1 s ✓ Octavian 11.5 s ✓ StrideArrays 14 dependencies successfully precompiled in 170 seconds. 56 already precompiled. Precompilation completed after 180.61s ################################################################################ # Testing # Testing QuasiNewtonMethods Status `/tmp/jl_yQ9sJ9/Project.toml` [4c88cf16] Aqua v0.8.15 [64452400] QuasiNewtonMethods v0.1.4 [d1fa6d79] StrideArrays v0.1.29 [8dfed614] Test v1.11.0 Status `/tmp/jl_yQ9sJ9/Manifest.toml` [79e6a3ab] Adapt v4.6.0 [4c88cf16] Aqua v0.8.15 [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 v1.9.4+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/gDh9K/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/gDh9K/src/deps_compat.jl:60 [3] test_deps_compat(pkg::Base.PkgId, deps_type::String) @ Aqua ~/.julia/packages/Aqua/gDh9K/src/deps_compat.jl:55 [inlined] [4] macro expansion @ ~/.julia/packages/Aqua/gDh9K/src/deps_compat.jl:45 [inlined] [5] macro expansion @ /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/gDh9K/src/deps_compat.jl:45 n = 2 QuasiNewtonMethods.optimum(state) .- 1 = [-2.734972248674694e-10, -5.386237011961725e-10] QuasiNewtonMethods.optimum(state) .- 1 = [-2.754674266469692e-11, -5.592049046043712e-11] n = 3 QuasiNewtonMethods.optimum(state) .- 1 = [7.600586826583822e-13, 1.9486634528220748e-12, 6.100675520315235e-12] QuasiNewtonMethods.optimum(state) .- 1 = [3.0331359646140754e-10, 6.268872088099897e-10, -4.042016721328423e-10] n = 4 QuasiNewtonMethods.optimum(state) .- 1 = [3.3441938107614533e-10, -2.128105469623165e-10, 6.467271163046462e-10, -4.416675913887502e-10] QuasiNewtonMethods.optimum(state) .- 1 = [7.175260385849924e-11, -1.5690782007027337e-12, 1.454825149238559e-10, 7.586598016473545e-12] n = 5 QuasiNewtonMethods.optimum(state) .- 1 = [4.497513472756509e-11, 7.46191997080814e-11, 9.058331862377145e-11, 1.4550094462606467e-10, -2.445162960995617e-10] QuasiNewtonMethods.optimum(state) .- 1 = [1.4841239348584168e-11, -2.2459256676654604e-11, 2.8382851624542127e-11, -4.231381911523613e-11, -8.604450485449888e-12] n = 6 QuasiNewtonMethods.optimum(state) .- 1 = [8.311795696158697e-12, 4.6407322429331543e-14, -6.044276190664277e-12, 1.698263751848117e-11, 9.012790513907021e-13, -1.1752709916379445e-11] QuasiNewtonMethods.optimum(state) .- 1 = [-3.161093609094223e-11, -4.261369035418738e-12, 1.042277375518097e-11, -6.300959753957613e-11, -7.789768829979948e-12, 2.1962209828529922e-11] n = 7 QuasiNewtonMethods.optimum(state) .- 1 = [-1.1600831406610723e-11, 1.4119150293367966e-11, 6.88071821741687e-12, -2.3436919072139517e-11, 2.99535951597818e-11, 1.758815315611173e-11, -1.1496359419993496e-12] QuasiNewtonMethods.optimum(state) .- 1 = [8.000777818040206e-11, 6.71838140675618e-11, -1.513309477729763e-10, 1.66425317971175e-10, 1.2985723607528143e-10, -3.176069407473392e-10, 7.993605777301127e-15] n = 8 QuasiNewtonMethods.optimum(state) .- 1 = [-1.712741060089229e-11, -1.2467249455028195e-11, -1.1354028828236551e-11, 1.7397638885086053e-11, -3.387701230650464e-11, -2.4861779301943443e-11, -2.257827258489442e-11, 3.611022592053814e-11] QuasiNewtonMethods.optimum(state) .