Package evaluation to test QuasiNewtonMethods on Julia 1.14.0-DEV.2225 (e5d7225bad*) started at 2026-05-26T07:07:09.205 ################################################################################ # Set-up # Installing PkgEval dependencies (TestEnv)... Activating project at `~/.julia/environments/v1.14` Set-up completed after 13.86s ################################################################################ # 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 v0.12.173 [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 v0.6.43 [431bcebd] + SciMLPublic v1.0.1 ⌅ [aedffcd0] + Static v0.8.10 [0d7ed370] + StaticArrayInterface v1.10.0 ⌅ [7792a7ef] + StrideArraysCore v0.4.17 [8290d209] + ThreadingUtilities v0.5.5 [3a884ed6] + UnPack v1.0.2 [3d5dd08c] + VectorizationBase v0.21.72 [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 v1.13.0 [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 v1.5.1+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 To see why use `status --outdated -m` Installation completed after 4.17s ################################################################################ # Precompilation # Precompiling PkgEval dependencies... Precompiling package dependencies... Precompiling project... 5.7 s ✓ StaticArrayInterface 1.1 s ✓ StaticArrayInterface → StaticArrayInterfaceOffsetArraysExt 2.2 s ✓ LayoutPointers 1.2 s ✓ CloseOpenIntervals 16.1 s ✓ VectorizationBase 2.0 s ✓ StrideArraysCore 3.5 s ✓ SLEEFPirates 3.9 s ✓ VectorizedRNG 39.5 s ✓ LoopVectorization 3.8 s ✓ VectorizedRNG → VectorizedRNGStaticArraysExt 42.1 s ✓ VectorizedStatistics 13.6 s ✓ QuasiNewtonMethods 14.2 s ✓ Octavian 14.5 s ✓ StrideArrays 14 dependencies successfully precompiled in 167 seconds. 56 already precompiled. Precompilation completed after 188.25s ################################################################################ # Testing # Testing QuasiNewtonMethods Status `/tmp/jl_kbIxC7/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_kbIxC7/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 v0.12.173 [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 v0.6.43 [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 v0.5.5 [3a884ed6] UnPack v1.0.2 [3d5dd08c] VectorizationBase v0.21.72 [33b4df10] VectorizedRNG v0.2.25 [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 v1.13.0 [56ddb016] Logging v1.11.0 [d6f4376e] Markdown v1.11.0 [ca575930] NetworkOptions v1.3.0 [44cfe95a] Pkg v1.14.0 [de0858da] Printf v1.11.0 [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 v1.5.1+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 = [-3.4505731605349865e-13, -4.547473508864641e-13] QuasiNewtonMethods.optimum(state) .- 1 = [1.6787193857226157e-10, 3.205771204051189e-10] n = 3 QuasiNewtonMethods.optimum(state) .- 1 = [-1.199040866595169e-14, -2.5202062658991053e-14, -1.2656542480726785e-14] QuasiNewtonMethods.optimum(state) .- 1 = [1.1155520951433573e-12, 2.90656387846866e-12, -5.10702591327572e-15] n = 4 QuasiNewtonMethods.optimum(state) .- 1 = [5.979661210631093e-13, -6.9544370262519806e-12, 3.0906388559515108e-12, -1.3545276011939222e-11] QuasiNewtonMethods.optimum(state) .- 1 = [3.2382163617228343e-10, -4.900448935529766e-10, 6.643157135499678e-10, -9.666470957014894e-10] n = 5 QuasiNewtonMethods.optimum(state) .