Package evaluation to test QuasiNewtonMethods on Julia 1.10.10 (c8be17dcfd*) started at 2026-02-02T19:07:24.050 ################################################################################ # Set-up # Installing PkgEval dependencies (TestEnv)... Activating project at `~/.julia/environments/v1.10` Set-up completed after 5.22s ################################################################################ # Installation # Installing QuasiNewtonMethods... Resolving package versions... Updating `~/.julia/environments/v1.10/Project.toml` [64452400] + QuasiNewtonMethods v0.1.4 Updating `~/.julia/environments/v1.10/Manifest.toml` [79e6a3ab] + Adapt v4.4.0 [4fba245c] + ArrayInterface v7.22.0 [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 v1.2.1 [21216c6a] + Preferences v1.5.1 [64452400] + QuasiNewtonMethods v0.1.4 [ae029012] + Requires v1.3.1 [94e857df] + SIMDTypes v0.1.0 [476501e8] + SLEEFPirates v0.6.43 ⌅ [aedffcd0] + Static v0.8.10 [0d7ed370] + StaticArrayInterface v1.8.0 ⌅ [7792a7ef] + StrideArraysCore v0.4.17 [8290d209] + ThreadingUtilities v0.5.5 [3a884ed6] + UnPack v1.0.2 [3d5dd08c] + VectorizationBase v0.21.72 [56f22d72] + Artifacts [2a0f44e3] + Base64 [ade2ca70] + Dates [8f399da3] + Libdl [37e2e46d] + LinearAlgebra [d6f4376e] + Markdown [de0858da] + Printf [9a3f8284] + Random [ea8e919c] + SHA v0.7.0 [fa267f1f] + TOML v1.0.3 [cf7118a7] + UUIDs [4ec0a83e] + Unicode [e66e0078] + CompilerSupportLibraries_jll v1.1.1+0 [4536629a] + OpenBLAS_jll v0.3.23+5 [8e850b90] + libblastrampoline_jll v5.11.0+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 To see why use `status --outdated -m` Installation completed after 9.59s ################################################################################ # Precompilation # Precompiling PkgEval dependencies... Precompiling package dependencies... Precompiling packages... 2621.2 ms ✓ StaticArrayInterface 826.3 ms ✓ StaticArrayInterface → StaticArrayInterfaceOffsetArraysExt 749.2 ms ✓ CloseOpenIntervals 929.9 ms ✓ LayoutPointers 14516.9 ms ✓ VectorizationBase 1574.4 ms ✓ StrideArraysCore 1933.3 ms ✓ SLEEFPirates 2457.0 ms ✓ VectorizedRNG 28326.0 ms ✓ LoopVectorization 1545.5 ms ✓ VectorizedRNG → VectorizedRNGStaticArraysExt 7866.8 ms ✓ QuasiNewtonMethods 29593.9 ms ✓ VectorizedStatistics 8912.3 ms ✓ Octavian 9760.4 ms ✓ StrideArrays 14 dependencies successfully precompiled in 114 seconds. 31 already precompiled. Precompilation completed after 126.4s ################################################################################ # Testing # Testing QuasiNewtonMethods Status `/tmp/jl_Vb707r/Project.toml` [4c88cf16] Aqua v0.8.14 [64452400] QuasiNewtonMethods v0.1.4 [d1fa6d79] StrideArrays v0.1.29 [8dfed614] Test Status `/tmp/jl_Vb707r/Manifest.toml` [79e6a3ab] Adapt v4.4.0 [4c88cf16] Aqua v0.8.14 [4fba245c] ArrayInterface v7.22.0 [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 v1.2.1 [21216c6a] Preferences v1.5.1 [64452400] QuasiNewtonMethods v0.1.4 [ae029012] Requires v1.3.1 [94e857df] SIMDTypes v0.1.0 [476501e8] SLEEFPirates v0.6.43 ⌅ [aedffcd0] Static v0.8.10 [0d7ed370] StaticArrayInterface v1.8.0 [1e83bf80] StaticArraysCore v1.4.4 [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 v1.1.1 [56f22d72] Artifacts [2a0f44e3] Base64 [ade2ca70] Dates [8ba89e20] Distributed [f43a241f] Downloads v1.6.0 [7b1f6079] FileWatching [b77e0a4c] InteractiveUtils [b27032c2] LibCURL v0.6.4 [76f85450] LibGit2 [8f399da3] Libdl [37e2e46d] LinearAlgebra [56ddb016] Logging [d6f4376e] Markdown [ca575930] NetworkOptions v1.2.0 [44cfe95a] Pkg v1.10.0 [de0858da] Printf [3fa0cd96] REPL [9a3f8284] Random [ea8e919c] SHA v0.7.0 [9e88b42a] Serialization [6462fe0b] Sockets [2f01184e] SparseArrays v1.10.0 [10745b16] Statistics v1.10.0 [fa267f1f] TOML v1.0.3 [a4e569a6] Tar v1.10.0 [8dfed614] Test [cf7118a7] UUIDs [4ec0a83e] Unicode [e66e0078] CompilerSupportLibraries_jll v1.1.1+0 [deac9b47] LibCURL_jll v8.4.0+0 [e37daf67] LibGit2_jll v1.6.4+0 [29816b5a] LibSSH2_jll v1.11.0+1 [c8ffd9c3] MbedTLS_jll v2.28.1010+0 [14a3606d] MozillaCACerts_jll v2025.12.2 [4536629a] OpenBLAS_jll v0.3.23+5 [bea87d4a] SuiteSparse_jll v7.2.1+1 [83775a58] Zlib_jll v1.2.13+1 [8e850b90] libblastrampoline_jll v5.11.0+0 [8e850ede] nghttp2_jll v1.52.0+1 [3f19e933] p7zip_jll v17.4.0+2 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. QuasiNewtonMethods [64452400-c6f4-4a1d-a4f6-ad403655768a] does not declare a compat entry for the following extras: 1-element Vector{Base.PkgId}: Test [8dfed614-e22c-5e08-85e1-65c5234f0b40] QuasiNewtonMethods [64452400-c6f4-4a1d-a4f6-ad403655768a] extras: Test Failed at /home/pkgeval/.julia/packages/Aqua/MCcFg/src/deps_compat.jl:60 Expression: isempty(result) Evaluated: isempty(Base.PkgId[Test [8dfed614-e22c-5e08-85e1-65c5234f0b40]]) Stacktrace: [1] macro expansion @ /opt/julia/share/julia/stdlib/v1.10/Test/src/Test.jl:673 [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] macro expansion @ /opt/julia/share/julia/stdlib/v1.10/Test/src/Test.jl:1582 [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 = [-1.2878587085651816e-14, -2.204902926905561e-13] QuasiNewtonMethods.optimum(state) .- 1 = [2.0117241206207837e-13, 3.439470930288735e-13] n = 3 QuasiNewtonMethods.optimum(state) .- 1 = [1.2454703934849931e-11, 2.6600277536203976e-11, -4.122258090433206e-13] QuasiNewtonMethods.optimum(state) .- 1 = [1.4593348751645863e-10, 2.836186840937671e-10, -3.550237881455587e-11] n = 4 QuasiNewtonMethods.optimum(state) .- 1 = [1.8898216325169415e-12, 7.101874643922201e-12, 3.7272407382715755e-12, 1.3820056210533949e-11] QuasiNewtonMethods.optimum(state) .- 1 = [2.769151574710804e-10, -1.330474064253906e-9, 5.383637979861078e-10, -2.6640044614723024e-9] n = 5 QuasiNewtonMethods.optimum(state) .- 1 = [-2.489297656893541e-11, 1.389999226830696e-13, -4.5785930602448843e-11, -8.163469900068776e-13, 2.0836887770769863e-11] QuasiNewtonMethods.optimum(state) .- 1 = [-4.62507809828594e-12, 6.157296894571118e-13, -9.168443781959468e-12, 6.816769371198461e-14, -3.0042635046356736e-13] n = 6 QuasiNewtonMethods.optimum(state) .- 1 = [3.313505025914765e-11, 1.3271805876513554e-10, -6.019307274840457e-11, 4.7698289762365675e-11, 2.703295365336089e-10, -1.0173817344139024e-10] QuasiNewtonMethods.optimum(state) .- 1 = [-4.6093129313362624e-11, -3.313682661598705e-11, 2.5091706490343313e-11, -9.011080770449098e-11, -6.59143850612054e-11, 5.078426568161376e-11] n = 7 QuasiNewtonMethods.optimum(state) .- 1 = [-9.503464681870355e-11, 1.364106605450388e-10, 8.774980742032312e-12, -1.8140999813454073e-10, 2.6855029311434464e-10, 2.268984999886925e-11, -1.4796164293784386e-11] QuasiNewtonMethods.optimum(state) .