- 1 = [-2.8408275731806043e-11, 1.234274904504673e-10, -1.8413992552979153e-10, 7.411049551819815e-11, -5.424105609108665e-11, 2.398543585968582e-10, -3.926944325272075e-10, 1.7220580517118833e-10] n = 9 QuasiNewtonMethods.optimum(state) .- 1 = [4.682254584054135e-12, 7.728706563625565e-12, 8.714584609492704e-12, 2.142863664289507e-11, 1.2544409955239644e-11, 1.3879786209258782e-11, 1.7073675806500432e-11, 4.4444448121794267e-11, 5.551115123125783e-13] QuasiNewtonMethods.optimum(state) .- 1 = [1.965538842796377e-12, 8.538947326997004e-12, -3.309197360579219e-11, 2.0301982317505463e-11, 3.830047390351865e-12, 1.8461010498072028e-11, -6.559475185241581e-11, 4.367373129809948e-11, -1.4299672557172016e-13] n = 10 QuasiNewtonMethods.optimum(state) .- 1 = [-6.71740441049451e-12, -8.905431947425768e-12, -1.5568435429713645e-11, -1.1607936833968324e-11, -1.8821832981075204e-11, -9.470757511564898e-12, -1.4290235661462702e-11, -3.433153761278618e-11, -2.0517809673492593e-11, -3.39680505945239e-11] QuasiNewtonMethods.optimum(state) .- 1 = [1.4765966227514582e-12, 9.719181015555023e-11, 3.780264989927673e-11, 3.816413851609468e-11, 1.5764944905072298e-11, 6.226130722097878e-13, 1.9189916322659428e-10, 8.1417761421676e-11, 7.696843162818823e-11, 3.3109293084976343e-11] n = 11 QuasiNewtonMethods.optimum(state) .- 1 = [-1.3273160348603597e-11, -4.40388836508987e-11, -1.1767253838002034e-12, -1.1233458607762259e-11, -6.963762899658832e-12, -2.5453639196371114e-11, -8.709000187678839e-11, -1.7754686609805503e-12, -2.2304047497812007e-11, -1.6763479493420164e-11, 9.754419494356625e-13] QuasiNewtonMethods.optimum(state) .- 1 = [-1.553130957177018e-10, -1.19905307904844e-10, -7.051492723064712e-11, -6.836875510174423e-11, -3.147926364022169e-12, -3.103335366461124e-10, -2.430362577854339e-10, -1.4224532662865386e-10, -1.366710078443134e-10, -1.6977530492567894e-11, -5.7777338469122697e-11] n = 12 QuasiNewtonMethods.optimum(state) .- 1 = [-6.828848597706383e-11, 1.3278933508331647e-11, 1.0102318981353164e-10, -2.7226998433604876e-11, 8.31759106034724e-11, 6.5851768482616535e-12, -1.3399925613555297e-10, 2.6147750631366762e-11, 2.1139734407427113e-10, -5.677169845341723e-11, 1.726223608500277e-10, 1.4028334049953628e-11] QuasiNewtonMethods.optimum(state) .- 1 = [3.979927498676261e-12, 9.768186259861977e-12, 3.0178970433780705e-11, -3.5539349241275886e-12, 4.8304249489206086e-11, 1.9661605676901672e-11, 8.344214208477752e-12, 1.9627854896953068e-11, 6.15252293556523e-11, -7.1419536951111695e-12, 9.810308121416256e-11, 3.716671415077144e-11] n = 13 QuasiNewtonMethods.optimum(state) .- 1 = [1.3315792912749203e-11, 1.2120371373214311e-10, 1.5336198977422555e-10, -1.4338752407638822e-11, 8.444978050192731e-11, 1.3743717275360723e-10, 2.6046498291520948e-11, 2.2875323857363128e-10, 3.221038991085834e-10, -2.583255831467568e-11, 1.6745405062579266e-10, 2.826066047845188e-10, -5.239475520113501e-12] QuasiNewtonMethods.optimum(state) .