Package evaluation to test MetropolisAlgorithm on Julia 1.13.0-DEV.1296 (e8025198af*) started at 2025-10-12T11:19:38.871 ################################################################################ # Set-up # Installing PkgEval dependencies (TestEnv)... Set-up completed after 10.85s ################################################################################ # Installation # Installing MetropolisAlgorithm... Resolving package versions... Installed MetropolisAlgorithm ─ v0.0.1 Updating `~/.julia/environments/v1.13/Project.toml` [e0c51df9] + MetropolisAlgorithm v0.0.1 Updating `~/.julia/environments/v1.13/Manifest.toml` [e0c51df9] + MetropolisAlgorithm v0.0.1 [9a3f8284] + Random v1.11.0 [ea8e919c] + SHA v0.7.0 Installation completed after 0.95s ################################################################################ # Precompilation # Precompiling PkgEval dependencies... Precompiling packages... 4693.2 ms ✓ TestEnv 1 dependency successfully precompiled in 5 seconds. 27 already precompiled. Precompiling package dependencies... Precompilation completed after 94.58s ################################################################################ # Testing # Testing MetropolisAlgorithm Status `/tmp/jl_G7i41v/Project.toml` [31c24e10] Distributions v0.25.122 [e0c51df9] MetropolisAlgorithm v0.0.1 [de0858da] Printf v1.11.0 [8dfed614] Test v1.11.0 Status `/tmp/jl_G7i41v/Manifest.toml` [66dad0bd] AliasTables v1.1.3 [9a962f9c] DataAPI v1.16.0 [864edb3b] DataStructures v0.19.1 [31c24e10] Distributions v0.25.122 [ffbed154] DocStringExtensions v0.9.5 [1a297f60] FillArrays v1.14.0 [34004b35] HypergeometricFunctions v0.3.28 [92d709cd] IrrationalConstants v0.2.4 [692b3bcd] JLLWrappers v1.7.1 [2ab3a3ac] LogExpFunctions v0.3.29 [e0c51df9] MetropolisAlgorithm v0.0.1 [e1d29d7a] Missings v1.2.0 [bac558e1] OrderedCollections v1.8.1 [90014a1f] PDMats v0.11.35 [21216c6a] Preferences v1.5.0 [43287f4e] PtrArrays v1.3.0 [1fd47b50] QuadGK v2.11.2 [189a3867] Reexport v1.2.2 [79098fc4] Rmath v0.8.0 [a2af1166] SortingAlgorithms v1.2.2 [276daf66] SpecialFunctions v2.6.1 [10745b16] Statistics v1.11.1 [82ae8749] StatsAPI v1.7.1 [2913bbd2] StatsBase v0.34.6 [4c63d2b9] StatsFuns v1.5.0 [efe28fd5] OpenSpecFun_jll v0.5.6+0 [f50d1b31] Rmath_jll v0.5.1+0 [56f22d72] Artifacts v1.11.0 [2a0f44e3] Base64 v1.11.0 [ade2ca70] Dates v1.11.0 [b77e0a4c] InteractiveUtils v1.11.0 [ac6e5ff7] JuliaSyntaxHighlighting v1.12.0 [8f399da3] Libdl v1.11.0 [37e2e46d] LinearAlgebra v1.13.0 [56ddb016] Logging v1.11.0 [d6f4376e] Markdown v1.11.0 [de0858da] Printf