- 1 = [1.252309367316684e-10, 3.172995199918205e-11, -5.463929309001969e-11, 2.637119411730282e-10, 6.325473478341337e-11, -1.0860368160336975e-10, -1.3683498778505054e-12] n = 8 QuasiNewtonMethods.optimum(state) .- 1 = [-8.516976013339672e-11, 7.427392034742297e-13, 2.9012570124109516e-11, 5.31867883069026e-11, -1.7716084155239287e-10, -7.384426403689304e-12, 6.495959326002776e-11, 1.0843903552881784e-10] QuasiNewtonMethods.optimum(state) .- 1 = [-1.52433621281034e-13, 2.835731649497575e-12, -8.005263119059691e-12, 9.35829191917037e-12, -2.170708057747106e-12, 5.4858340092778235e-12, -1.6384449352813135e-11, 2.049560521300009e-11] n = 9 QuasiNewtonMethods.optimum(state) .- 1 = [1.286319939453051e-10, 4.7586601326088385e-11, 1.2590462006301095e-10, -8.676281915143136e-11, 2.5777424639272795e-10, 9.668976730381473e-11, 2.5221869037750366e-10, -1.7102785854206104e-10, 6.68636257472599e-11] QuasiNewtonMethods.optimum(state) .- 1 = [2.0374146814106098e-11, -8.891132274868596e-11, -1.191171605796626e-10, 1.2215339850740747e-11, 4.16442436090847e-11, -1.7832479937140988e-10, -2.4727164760207643e-10, 2.462074988329732e-11, -1.1501910535116622e-13] n = 10 QuasiNewtonMethods.optimum(state) .- 1 = [3.800293413291911e-12, -1.7445822564354785e-11, -6.2200244954624395e-12, -6.549982778381036e-12, 1.102296032229333e-11, 7.874367824456385e-12, -3.569566864314311e-11, -1.115141312624246e-11, -1.190958442975898e-11, 2.2892576723165803e-11] QuasiNewtonMethods.optimum(state) .- 1 = [-4.104716566644129e-11, 9.422906899203554e-12, 3.201372500427624e-11, -1.1939338406818933e-12, -7.17663706240046e-11, -8.544986940250965e-11, 1.770383839527767e-11, 6.249822881443379e-11, 1.3877787807814457e-13, -1.4190926211909982e-10] n = 11 QuasiNewtonMethods.optimum(state) .- 1 = [-2.8324564915749306e-11, -1.1691936308011464e-10, -1.095661339434173e-10, 1.0121592453060657e-10, 1.3422529754336665e-10, -6.560496590424236e-11, -2.356294048766472e-10, -2.0470181105736174e-10, 1.891067302750571e-10, 2.8811730778954825e-10, -1.9522194971699491e-10] QuasiNewtonMethods.optimum(state) .- 1 = [-1.9203527656941333e-11, -2.1417645434951282e-11, 1.6080470288670767e-12, 5.565437000143447e-11, -3.1885494244932033e-11, -3.782696378351602e-11, -4.294087307954442e-11, 3.0371261061645782e-12, 1.1174194902707768e-10, -6.405798114172967e-11, -5.115907697472721e-13] n = 12 QuasiNewtonMethods.optimum(state) .- 1 = [1.1607381722456012e-11, 2.149480593516273e-11, 7.389644451905042e-13, -4.1932790573184775e-11, -4.7163384309101275e-12, -5.06816810741384e-13, 2.176525626396142e-11, 4.02435862412176e-11, 3.745670440480353e-12, -8.229028569672892e-11, -5.7657212337858255e-12, 1.0369483049998962e-12] QuasiNewtonMethods.optimum(state) .- 1 = [4.087308269618006e-11, -5.967348837288e-11, -2.5803248426825576e-11, 1.31635591316126e-10, -1.0353273793839435e-11, -1.1232015317830246e-11, 8.517897498450111e-11, -1.176797548296804e-10, -4.955436061493401e-11, 2.6068658343092466e-10, -2.8226865289582292e-11, -1.9641732684760882e-11] n = 13 QuasiNewtonMethods.optimum(state) .- 1 = [-3.212463628443629e-11, -5.03463937207016e-12, -1.996292020578494e-11, -4.973377265571344e-11, 3.877609344726807e-11, -1.1602274696542736e-11, -6.000189234356412e-11, -1.1110445896633792e-11, -4.329059333230134e-11, -9.592016070314457e-11, 7.356870668218107e-11, -2.4876434245868495e-11, 8.799627693178991e-13] QuasiNewtonMethods.optimum(state) .