- 1 = [-1.951272476929944e-11, 8.186384903297039e-11, -8.574330134791808e-11, -7.058342799126649e-11, -1.3981071855795335e-10, 8.599343459536612e-11, -4.22967216806569e-11, 1.6147438941516157e-10, -1.8286916425580557e-10, -1.432596263839514e-10, -2.678105515130369e-10, 1.791033987785795e-10, -7.51843032276156e-13] n = 14 QuasiNewtonMethods.optimum(state) .- 1 = [-1.7851409239710847e-10, -9.572453940620562e-11, 1.496136547984861e-12, -8.254152916720159e-11, -1.8412560365277386e-10, -2.4203716808557374e-10, 6.080291825583117e-11, -3.696740691339073e-10, -1.8912038601825998e-10, 3.1896707497480747e-12, -1.722268994086562e-10, -3.744276000361424e-10, -4.808973219638801e-10, 1.143172223549982e-10] QuasiNewtonMethods.optimum(state) .- 1 = [7.595968298801381e-11, -2.93428614739355e-11, 1.743849509239226e-11, -2.964695156038033e-11, 4.15103507123149e-11, -1.1982970171686702e-11, 4.8547832420808845e-11, 1.4705037187923153e-10, -4.75006700639824e-11, 3.113953539468639e-11, -5.916422907148444e-11, 8.723644029373645e-11, -2.912847740788038e-11, 9.834866254720964e-11] n = 15 QuasiNewtonMethods.optimum(state) .- 1 = [-4.37856417789817e-11, -3.49362760942995e-11, -5.2853832421817515e-11, 2.890643280295535e-11, -1.5835444067135995e-11, 6.660672013936164e-12, 5.475397912846347e-11, -8.939915474570626e-11, -6.635991756098747e-11, -1.0431167041247136e-10, 6.215694625666401e-11, -3.489242228482681e-11, 1.0091483204632823e-11, 1.0752665424718089e-10, -7.496558929176445e-12] QuasiNewtonMethods.optimum(state) .- 1 = [7.901679310862164e-11, 3.8402170332574315e-11, 1.6789680756801317e-11, 6.59952092973981e-11, 4.334088643531686e-11, -1.5573764500231846e-11, -8.324785305546811e-12, 1.5963697030940693e-10, 7.327227713460616e-11, 3.5524250208140984e-11, 1.4065637543581033e-10, 8.867329093220633e-11, -2.8719804312515862e-11, -1.8229640019740145e-11, 1.1248779685502086e-12] n = 16 QuasiNewtonMethods.optimum(state) .- 1 = [-3.122824221435394e-11, -5.455191853798169e-11, -5.222688947981169e-11, -5.220091026103546e-11, 7.161093940055707e-11, 5.83664228059888e-11, -2.3239321578216732e-10, 2.376410179749655e-11, -6.611455827254531e-11, -1.0234180169987894e-10, -9.080047824738813e-11, -1.0709355624527461e-10, 1.421356365938209e-10, 1.1477307992890928e-10, -4.847827694831608e-10, 3.523714653397292e-11] QuasiNewtonMethods.optimum(state) .- 1 = [3.751177146682494e-11, 4.48385772955362e-11, -7.247091815543172e-12, -9.07762753854513e-12, 5.154277005203767e-11, 2.169286972275586e-11, 2.7217117448685713e-11, -8.632206061065517e-12, 7.34483585063117e-11, 8.68873861747943e-11, -1.6203816066706622e-11, -1.8614554342377687e-11, 1.0358180979608278e-10, 4.3589132303623046e-11, 5.286993065567458e-11, -1.60377267022227e-11] n = 17 QuasiNewtonMethods.optimum(state) .