- 1 = [4.242162177092723e-12, -5.173750317055692e-12, 8.885336910680053e-12, -8.243405957841787e-12, 1.2603473820149702e-11] QuasiNewtonMethods.optimum(state) .- 1 = [2.924349651323155e-11, 6.292344423286522e-11, 5.1660897781857784e-11, 1.262536741819531e-10, -8.426592756904938e-13] n = 6 QuasiNewtonMethods.optimum(state) .- 1 = [-3.8202663255049174e-11, 1.4242895751692686e-10, 3.134603687726667e-12, -6.83560985592635e-11, 2.7238167277232606e-10, 6.177502953619296e-12] QuasiNewtonMethods.optimum(state) .- 1 = [1.0424328067415445e-11, 2.332711801500409e-11, 7.925216038984217e-12, 2.070610349846902e-11, 4.154432353686843e-11, 1.5310197554185834e-11] n = 7 QuasiNewtonMethods.optimum(state) .- 1 = [1.0990985899184125e-11, -7.602485307955931e-11, 1.3940848475613166e-11, 1.9089396730009867e-11, -1.5385392959643696e-10, 3.165934181481589e-11, -6.687983500341943e-13] QuasiNewtonMethods.optimum(state) .- 1 = [6.052580658888473e-11, 1.1177192504874256e-10, 7.65725260976069e-11, 1.2622036749121435e-10, 2.328357506797829e-10, 1.2996936860076858e-10, -2.4821256161544625e-12] n = 8 QuasiNewtonMethods.optimum(state) .- 1 = [5.895417487522536e-11, 7.026201842563751e-11, -8.611955593096354e-11, 3.28384208714283e-10, 9.768941211518722e-11, 1.4579071283549183e-10, -1.67648561699707e-10, 6.628677606812516e-10] QuasiNewtonMethods.optimum(state) .- 1 = [-2.2897905793684004e-11, -1.22335475083446e-12, 5.777600620149315e-13, 3.646860591288714e-12, -4.7084447452050426e-11, -2.3462343179403433e-12, 8.566480858007708e-13, 6.229239346566828e-12] n = 9 QuasiNewtonMethods.optimum(state) .- 1 = [-1.2949197270017976e-11, 2.6043611711656922e-11, 4.3520742565306136e-13, 2.3800961201914106e-11, -2.5338176001810098e-11, 5.24904564258577e-11, -1.311839525897085e-12, 4.69986272122469e-11, -1.821875983409882e-13] QuasiNewtonMethods.optimum(state) .- 1 = [-3.2509661629376296e-11, 1.7227241855266584e-10, 1.4452883334570288e-11, -1.2902201529385593e-10, -6.242972805381442e-11, 3.62723628910544e-10, 2.8673952101598843e-11, -2.771612939156398e-10, -1.886713008047991e-10] n = 10 QuasiNewtonMethods.optimum(state) .- 1 = [-1.3706769053101198e-10, 2.8312419075859907e-10, 3.141531479400328e-11, -8.85697071240088e-11, 3.8793190881847295e-11, -2.673056220814374e-10, 5.792268886750662e-10, 7.186384820556668e-11, -1.682577410733188e-10, 7.989653383333462e-11] QuasiNewtonMethods.optimum(state) .- 1 = [2.4624746686185972e-11, 1.1248979525646519e-10, 1.415583206210158e-10, -6.05060446190464e-11, -1.7427836951355857e-11, 5.83024739597704e-11, 2.1213808487630104e-10, 2.9265456724658634e-10, -1.2252021619474363e-10, -3.8173131322594145e-11] n = 11 QuasiNewtonMethods.optimum(state) .- 1 = [5.8024918203614106e-11, 2.109543650874457e-10, 1.7217383074807913e-10, -9.52551371113941e-11, -1.0840650599419632e-10, 1.2063483545432518e-10, 4.164311118159958e-10, 3.54258622436987e-10, -1.9917378857314816e-10, -2.2534019095132862e-10, 9.103828801926284e-15] QuasiNewtonMethods.optimum(state) .- 1 = [-1.5880852188843164e-11, 2.7519542200593605e-11, -5.93337601273447e-11, 1.3296475032120725e-11, 1.3635759188446173e-11, -3.385203228845057e-11, 5.0322412903369695e-11, -1.201860833077717e-10, 3.274647220052884e-11, 2.7363666887936233e-11, 1.3830936396175275e-11] n = 12 QuasiNewtonMethods.optimum(state) .