- 1 = [2.9267699375168377e-11, 2.2590818105072685e-11, 2.451439051753823e-11, 4.8329784618772464e-11, -1.647382230629546e-10, 1.5287326959878555e-11, 5.288369742117993e-11, 4.3191006326992465e-11, 5.3877791117429297e-11, 1.0588729892901938e-10, -3.2409586125936585e-10, 2.876965332632153e-11, 2.0136559086836314e-11] n = 14 QuasiNewtonMethods.optimum(state) .- 1 = [-9.753864382844313e-11, 1.04620756502527e-10, -7.198686091669515e-13, -1.425126683329836e-11, -1.6211798570253677e-10, 2.967115442231716e-11, 2.0061530214832146e-10, -1.9134649420493588e-10, 1.9677859341982185e-10, -6.782685524342469e-12, -1.4839796058652155e-11, -3.428503037028463e-10, 7.746958630150402e-11, 4.039910628250709e-10] QuasiNewtonMethods.optimum(state) .- 1 = [-3.79221098967264e-11, -8.097411630103579e-11, -8.738454404522145e-12, -7.894684905807026e-12, -6.279476938431117e-11, 1.3952838884279117e-11, -3.313416208072795e-11, -7.97784061035145e-11, -1.5088330584944742e-10, -1.2141176952695787e-11, -1.6948109582415327e-11, -1.2197121090906649e-10, 1.924527204266724e-11, -7.03719305050754e-11] n = 15 QuasiNewtonMethods.optimum(state) .- 1 = [1.5215495530185308e-10, -3.199401854558914e-10, 4.6290593580522454e-10, -1.2971423934970971e-10, -2.5232267386599005e-9, 7.022555870150882e-10, 1.3954080113620648e-9, 3.046649599269813e-10, -6.439764277388349e-10, 9.316598603703596e-10, -2.6050539503330583e-10, -5.059851204691768e-9, 1.4083438859557873e-9, 2.793856479499368e-9, -2.6151414367348025e-11] QuasiNewtonMethods.optimum(state) .- 1 = [2.5398128045139856e-11, 4.287614707720877e-11, 2.5444979456779038e-11, 1.0202727551700264e-11, 2.2037260904994582e-11, -2.5777047163444422e-11, -1.2510770197593502e-11, 6.059019952431299e-11, 8.944645024655529e-11, 4.775713158267081e-11, 2.1956658713406796e-11, 4.579692181039263e-11, -5.521194612612135e-11, -2.618039118829074e-11, 2.3097079804301757e-12] n = 16 QuasiNewtonMethods.optimum(state) .- 1 = [-1.4154488692241785e-10, 1.9659385230852422e-11, -1.257738357907101e-10, 5.703526539946324e-11, 2.0195534133904403e-10, 1.604492094742227e-10, -2.649479524663434e-10, 1.0010547946137649e-10, -2.824531719625156e-10, 2.380518004940768e-11, -2.426325806936802e-10, 1.3520873309857961e-10, 4.0674907886284473e-10, 3.24255289285702e-10, -5.357727594912376e-10, 2.0944246337251116e-10] QuasiNewtonMethods.optimum(state) .- 1 = [-1.1253376008824034e-10, 8.288347785878614e-11, 6.718980927189477e-11, -1.0691270091456317e-10, -1.376715408341056e-10, -3.7506664440911663e-11, 1.4141288140478991e-10, -1.5954570997678275e-11, -2.3077428856765891e-10, 1.5964340960294976e-10, 1.1711831504612746e-10, -2.0653667665015973e-10, -2.801524567885849e-10, -7.406641966412053e-11, 2.816626931689825e-10, -3.1322500149144616e-11] n = 17 QuasiNewtonMethods.optimum(state) .- 1 = [3.74182906881515e-11, -4.797684471924413e-11, -5.8633875532621e-11, 6.173661581954093e-11, -2.729102499543501e-10, 2.353539585442377e-11, 4.599001179883544e-10, -1.2218637213123884e-10, 5.1040061066487397e-11, -9.977285664319879e-11, -1.0061329547284004e-10, 1.2332113108470821e-10, -5.40272160343136e-10, 6.810929598088933e-11, 9.164122793947627e-10, -2.5163704453490254e-10, -6.675771047071066e-13] QuasiNewtonMethods.optimum(state) .