- 1 = [-5.284661597215745e-12, 1.234168323094309e-11, 5.4088955536713e-11, -1.1738976457564831e-10, 5.842482053708409e-11, -2.0132673306250126e-11, 2.4175927926251006e-10, -8.25234325319002e-11, -1.0647704939970026e-11, 2.230371443090462e-11, 1.0882850176585634e-10, -2.362708917402756e-10, 1.2702927598695624e-10, -3.977629337015287e-11, 4.955360566327727e-10, -1.6820189685518017e-10, -3.7625458304546555e-12] QuasiNewtonMethods.optimum(state) .- 1 = [-1.4996170971670608e-10, 7.225908760233324e-11, -1.6844581285369031e-10, 9.64384128110396e-12, -2.0796364630371045e-11, 2.1934454252914293e-11, -1.5150936061303355e-10, 9.338596562713519e-11, -2.983197022743411e-10, 1.4819145910394127e-10, -3.2494618107392625e-10, 2.142241939395717e-11, -4.326439206892019e-11, 4.7128079216918195e-11, -3.043787444312329e-10, 1.916287128977956e-10, 3.517852675827271e-12] n = 18 QuasiNewtonMethods.optimum(state) .- 1 = [-2.1598378641130012e-10, -8.604006396240038e-11, -2.462392512114775e-10, -1.6723633589066367e-10, 5.415889958726439e-12, 2.2621682305157265e-11, 4.8061110646813177e-11, 8.534706275042936e-11, 3.070432796903333e-11, -4.51476300789011e-10, -1.8012469293893218e-10, -4.950669874048685e-10, -3.4732283715754875e-10, 1.3248291352851993e-11, 2.459987769043437e-11, 9.989009619459921e-11, 1.8287549252704594e-10, 6.857003853610877e-11] QuasiNewtonMethods.optimum(state) .- 1 = [-3.801181591711611e-12, -2.4013124821919973e-11, 7.458922368641652e-12, 6.030953514368775e-12, -5.3517190679031046e-12, 2.266564713693242e-11, -4.53725945703809e-12, 1.524202986047385e-11, 1.0431877583982896e-11, -5.35282929092773e-12, -4.774780570926396e-11, 1.4018119998127077e-11, 1.2240430891097276e-11, -9.36273281126887e-12, 4.595257507844508e-11, -8.628098235874404e-12, 3.129718706418316e-11, 1.9090284908429567e-11] n = 19 QuasiNewtonMethods.optimum(state) .- 1 = [1.7114754058411563e-11, -2.195776893643142e-11, -4.25659507641285e-13, 1.1559597723476145e-10, -3.0154212460331564e-11, 7.576383964646993e-11, -4.4297898682543746e-13, -2.3419932659862752e-11, -8.211098467825195e-12, 3.537126147534764e-11, -4.1285419527525846e-11, -1.884381539696278e-12, 2.31090924174282e-10, -5.8012039616528455e-11, 1.460280785181567e-10, 9.195533223760322e-12, -4.764544314639352e-11, -2.0123014365935887e-11, -2.12727613302377e-11] QuasiNewtonMethods.optimum(state) .- 1 = [-1.4491630118129706e-11, -9.679368417891965e-12, 1.5828449662080857e-11, 4.027089772762338e-11, 6.113465289558917e-11, -4.406142117829859e-11, -9.844902670863576e-12, 1.652322723089128e-11, -1.9787838034801553e-11, -2.5297319794503892e-11, -1.9150125929456863e-11, 3.362288225616794e-11, 7.990252903766759e-11, 1.0980527598292156e-10, -9.109102361293253e-11, -1.7076340341759533e-11, 3.307687457265729e-11, -4.0783154631185425e-11, -4.2943426592501055e-13] n = 20 QuasiNewtonMethods.optimum(state) .- 1 = [9.204259576733875e-11, 3.469957654544942e-11, -1.5465484448640154e-10, -1.8037871196696642e-10, 4.633182726365703e-11, 1.6260348623120535e-10, -3.2780789194220006e-10, 3.9311931487873153e-10, 2.280473587745746e-10, 8.725331568371075e-11, 1.8934409595772195e-10, 5.220401888550441e-11, -3.2728575405371885e-10, -3.688407357316237e-10, 8.392597727890916e-11, 3.318447738820396e-10, -6.631133420142987e-10, 7.850491368088797e-10, 4.581128809633128e-10, 1.534103954980992e-10] QuasiNewtonMethods.optimum(state) .