- 1 = [-7.731704165792053e-11, -8.802736317647941e-12, 1.965414497817619e-10, 9.005995948996315e-11, -3.271812820671016e-10, -8.837908183068066e-11, -1.5590440050061716e-10, -1.8444579197307576e-11, 3.9624103997937254e-10, 1.7626899939671148e-10, -6.623156467711055e-10, -1.8897450271282423e-10] QuasiNewtonMethods.optimum(state) .- 1 = [5.92588200731825e-11, 7.042544325486233e-11, 5.827160975968582e-11, 2.780931041002077e-11, 3.157296646350005e-11, 4.813038856354979e-12, 1.1783773956608457e-10, 1.3399081844056582e-10, 1.1981393654991734e-10, 5.2307935760609325e-11, 6.078848535651105e-11, 9.747758156208874e-12] n = 13 QuasiNewtonMethods.optimum(state) .- 1 = [1.085131984268628e-11, -9.66460245166445e-12, 1.1701528634944225e-11, -2.1908475034138064e-11, -5.730527163905208e-12, 1.5677903419941686e-11, 2.404432208891194e-11, -1.9402812689861548e-11, 2.0323742688788116e-11, -4.2188808002663336e-11, -6.844746991419015e-12, 2.6140867248614086e-11, 1.823208251039432e-12] QuasiNewtonMethods.optimum(state) .- 1 = [-5.614397835529417e-13, -8.306133558733109e-12, -2.563749212924904e-11, -3.828715122722315e-12, 2.934985587899064e-12, -1.4812595594548839e-12, -1.1504130981165872e-12, -1.64896984955476e-11, -4.888955906778847e-11, -7.174705274337612e-12, 5.77782266475424e-12, -2.177813485104707e-12, -1.2512213487525514e-13] n = 14 QuasiNewtonMethods.optimum(state) .- 1 = [1.1308021186096084e-10, 2.1557733376198485e-10, -1.2209344646407772e-11, -4.852540591571142e-11, -1.4343037868513875e-10, 9.018563673635072e-12, 1.988911257910786e-10, 2.492783757190864e-10, 4.2134873368127046e-10, -2.5161650540894698e-11, -9.187028915391693e-11, -2.800238929623333e-10, 2.752909011860538e-12, 3.992806085761913e-10] QuasiNewtonMethods.optimum(state) .- 1 = [7.925438083589142e-11, -5.1374571263806956e-11, -1.237610014470647e-11, 7.761324916089052e-11, -7.022160630754115e-13, -3.466138487340231e-11, 4.9647175259792675e-11, 1.6187517992705125e-10, -1.0285350349192868e-10, -2.4484858585083202e-11, 1.5829404453882034e-10, -1.1043610470551357e-11, -7.076150776441636e-11, 1.0028444741294607e-10] n = 15 QuasiNewtonMethods.optimum(state) .- 1 = [-1.5734857861104956e-11, 4.0897507602721817e-11, -7.933897983036786e-11, -1.9421575458977713e-11, -2.307432023229694e-11, 1.2180922936977367e-11, -2.0010437751238896e-11, -2.934696929912661e-11, 8.11684053303452e-11, -1.690684259259001e-10, -3.8849701233800715e-11, -4.3447467845680876e-11, 2.1352919432615636e-11, -4.3268721938716226e-11, -2.758904216193514e-13] QuasiNewtonMethods.optimum(state) .- 1 = [6.77036204876913e-12, 1.39463773862758e-10, 3.6542013859275357e-10, 5.4069193566874674e-11, 1.5948353748740374e-11, 3.240208101829012e-11, 6.054245993425411e-11, 8.634648551719692e-12, 2.7160029780759487e-10, 7.140257274329542e-10, 1.1135825594976723e-10, 2.010547284214681e-11, 6.969758103991808e-11, 1.319300224622566e-10, -7.164269177906135e-13] n = 16 QuasiNewtonMethods.optimum(state) .- 1 = [-1.5639822770197043e-11, -6.828537735259488e-12, -1.0263079275318887e-10, 9.227130171041154e-11, 1.0500267322299806e-11, 4.4775738672342413e-11, 4.0935477230164e-11, 1.8532664292081336e-10, -3.4352964917161444e-11, -1.3780088181647443e-11, -1.9591128719298467e-10, 1.7440027200166242e-10, 2.2351231976358577e-11, 9.013012558511946e-11, 7.806599811033266e-11, 3.6082314913699065e-10] QuasiNewtonMethods.optimum(state) .