- 1 = [-2.8088309456109073e-11, 4.9819259828609574e-11, -8.93578544491902e-11, -1.509381508668639e-11, 1.2218781542117085e-10, -1.9710788556892567e-11, -5.289080284853753e-11, -5.4229398749328084e-11, -5.849754014519704e-11, 1.0214806778208185e-10, -1.7990720024840812e-10, -2.7583491046812014e-11, 2.46551667970607e-10, -2.9657387656811807e-11, -1.2646805824800822e-10, -9.971812264808477e-11, 2.7282842651743522e-11] n = 18 QuasiNewtonMethods.optimum(state) .- 1 = [3.059086317591664e-11, 3.821609695364714e-11, 1.248556813493451e-11, -2.535105458889575e-11, 2.6683100173841012e-11, 7.185807504583863e-12, 3.7507552619331364e-11, -1.4644285784015665e-11, 2.5242252732482484e-11, 6.238898286881067e-11, 7.581157923652881e-11, 2.7634783350549696e-11, -4.393396757507162e-11, 5.6740612208727725e-11, 1.2762013668066174e-11, 7.30944194060612e-11, -2.6185276169599092e-11, 4.3890446832506314e-11] QuasiNewtonMethods.optimum(state) .- 1 = [1.3477197136069208e-10, -1.5282963783391779e-10, 6.355249659861784e-11, -3.302613738043192e-11, -2.8738345037027102e-11, 4.119149465964256e-11, 3.193112441124413e-11, 4.207234560738016e-11, -1.1548784151216296e-10, 2.8551183639535793e-10, -2.9857616379302954e-10, 1.386957215743223e-10, -7.236777843644404e-11, -5.767408772783256e-11, 8.506750859282874e-11, 6.64466259792107e-11, 9.38358279967133e-11, -2.2166390944988734e-10] n = 19 QuasiNewtonMethods.optimum(state) .- 1 = [-2.9915936394786513e-10, 1.614985922770984e-10, -7.94860843811307e-11, 9.051959182215796e-11, 2.0139467871160832e-10, -1.6829293514319943e-10, 4.407874065748274e-11, -4.86596318793886e-11, 3.7069014524604427e-11, -6.188146661756377e-10, 3.30700355988256e-10, -1.6791878998390075e-10, 1.739033361758402e-10, 4.0059844330642136e-10, -3.3817637579147686e-10, 8.699108100529429e-11, -8.172118537430606e-11, 5.3784088294150934e-11, 1.795008586213953e-12] QuasiNewtonMethods.optimum(state) .- 1 = [-2.945310662028078e-11, -9.48896516916875e-11, 4.2626568941273035e-11, -4.6215364868373854e-11, 7.483991204537688e-11, -5.930811397547586e-12, 2.571654000860235e-11, 1.3625545136619621e-11, 1.1158607371442031e-10, -5.663181035231446e-11, -1.8493995224133641e-10, 8.471978674151615e-11, -8.917366844940489e-11, 1.442574948384845e-10, -1.1256107157464612e-11, 5.0036863541436105e-11, 2.7587487849700665e-11, 2.2357049545007612e-10, -2.713662627940039e-11] n = 20 QuasiNewtonMethods.optimum(state) .- 1 = [-1.4742651543997454e-11, 1.195510357376861e-11, -6.35383967662051e-11, 9.96425164601078e-12, 4.995182045774982e-11, -4.4465098270052295e-11, 2.844879887220486e-11, -2.1119994642049278e-11, 2.0763613051144603e-11, -4.0032421821933895e-12, -2.8708591059967148e-11, 2.3591795184074726e-11, -1.2552137107491035e-10, 1.932520810044025e-11, 1.0272005468436873e-10, -9.099687670044432e-11, 5.397682301122586e-11, -3.433375805883543e-11, 4.129896424842627e-11, -7.2695183206406e-12] QuasiNewtonMethods.optimum(state) .- 1 = [5.887312859442773e-11, 1.361710744163247e-11, -4.853084600853208e-11, 8.07152122916932e-11, 4.424238753131249e-11, 1.0583467435765215e-10, -2.9968472148311776e-11, -7.408540447784162e-11, -2.9462210449082704e-11, 5.6691984440249144e-11, 1.145283867742819e-10, 2.1102675162865125e-11, -9.852196836135363e-11, 1.682598504970656e-10, 9.09590180953046e-11, 2.17839746241566e-10, -6.153699771971333e-11, -1.4914425250367458e-10, -5.39088773621188e-11, 1.1005485411885729e-10] n = 21 QuasiNewtonMethods.optimum(state) .