- 1 = [6.762457260833799e-11, -3.517923730100847e-10, 1.708144736767281e-11, -1.4342971255132397e-12, -3.505311596541105e-10, 6.176370526134178e-11, -8.874778689715868e-11, 4.155964461460826e-11, 1.7801959906194043e-10, 1.4813528181889524e-10, 1.4561352124076166e-10, -7.167851867606601e-10, 3.447642171749976e-11, -2.901678897160309e-12, -6.980623856733814e-10, 1.3456058489680345e-10, -1.7169177191078688e-10, 8.196576750663098e-11, 3.4924507730238474e-10, 2.864686265979799e-10] n = 21 QuasiNewtonMethods.optimum(state) .- 1 = [-2.7077229347582943e-12, 7.797984480362175e-12, 4.2265080324455084e-11, 1.1086465079301888e-11, 7.075229291331198e-12, 5.10613773485602e-12, 2.1153967466602808e-11, -8.600342660258775e-12, -1.5410894782519335e-11, -3.141797932926238e-11, -3.891109656706249e-12, 1.54207757674385e-11, 8.975642451503063e-11, 2.158651035699677e-11, 1.8133494705807607e-11, 6.5145666638954935e-12, 4.3464121191050253e-11, -1.9318324717687574e-11, -2.9273361512593965e-11, -6.250489015258154e-11, -1.1830536550405668e-12] QuasiNewtonMethods.optimum(state) .- 1 = [1.6514345446694279e-10, -1.912348057686586e-11, -7.440537075353859e-11, 1.6106427302986503e-10, -5.228271149348984e-10, -3.785397550970515e-10, 9.305223258593287e-11, 8.714806654097629e-12, 1.0754974688609309e-10, -1.2216982980817193e-10, 3.3885472205952283e-10, -4.16673362479969e-11, -1.46850531734799e-10, 3.4701397311209803e-10, -1.0657864590868371e-9, -7.544166402695396e-10, 1.834739027373189e-10, 1.3878675986234157e-11, 2.0581403248343122e-10, -2.545521571306608e-10, -4.622524585329302e-11] n = 22 QuasiNewtonMethods.optimum(state) .- 1 = [-3.439526441439966e-11, -2.693424372424147e-10, 1.199553789632546e-10, -3.0133562312073536e-11, -4.6148751486896344e-11, 3.553379812615276e-12, -3.4015013028465546e-12, -5.139910719265117e-11, 6.98929802922521e-11, -1.1077205819276514e-10, -8.892331315735191e-12, -6.489730974834629e-11, -5.305166306257547e-10, 2.4033197654205196e-10, -6.144373898564481e-11, -8.762623959768234e-11, -1.7787549211334408e-11, 7.014389069581739e-13, -1.1139222877432076e-10, 1.3436918244735807e-10, -2.2567836488462945e-10, -1.3611445304206882e-11] QuasiNewtonMethods.optimum(state) .- 1 = [-4.786837592973825e-12, -3.78711506598961e-11, -1.1997070004099442e-11, -1.502853397283843e-11, -7.228218024124544e-12, -3.807676396405668e-11, -1.450461972751782e-11, 2.3447910280083306e-12, 1.7147838704545393e-11, 1.148592332356202e-11, 9.772849196565403e-12, -1.0965672814222671e-11, -7.494893594639507e-11, -2.338318427774766e-11, -3.026912054338027e-11, -1.310562769418766e-11, -7.417477743132395e-11, -2.879252392062881e-11, 1.4150902671872245e-12, 3.4513281121917316e-11, 2.3356427902854193e-11, 1.6547208048223183e-11] n = 23 QuasiNewtonMethods.optimum(state) .