- 1 = [1.8458123918208003e-11, -4.082223448165223e-11, 1.546629491144813e-11, -3.379097002209619e-11, -7.303713189799055e-12, -6.95310475862243e-12, 1.8986145988719727e-11, 1.507083347007665e-11, 3.1780578169104956e-11, -8.562828224256691e-11, 3.762967715204013e-11, -6.083211712137881e-11, -1.473277055907829e-11, -9.458434035991559e-12, 4.176836654323779e-11, 3.6487701748910695e-11] n = 17 QuasiNewtonMethods.optimum(state) .- 1 = [7.409184377138445e-12, 1.4761525335416081e-12, -3.070865783882937e-11, -2.2367108165610716e-11, 4.967604105843293e-11, 6.198885849073577e-11, -4.4797499043625066e-13, -8.042788657292022e-12, 2.1296742147569603e-11, 6.514788708500419e-13, -6.740841218544347e-11, -4.175959578134325e-11, 9.119571764415468e-11, 1.230930912754502e-10, 3.717026686445024e-13, -1.486555323282346e-11, -8.197886813832156e-13] QuasiNewtonMethods.optimum(state) .- 1 = [6.38404884512056e-11, -2.6541435715898842e-11, -4.811462339660011e-11, -3.0930480399149474e-11, -3.935707315605441e-11, -9.28365162522482e-11, 5.2238213754662866e-11, -8.318778998983589e-11, 1.2765211110377095e-10, -4.664935104869983e-11, -8.489808855927095e-11, -5.86329873542013e-11, -8.204759094354586e-11, -1.8672119406204502e-10, 1.0408163220176903e-10, -1.7043377820158412e-10, 7.700062809590236e-12] n = 18 QuasiNewtonMethods.optimum(state) .- 1 = [1.0158984764530032e-10, -2.2383872533282556e-11, 1.003663818721634e-11, -1.5304202349852858e-11, -7.820688541215759e-11, 1.104993874179172e-10, -1.2137690852398464e-10, -5.037414929631723e-11, -5.291100890758571e-11, 2.0025670011136754e-10, -4.048938961886961e-11, 2.65898414397725e-11, -3.2210012435029967e-11, -1.5296919286811317e-10, 2.2771984298231018e-10, -2.4984003754724426e-10, -8.443368226807024e-11, -1.0101730563150113e-10] QuasiNewtonMethods.optimum(state) .- 1 = [-2.4064206183282977e-10, 9.938938561049326e-11, 2.131552712114626e-10, -1.976604435682816e-10, -2.717603919677458e-10, -1.3221668204721482e-10, -5.4550697292654604e-11, -3.722705477215982e-10, -2.700091261687021e-10, -4.679048259959018e-10, 2.2247159670030214e-10, 4.2912295938890566e-10, -4.1651659898889193e-10, -5.431713967496421e-10, -2.507459795353384e-10, -1.0597511757026723e-10, -7.47144235369035e-10, -5.432104766001089e-10] n = 19 QuasiNewtonMethods.optimum(state) .- 1 = [3.7013725417978094e-11, -6.590950007989704e-11, -7.38165084612774e-12, 9.197309580599722e-12, -1.2225953582856164e-10, 8.772138571089272e-11, -5.109623835153343e-11, -5.6772364587232005e-12, -1.1183276527049202e-11, 7.796407963667207e-11, -1.3604839477210362e-10, -1.8421042469185522e-11, 1.6046497464117238e-11, -2.3813639948855325e-10, 1.8030044124373035e-10, -1.0054523880143051e-10, -1.0656031612654715e-11, -2.312150471084351e-11, 1.5365486660812167e-13] QuasiNewtonMethods.optimum(state) .- 1 = [6.107225836160524e-11, 5.7919002927064867e-11, 5.079736631330434e-11, 4.5133230486271714e-11, 6.743428038191723e-11, 1.2051026843096224e-10, 2.416848943198602e-10, -5.509592782004802e-12, 1.9622969915644717e-11, 1.3089329620186163e-10, 1.0652456694515422e-10, 9.885492424643871e-11, 1.0936807015582417e-10, 1.4248535684657782e-10, 2.469757731660138e-10, 4.928522034930438e-10, -1.9451329436037668e-11, 3.6250336066245836e-11, -2.4140689447449404e-12] n = 20 QuasiNewtonMethods.optimum(state) .