- 1 = [-2.1616486378661648e-11, 1.7088774839635335e-11, -5.285183402037319e-11, -5.628797428158805e-11, 6.98219260186761e-11, 1.7999890467024215e-10, -2.8275548569212106e-10, 3.461231301571388e-12, 9.842837656037773e-11, 2.513611541132832e-11, -4.9456883033371923e-11, 3.578493057432297e-11, -1.0182621412724302e-10, -1.0128509142504072e-10, 1.4554313310100042e-10, 3.677300686177887e-10, -5.640621303371063e-10, 4.965583499938475e-12, 2.0384405274853634e-10, 4.437805678492168e-11, -2.4807933485249123e-12] QuasiNewtonMethods.optimum(state) .- 1 = [1.1002510014179734e-10, -3.0147551122183813e-11, -8.798939354903723e-11, -5.2758464264002214e-11, -3.357880640209032e-11, -4.469746794910634e-11, 2.3597546139342285e-10, -1.836806262645041e-10, 1.0541878481262756e-10, 9.091172259445557e-11, 2.19448015315038e-10, -6.094325044614379e-11, -1.7113555017544968e-10, -1.0181910869988542e-10, -6.760847437448092e-11, -8.883671576143115e-11, 4.764337813156772e-10, -3.644073931496905e-10, 2.1660384597055327e-10, 1.795983362029574e-10, -5.048739204482899e-12] n = 22 QuasiNewtonMethods.optimum(state) .- 1 = [9.973488701575661e-11, -3.696376538186996e-11, -4.6835535449929466e-11, 3.1578850645530565e-10, 1.2846612662542611e-11, -5.642564193664157e-11, 1.0665734961889939e-10, 1.7241097438613906e-11, -1.5248835527614801e-10, 8.593414868585114e-11, -1.0201128830544803e-10, 2.0824142410447166e-10, -7.60544960343168e-11, -9.267164813309137e-11, 6.364968552219352e-10, 3.6058267482985684e-11, -1.0950407247634075e-10, 2.1854740239746206e-10, 2.987032843293491e-11, -3.1153857271704055e-10, 1.7881096603389324e-10, -2.0503376774172466e-10] QuasiNewtonMethods.optimum(state) .- 1 = [-2.763889117574081e-11, -4.564681965746331e-12, -5.279277015546313e-11, 1.6588286300134314e-11, -3.337430332095437e-11, 1.993738507621856e-12, 1.31215038834398e-11, 8.8697937883353e-12, 4.604316927725449e-12, -7.065870111233608e-11, -3.3197222748526656e-11, -6.02442540298398e-11, -8.265388373729365e-12, -1.0679623851928e-10, 2.8952396036174832e-11, -7.030864779267176e-11, 4.7835069238999495e-12, 2.945843569079898e-11, 1.467492793949532e-11, 8.900880033024805e-12, -1.416806671983295e-10, -6.836531341036789e-11] n = 23 QuasiNewtonMethods.optimum(state) .- 1 = [-1.8186496753003212e-10, 1.1425171919654531e-10, 1.0205947198471677e-10, -8.232081682990611e-11, -4.736278036432395e-11, 1.3118106600984447e-10, 2.7676083647065752e-11, 4.792255481333996e-11, -3.728617414822111e-11, -4.615197113366776e-13, 5.51418910532675e-11, -3.664981651496646e-10, 2.3592594544652457e-10, 2.0536550238148266e-10, -1.647346703492758e-10, -9.316092342004367e-11, 2.7534263757900135e-10, 5.676814573973843e-11, 1.0004796990870091e-10, -7.932399181953542e-11, -6.3408167605416565e-12, 1.0414247242351848e-10, -3.977596030324548e-12] QuasiNewtonMethods.optimum(state) .