- 1 = [1.709951069628346e-9, -1.9528489936249116e-11, -1.6147422288170787e-9, 1.299100826912536e-10, 7.405231983170779e-11, 1.371200264443928e-9, -2.3404279625438562e-9, -5.727598395566247e-10, -1.8918733246664488e-10, -6.541213126709522e-10, 8.267642126469354e-10, 3.4188842867877156e-9, -3.579780916140862e-11, -3.229844391938741e-9, 2.676177057736595e-10, 1.3347012384201662e-10, 2.7457263129804232e-9, -4.6913877227439116e-9, -1.1397628396636605e-9, -3.5641678497455587e-10, -1.2911144375848949e-9, 1.6604326802394098e-9, 1.8816503910557003e-11] QuasiNewtonMethods.optimum(state) .- 1 = [1.0504774827779784e-10, 9.87439019439762e-11, -6.078315628599285e-11, 1.809750127534926e-10, -4.670608344525817e-11, -8.407663454335079e-11, 1.768563073767382e-11, -1.2701417695382133e-10, 7.183764694218553e-11, 8.332645684561157e-11, 1.842448416056186e-10, 2.1859580812133572e-10, 2.0986989923699184e-10, -1.2449363762101484e-10, 3.5139380294424427e-10, -9.879852491678776e-11, -1.6279444459144088e-10, 4.091971206321432e-11, -2.695846879063879e-10, 1.321189824210478e-10, 1.6825518756036217e-10, 3.748084065335888e-10, -1.458521081687536e-10] n = 24 QuasiNewtonMethods.optimum(state) .- 1 = [8.025224929042452e-11, -1.0675904604795505e-12, -7.23359150356373e-11, 2.0812240819623185e-11, 7.58948459633757e-12, -2.457345438244829e-11, -2.670641485735814e-11, 8.237854842718662e-12, -2.7228330701234427e-11, 2.8601565560393283e-11, -3.0694335961811703e-12, -4.676481424326084e-12, 1.6108381295509844e-10, -3.392286451742166e-12, -1.4501932987798227e-10, 4.186273550033093e-11, 1.4154011296341196e-11, -4.909972428635001e-11, -5.1768589415246424e-11, 1.6167289729196455e-11, -5.448119733131307e-11, 5.604960939820103e-11, -6.351030812368208e-12, -9.219069951882375e-12] QuasiNewtonMethods.optimum(state) .- 1 = [-2.1518868908998456e-9, 1.4277490301140006e-10, 4.059644620468816e-9, -6.804838914575839e-10, 2.076785410309867e-10, -1.853052156164381e-10, -2.501876927851754e-9, -3.808343640443468e-10, -6.1769478421069834e-12, -3.966723616244394e-10, 1.3021386191525153e-9, 2.810478516579451e-10, -4.320364288545875e-9, 2.873752347198888e-10, 8.138110629829498e-9, -1.3698404632833672e-9, 4.101976536219354e-10, -3.72470942977543e-10, -5.010343917533078e-9, -7.647941169253158e-10, -1.3692824651911906e-11, -7.938356638703681e-10, 2.611754146286671e-9, 5.630658161948077e-10] Test Summary: | Pass Fail Total Time QuasiNewtonMethods.jl | 148 1 149 4m02.7s Method ambiguity | 1 1 9.1s 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 6.7s Compat bounds | 3 1 4 9.7s 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 8.9s Base.PkgId(Base.UUID("64452400-c6f4-4a1d-a4f6-ad403655768a"), "QuasiNewtonMethods") weakdeps | 1 1 0.0s Piracy | 1 1 0.1s Persistent tasks | 1 1 47.1s RNG of the outermost testset: Random.Xoshiro(0xe106a7305b82732c, 0xd7fade9721e6c236, 0x0025cdc25c26588d, 0x17fcbc50841a93d9, 0x119d6df52ab07f7e) 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 263.81s 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] 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 498.23s: package has test failures