- 1 = [3.087419209180098e-11, 1.0464629163209338e-10, -6.813316577591877e-11, 2.46714648710622e-10, 6.872458158113659e-11, 3.767719469749409e-11, 6.939759877866436e-11, 6.970468646727568e-11, -1.2194889542627152e-10, 1.6900525423579893e-10, 7.74649233648006e-11, 2.1667911909162285e-10, -1.3990186786827508e-10, 4.75137040822915e-10, 1.353708256601749e-10, 7.267275670130857e-11, 1.468904997636855e-10, 1.363023027778354e-10, -2.4404167575653446e-10, 3.326061648323275e-10] QuasiNewtonMethods.optimum(state) .- 1 = [6.275358011009757e-11, 1.1323608717361822e-11, -3.90016907658719e-11, -6.3788974102862994e-12, -6.910005900806482e-11, -2.8748226021946266e-11, -1.3878120874721844e-11, 5.7009730269896863e-11, 3.2522873283369336e-11, -4.584221890979734e-11, 1.256992288034553e-10, 2.2729818027755755e-11, -7.617440012097632e-11, -1.1426082302534724e-11, -1.440818575559888e-10, -5.5967785961286154e-11, -2.6665558650051935e-11, 1.18899778911441e-10, 5.958367133018783e-11, -9.203093842558019e-11] n = 21 QuasiNewtonMethods.optimum(state) .- 1 = [-2.810975896494483e-10, 1.8301604676196348e-10, 4.0774295051448917e-10, 1.1316569903385698e-10, 2.4417201593962545e-10, 3.362288225616794e-11, -4.145683796252797e-12, 1.803479587891843e-10, 1.7700441112822318e-10, -4.460826152907771e-10, -5.532057034685067e-10, 3.675775239742052e-10, 8.215761404528621e-10, 2.2180968173302062e-10, 4.955504895320928e-10, 6.533218410709196e-11, -3.213518340317023e-11, 3.6178726681157514e-10, 3.372062629125594e-10, -9.110859844341235e-10, -7.1987971139719775e-12] QuasiNewtonMethods.optimum(state) .- 1 = [-2.4016233446388924e-11, -1.3850254276803753e-11, -3.4355296385513157e-11, 2.934075205018871e-11, -2.8466118351389014e-11, 3.524069924765172e-12, 1.9262369477246466e-11, 3.75655062612168e-12, 2.8492319614770167e-11, -1.317534970013412e-11, -4.371369932698599e-11, -2.8160918041919558e-11, -7.035372284747154e-11, 5.970623995210644e-11, -5.7474469628004954e-11, 6.4570571112199104e-12, 3.2457148080311526e-11, 6.199707414111799e-12, 5.90867355043656e-11, -3.088529432204723e-11, 4.340083847864662e-12] n = 22 QuasiNewtonMethods.optimum(state) .- 1 = [-5.0139670193516395e-11, -6.811551322982723e-11, -1.3489054317972204e-10, 3.10322878505076e-11, 1.1728085169693259e-10, 8.094591663621031e-11, -7.682188218893771e-11, 5.4583004782671196e-11, 1.295197282757954e-10, -3.4168556872771205e-11, 2.456412850904144e-11, -9.893430519269941e-11, -1.2694356676945517e-10, -2.6090607452289305e-10, 6.335354463260501e-11, 2.5490543009709654e-10, 1.81912707120091e-10, -1.5012147080994964e-10, 1.1606826610943699e-10, 2.546947097670227e-10, -5.836320315921739e-11, 4.485145588262185e-11] QuasiNewtonMethods.optimum(state) .- 1 = [1.3348966376725002e-10, 1.7854140388351425e-10, 2.6463387037267694e-10, -1.6836532168440499e-12, 1.2199463661488608e-10, -1.949725936256641e-10, -9.718226223753845e-12, 8.01314570253453e-11, 5.200417874107188e-11, 2.7776447808491866e-11, -8.597589307157705e-11, 2.635478502099886e-10, 3.502178547165613e-10, 5.273246284076549e-10, -3.992806085761913e-12, 2.540045951349157e-10, -4.1346814860787617e-10, -1.1519007969695849e-11, 1.6058065988033832e-10, 9.096501329963758e-11, 5.6523008495901195e-11, -1.6427492699477853e-10] n = 23 QuasiNewtonMethods.optimum(state) .