- 1 = [2.493005801795789e-11, 1.560396256650165e-11, 1.9448354038331672e-10, 2.3854251907096113e-11, -1.4061418696087458e-11, -1.0268474959218565e-10, -1.0780210057959039e-10, -1.931066417881766e-11, -4.200195746761892e-12, 4.3934633708886395e-11, 4.567013434098044e-12, 4.9542148161663135e-11, 3.146527483011141e-11, 3.872715481634259e-10, 5.0253579075842936e-11, -2.6283419884975956e-11, -2.1695878427152593e-10, -2.199183057882692e-10, -3.5221159322418316e-11, -1.0051404153443855e-11, 9.150658009104973e-11, 8.773204385192912e-12, -1.4197532038906502e-12] n = 24 QuasiNewtonMethods.optimum(state) .- 1 = [5.5138116294983774e-12, -2.093258899549255e-11, 2.231126394747207e-11, -3.443056950658274e-11, 1.1038059355428231e-11, 2.3348878386286742e-11, -1.838307284174334e-12, 1.9348522783957378e-11, 1.8070211993403973e-11, -9.654721466745286e-12, -5.260236690673992e-13, -6.4898086904463526e-12, 1.0692335905559958e-11, -4.147437948631705e-11, 4.44828618384463e-11, -7.066536245048383e-11, 2.105426943899147e-11, 4.604960857079732e-11, -3.3009150968155154e-12, 3.84543508147317e-11, 3.5814462506778e-11, -1.944699956624163e-11, -1.300848317953296e-12, -1.1092349261332402e-11] QuasiNewtonMethods.optimum(state) .- 1 = [2.4016522104375326e-10, -4.08058808964995e-10, -7.618725650360147e-10, -2.172597657335018e-10, -1.2748424538244763e-10, 2.3151325301284942e-10, -8.647493832114606e-11, 2.2520363351929973e-10, 3.6744673970190433e-10, -7.386355971306102e-10, -5.601840102897881e-10, -3.0053626254300525e-10, 4.684186372116983e-10, -8.010427876570247e-10, -1.53640544731104e-9, -4.274753884203619e-10, -2.6462998459209075e-10, 4.734883596313466e-10, -1.6452461615301672e-10, 4.4192050019375984e-10, 7.18102022290168e-10, -1.4630285871675142e-9, -1.116530645717262e-9, -5.988251006172618e-10] Test Summary: | Pass Fail Total Time QuasiNewtonMethods.jl | 148 1 149 2m37.3s Method ambiguity | 1 1 5.0s Unbound type parameters | 1 1 0.2s Undefined exports | 1 1 0.0s Compare Project.toml and test/Project.toml | 1 1 0.3s Stale dependencies | 1 1 5.4s Compat bounds | 3 1 4 6.9s julia | 1 1 0.0s QuasiNewtonMethods [64452400-c6f4-4a1d-a4f6-ad403655768a] deps | 1 1 0.4s QuasiNewtonMethods [64452400-c6f4-4a1d-a4f6-ad403655768a] extras | 1 1 6.5s QuasiNewtonMethods [64452400-c6f4-4a1d-a4f6-ad403655768a] weakdeps | 1 1 0.0s Piracy | 1 1 0.2s Persistent tasks | 1 1 16.4s 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 171.75s ERROR: LoadError: Package QuasiNewtonMethods errored during testing Stacktrace: [1] pkgerror(msg::String) @ Pkg.Types /opt/julia/share/julia/stdlib/v1.10/Pkg/src/Types.jl:70 [2] test(ctx::Pkg.Types.Context, pkgs::Vector{Pkg.Types.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/v1.10/Pkg/src/Operations.jl:2034 [3] test @ /opt/julia/share/julia/stdlib/v1.10/Pkg/src/Operations.jl:1915 [inlined] [4] test(ctx::Pkg.Types.Context, pkgs::Vector{Pkg.Types.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::Base.PipeEndpoint}) @ Pkg.API /opt/julia/share/julia/stdlib/v1.10/Pkg/src/API.jl:444 [5] test(pkgs::Vector{Pkg.Types.PackageSpec}; io::Base.PipeEndpoint, kwargs::@Kwargs{julia_args::Cmd}) @ Pkg.API /opt/julia/share/julia/stdlib/v1.10/Pkg/src/API.jl:159 [6] test @ /opt/julia/share/julia/stdlib/v1.10/Pkg/src/API.jl:147 [inlined] [7] #test#74 @ /opt/julia/share/julia/stdlib/v1.10/Pkg/src/API.jl:146 [inlined] [8] top-level scope @ /PkgEval.jl/scripts/evaluate.jl:223 in expression starting at /PkgEval.jl/scripts/evaluate.jl:214 PkgEval failed after 320.12s: package has test failures