- 1 = [1.3791190411893695e-12, 5.792744062205202e-11, -1.787059389357637e-11, -2.8147928432531444e-11, 6.93021195985466e-11, 6.475930902638538e-12, -2.11951567408164e-11, -5.1995519001479806e-11, 1.6937118374471538e-11, -5.898848076668628e-11, 4.2935877075933604e-11, 1.511235581119763e-12, 1.2073142485746757e-10, -3.401001702485473e-11, -6.018952003472577e-11, 1.3848233670898935e-10, 1.4566570172291904e-11, -3.9965364351246535e-11, -1.0597456245875492e-10, 3.2954083906133746e-11, -1.1779788255950052e-10, 7.679989977305013e-11, -3.344757804057963e-11] QuasiNewtonMethods.optimum(state) .- 1 = [2.1087354085125298e-11, -1.6813994641040608e-11, -3.4389602276974074e-11, 9.467093775583635e-11, -1.303238628125314e-10, 2.3562707340829547e-11, -7.262268564289798e-11, -1.9633628056681118e-11, -4.4694070666650987e-10, -1.7167467447620766e-10, 7.050227068816639e-11, 3.5649705409923627e-11, -2.1456725285418088e-11, -5.661093815945151e-11, 1.8010504199139632e-10, -2.7076485498156444e-10, 4.8039350275530524e-11, -1.4009537974146724e-10, -4.335287684398281e-11, -8.862146572141683e-10, -3.4956848526945805e-10, 1.3628054240655274e-10, 3.416311677995054e-11] n = 24 QuasiNewtonMethods.optimum(state) .- 1 = [1.890412271166042e-10, -6.637312921498051e-11, -1.1261780397120447e-10, -2.1767809776918057e-11, 7.169154159214486e-12, 5.49555956297354e-11, 2.6262103602903153e-11, -1.1127987420422869e-11, 7.455702721870239e-11, -3.734978992753213e-11, 3.957101313289968e-11, -8.374623217122235e-11, 3.828708461384167e-10, -1.214400802140858e-10, -2.268475407518622e-10, -4.171729628410503e-11, 1.8411050461963896e-11, 9.976774961728552e-11, 4.5348169663839144e-11, -2.4535595777308572e-11, 1.5377010775807776e-10, -7.680533986587079e-11, 7.23758830645238e-11, -1.6735446362048378e-10] QuasiNewtonMethods.optimum(state) .- 1 = [-5.961953153388322e-11, 4.168776435165e-11, -5.597744490160039e-12, -1.7109091920985975e-11, -3.6908809342151017e-11, -6.086064985311168e-11, -1.4662937530829367e-11, 2.779065866320707e-11, 7.020561909598655e-11, -1.0452472221089693e-10, 7.414069358446795e-13, -4.114375506958368e-12, -1.1893297457987728e-10, 8.249978478147568e-11, -1.3000822640663046e-11, -2.8384627981381527e-11, -7.65645324918296e-11, -1.3783418850721318e-10, -3.2423064233455534e-11, 6.319855749836734e-11, 1.4449752505640845e-10, -2.1488799628599509e-10, 5.602407426863465e-12, -7.518541345064023e-12] Test Summary: | Pass Fail Total Time QuasiNewtonMethods.jl | 148 1 149 3m57.9s Method ambiguity | 1 1 9.0s 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 6.8s Compat bounds | 3 1 4 8.9s julia | 1 1 0.1s Base.PkgId(Base.UUID("64452400-c6f4-4a1d-a4f6-ad403655768a"), "QuasiNewtonMethods") deps | 1 1 0.5s Base.PkgId(Base.UUID("64452400-c6f4-4a1d-a4f6-ad403655768a"), "QuasiNewtonMethods") extras | 1 1 8.3s Base.PkgId(Base.UUID("64452400-c6f4-4a1d-a4f6-ad403655768a"), "QuasiNewtonMethods") weakdeps | 1 1 0.0s Piracy | 1 1 0.1s Persistent tasks | 1 1 53.6s RNG of the outermost testset: Random.Xoshiro(0xa74ab10a9c75c3bd, 0x6e28c0c67b8f1309, 0x7947cd5aa5ff6dba, 0x44204533273b09c6, 0x2d0dda895fbd65e4) 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 259.44s 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 488.32s: package has test failures