v1.11.0 [9a3f8284] Random v1.11.0 [ea8e919c] SHA v0.7.0 [9e88b42a] Serialization v1.11.0 [2f01184e] SparseArrays v1.13.0 [f489334b] StyledStrings v1.11.0 [4607b0f0] SuiteSparse [fa267f1f] TOML v1.0.3 [8dfed614] Test v1.11.0 [4ec0a83e] Unicode v1.11.0 [e66e0078] CompilerSupportLibraries_jll v1.3.0+1 [4536629a] OpenBLAS_jll v0.3.29+0 [05823500] OpenLibm_jll v0.8.7+0 [bea87d4a] SuiteSparse_jll v7.10.1+0 [8e850b90] libblastrampoline_jll v5.15.0+0 Testing Running tests... d = Normal{Float64}(μ=0.0, σ=1.0) ------------------------------------ x Exact Metropolis ------------------------------------ -5.0 +0.000000000 +0.000001487 ✔ -4.9 +0.000000000 +0.000002439 ✔ -4.8 +0.000000000 +0.000003961 ✔ -4.7 +0.000000000 +0.000006370 ✔ -4.6 +0.000000000 +0.000010141 ✔ -4.5 +0.000000000 +0.000015984 ✔ -4.4 +0.000000000 +0.000024942 ✔ -4.3 +0.000300000 +0.000038535 ✔ -4.2 +0.000000000 +0.000058943 ✔ -4.1 +0.000100000 +0.000089262 ✔ -4.0 +0.000300000 +0.000133830 ✔ -3.9 +0.000000000 +0.000198655 ✔ -3.8 +0.000600000 +0.000291947 ✔ -3.7 +0.000400000 +0.000424780 ✔ -3.6 +0.000400000 +0.000611902 ✔ -3.5 +0.000600000 +0.000872683 ✔ -3.4 +0.002100000 +0.001232219 ✔ -3.3 +0.001500000 +0.001722569 ✔ -3.2 +0.002000000 +0.002384088 ✔ -3.1 +0.001900000 +0.003266819 ✔ -3.0 +0.004100000 +0.004431848 ✔ -2.9 +0.006400000 +0.005952532 ✔ -2.8 +0.006600000 +0.007915452 ✔ -2.7 +0.009800000 +0.010420935 ✔ -2.6 +0.015300000 +0.013582969 ✔ -2.5 +0.018400000 +0.017528300 ✔ -2.4 +0.020700000 +0.022394530 ✔ -2.3 +0.027900000 +0.028327038 ✔ -2.2 +0.034700000 +0.035474593 ✔ -2.1 +0.045600000 +0.043983596 ✔ -2.0 +0.054100000 +0.053990967 ✔ -1.9 +0.068400000 +0.065615815 ✔ -1.8 +0.078200000 +0.078950158 ✔ -1.7 +0.099600000 +0.094049077 ✔ -1.6 +0.098200000 +0.110920835 ✔ -1.5 +0.134200000 +0.129517596 ✔ -1.4 +0.154900000 +0.149727466 ✔ -1.3 +0.183100000 +0.171368592 ✔ -1.2 +0.199600000 +0.194186055 ✔ -1.1 +0.230200000 +0.217852177 ✔ -1.0 +0.257100000 +0.241970725 ✔ -0.9 +0.274400000 +0.266085250 ✔ -0.8 +0.300200000 +0.289691553 ✔ -0.7 +0.321900000 +0.312253933 ✔ -0.6 +0.334400000 +0.333224603 ✔ -0.5 +0.352000000 +0.352065327 ✔ -0.4 +0.364800000 +0.368270140 ✔ -0.3 +0.379900000 +0.381387815 ✔ -0.2 +0.390000000 +0.391042694 ✔ -0.1 +0.390000000 +0.396952547 ✔ +0.0 +0.387900000 +0.398942280 ✔ +0.1 +0.399800000 +0.396952547 ✔ +0.2 +0.379100000 +0.391042694 ✔ +0.3 +0.374700000 +0.381387815 ✔ +0.4 +0.364200000 +0.368270140 ✔ +0.5 +0.351700000 +0.352065327 ✔ +0.6 +0.332600000 +0.333224603 ✔ +0.7 +0.307600000 +0.312253933 ✔ +0.8 +0.291300000 +0.289691553 ✔ +0.9 +0.264400000 +0.266085250 ✔ +1.0 +0.245300000 +0.241970725 ✔ +1.1 +0.220400000 +0.217852177 ✔ +1.2 +0.199200000 +0.194186055 ✔ +1.3 +0.167400000 +0.171368592 ✔ +1.4 +0.146100000 +0.149727466 ✔ +1.5 +0.127900000 +0.129517596 ✔ +1.6 +0.107700000 +0.110920835 ✔ +1.7 +0.082300000 +0.094049077 ✔ +1.8 +0.075300000 +0.078950158 ✔ +1.9 +0.060500000 +0.065615815 ✔ +2.0 +0.048900000 +0.053990967 ✔ +2.1 +0.044700000 +0.043983596 ✔ +2.2 +0.034500000 +0.035474593 ✔ +2.3 +0.028500000 +0.028327038 ✔ +2.4 +0.022500000 +0.022394530 ✔ +2.5 +0.015500000 +0.017528300 ✔ +2.6 +0.012500000 +0.013582969 ✔ +2.7 +0.008900000 +0.010420935 ✔ +2.8 +0.007800000 +0.007915452 ✔ +2.9 +0.008400000 +0.005952532 ✔ +3.0 +0.006000000 +0.004431848 ✔ +3.1 +0.003600000 +0.003266819 ✔ +3.2 +0.003000000 +0.002384088 ✔ +3.3 +0.001300000 +0.001722569 ✔ +3.4 +0.001400000 +0.001232219 ✔ +3.5 +0.000400000 +0.000872683 ✔ +3.6 +0.000100000 +0.000611902 ✔ +3.7 +0.000500000 +0.000424780 ✔ +3.8 +0.000200000 +0.000291947 ✔ +3.9 +0.000500000 +0.000198655 ✔ +4.0 +0.000100000 +0.000133830 ✔ +4.1 +0.000400000 +0.000089262 ✔ +4.2 +0.000000000 +0.000058943 ✔ +4.3 +0.000000000 +0.000038535 ✔ +4.4 +0.000000000 +0.000024942 ✔ +4.5 +0.000000000 +0.000015984 ✔ +4.6 +0.000000000 +0.000010141 ✔ +4.7 +0.000000000 +0.000006370 ✔ +4.8 +0.000000000 +0.000003961 ✔ +4.9 +0.000000000 +0.000002439 ✔ +5.0 +0.000000000 +0.000001487 ✔ ------------------------------------ d = SymTriangularDist{Float64}(μ=0.0, σ=1.0) ------------------------------------ x Exact Metropolis ------------------------------------ -2.0 +0.000000000 +0.000000000 ✔ -1.9 +0.000000000 +0.000000000 ✔ -1.8 +0.000000000 +0.000000000 ✔ -1.7 +0.000000000 +0.000000000 ✔ -1.6 +0.000000000 +0.000000000 ✔ -1.5 +0.000000000 +0.000000000 ✔ -1.4 +0.000000000 +0.000000000 ✔ -1.3 +0.000000000 +0.000000000 ✔ -1.2 +0.000000000 +0.000000000 ✔ -1.1 +0.000000000 +0.000000000 ✔ -1.0 +0.000800000 +0.000000000 ✔ -0.9 +0.053900000 +0.058758548 ✔ -0.8 +0.156500000 +0.158758548 ✔ -0.7 +0.260400000 +0.258758548 ✔ -0.6 +0.363000000 +0.358758548 ✔ -0.5 +0.457800000 +0.458758548 ✔ -0.4 +0.551200000 +0.558758548 ✔ -0.3 +0.660600000 +0.658758548 ✔ -0.2 +0.768200000 +0.758758548 ✔ -0.1 +0.835400000 +0.858758548 ✔ -0.0 +0.946900000 +0.958758548 ✔ +0.1 +0.925400000 +0.941241452 ✔ +0.2 +0.840100000 +0.841241452 ✔ +0.3 +0.756800000 +0.741241452 ✔ +0.4 +0.643700000 +0.641241452 ✔ +0.5 +0.555100000 +0.541241452 ✔ +0.6 +0.450600000 +0.441241452 ✔ +0.7 +0.342800000 +0.341241452 ✔ +0.8 +0.249000000 +0.241241452 ✔ +0.9 +0.144500000 +0.141241452 ✔ +1.0 +0.037300000 +0.041241452 ✔ +1.1 +0.000000000 +0.000000000 ✔ +1.2 +0.000000000 +0.000000000 ✔ +1.3 +0.000000000 +0.000000000 ✔ +1.4 +0.000000000 +0.000000000 ✔ +1.5 +0.000000000 +0.000000000 ✔ +1.6 +0.000000000 +0.000000000 ✔ +1.7 +0.000000000 +0.000000000 ✔ +1.8 +0.000000000 +0.000000000 ✔ +1.9 +0.000000000 +0.000000000 ✔ +2.0 +0.000000000 +0.000000000 ✔ ------------------------------------ d = Uniform{Float64}(a=0.0, b=1.0) ------------------------------------ x Exact Metropolis ------------------------------------ -0.9 +0.000000000 +0.000000000 ✔ -0.8 +0.000000000 +0.000000000 ✔ -0.7 +0.000000000 +0.000000000 ✔ -0.6 +0.000000000 +0.000000000 ✔ -0.5 +0.000000000 +0.000000000 ✔ -0.4 +0.000000000 +0.000000000 ✔ -0.3 +0.000000000 +0.000000000 ✔ -0.2 +0.000000000 +0.000000000 ✔ -0.1 +0.000000000 +0.000000000 ✔ -0.0 +0.064800000 +0.000000000 ✔ +0.1 +0.976800000 +1.000000000 ✔ +0.2 +0.999100000 +1.000000000 ✔ +0.3 +1.019000000 +1.000000000 ✔ +0.4 +1.023100000 +1.000000000 ✔ +0.5 +1.011000000 +1.000000000 ✔ +0.6 +0.990700000 +1.000000000 ✔ +0.7 +1.001700000 +1.000000000 ✔ +0.8 +0.970000000 +1.000000000 ✔ +0.9 +1.002700000 +1.000000000 ✔ +1.0 +0.941100000 +1.000000000 ✔ +1.1 +0.000000000 +0.000000000 ✔ +1.2 +0.000000000 +0.000000000 ✔ +1.3 +0.000000000 +0.000000000 ✔ +1.4 +0.000000000 +0.000000000 ✔ +1.5 +0.000000000 +0.000000000 ✔ +1.6 +0.000000000 +0.000000000 ✔ +1.7 +0.000000000 +0.000000000 ✔ +1.8 +0.000000000 +0.000000000 ✔ +1.9 +0.000000000 +0.000000000 ✔ ------------------------------------ d = Gamma{Float64}(α=7.5, θ=1.0) ------------------------------------ x Exact Metropolis ------------------------------------ -6.2 +0.000000000 +0.000000000 ✔ -6.1 +0.000000000 +0.000000000 ✔ -6.0 +0.000000000 +0.000000000 ✔ -5.9 +0.000000000 +0.000000000 ✔ -5.8 +0.000000000 +0.000000000 ✔ -5.7 +0.000000000 +0.000000000 ✔ -5.6 +0.000000000 +0.000000000 ✔ -5.5 +0.000000000 +0.000000000 ✔ -5.4 +0.000000000 +0.000000000 ✔ -5.3 +0.000000000 +0.000000000 ✔ -5.2 +0.000000000 +0.000000000 ✔ -5.1 +0.000000000 +0.000000000 ✔ -5.0 +0.000000000 +0.000000000 ✔ -4.9 +0.000000000 +0.000000000 ✔ -4.8 +0.000000000 +0.000000000 ✔ -4.7 +0.000000000 +0.000000000 ✔ -4.6 +0.000000000 +0.000000000 ✔ -4.5 +0.000000000 +0.000000000 ✔ -4.4 +0.000000000 +0.000000000 ✔ -4.3 +0.000000000 +0.000000000 ✔ -4.2 +0.000000000 +0.000000000 ✔ -4.1 +0.000000000 +0.000000000 ✔ -4.0 +0.000000000 +0.000000000 ✔ -3.9 +0.000000000 +0.000000000 ✔ -3.8 +0.000000000 +0.000000000 ✔ -3.7 +0.000000000 +0.000000000 ✔ -3.6 +0.000000000 +0.000000000 ✔ -3.5 +0.000000000 +0.000000000 ✔ -3.4 +0.000000000 +0.000000000 ✔ -3.3 +0.000000000 +0.000000000 ✔ -3.2 +0.000000000 +0.000000000 ✔ -3.1 +0.000000000 +0.000000000 ✔ -3.0 +0.000000000 +0.000000000 ✔ -2.9 +0.000000000 +0.000000000 ✔ -2.8 +0.000000000 +0.000000000 ✔ -2.7 +0.000000000 +0.000000000 ✔ -2.6 +0.000000000 +0.000000000 ✔ -2.5 +0.000000000 +0.000000000 ✔ -2.4 +0.000000000 +0.000000000 ✔ -2.3 +0.000000000 +0.000000000 ✔ -2.2 +0.000000000 +0.000000000 ✔ -2.1 +0.000000000 +0.000000000 ✔ -2.0 +0.000000000 +0.000000000 ✔ -1.9 +0.000000000 +0.000000000 ✔ -1.8 +0.000000000 +0.000000000 ✔ -1.7 +0.000000000 +0.000000000 ✔ -1.6 +0.000000000 +0.000000000 ✔ -1.5 +0.000000000 +0.000000000 ✔ -1.4 +0.000000000 +0.000000000 ✔ -1.3 +0.000000000 +0.000000000 ✔ -1.2 +0.000000000 +0.000000000 ✔ -1.1 +0.000000000 +0.000000000 ✔ -1.0 +0.000000000 +0.000000000 ✔ -0.9 +0.000000000 +0.000000000 ✔ -0.8 +0.000000000 +0.000000000 ✔ -0.7 +0.000000000 +0.000000000 ✔ -0.6 +0.000000000 +0.000000000 ✔ -0.5 +0.000000000 +0.000000000 ✔ -0.4 +0.000000000 +0.000000000 ✔ -0.3 +0.000000000 +0.000000000 ✔ -0.2 +0.000000000 +0.000000000 ✔ -0.1 +0.000000000 +0.000000000 ✔ +0.0 +0.000000000 +0.000000000 ✔ +0.1 +0.000000000 +0.000000000 ✔ +0.2 +0.000000000 +0.000000016 ✔ +0.3 +0.000000000 +0.000000182 ✔ +0.4 +0.000000000 +0.000001031 ✔ +0.5 +0.000000000 +0.000003890 ✔ +0.6 +0.000000000 +0.000011342 ✔ +0.7 +0.000000000 +0.000027658 ✔ +0.8 +0.000000000 +0.000059139 ✔ +0.9 +0.000300000 +0.000114351 ✔ +1.0 +0.000100000 +0.000204208 ✔ +1.1 +0.000000000 +0.000341922 ✔ +1.2 +0.000400000 +0.000542812 ✔ +1.3 +0.001300000 +0.000823996 ✔ +1.4 +0.001300000 +0.001203999 ✔ +1.5 +0.001500000 +0.001702274 ✔ +1.6 +0.002300000 +0.002338700 ✔ +1.7 +0.002000000 +0.003133043 ✔ +1.8 +0.004100000 +0.004104431 ✔ +1.9 +0.004400000 +0.005270845 ✔ +2.0 +0.009000000 +0.006648657 ✔ +2.1 +0.009400000 +0.008252211 ✔ +2.2 +0.009400000 +0.010093468 ✔ +2.3 +0.012000000 +0.012181723 ✔ +2.4 +0.013200000 +0.014523381 ✔ +2.5 +0.019500000 +0.017121818 ✔ +2.6 +0.018300000 +0.019977296 ✔ +2.7 +0.023300000 +0.023086962 ✔ +2.8 +0.026500000 +0.026444888 ✔ +2.9 +0.029600000 +0.030042185 ✔ +3.0 +0.039400000 +0.033867154 ✔ +3.1 +0.039000000 +0.037905485 ✔ +3.2 +0.038600000 +0.042140483 ✔ +3.3 +0.050600000 +0.046553334 ✔ +3.4 +0.046200000 +0.051123379 ✔ +3.5 +0.058800000 +0.055828405 ✔ +3.6 +0.060100000 +0.060644950 ✔ +3.7 +0.069900000 +0.065548602 ✔ +3.8 +0.068300000 +0.070514292 ✔ +3.9 +0.078400000 +0.075516593 ✔ +4.0 +0.078400000 +0.080529990 ✔ +4.1 +0.081100000 +0.085529147 ✔ +4.2 +0.087300000 +0.090489147 ✔ +4.3 +0.093300000 +0.095385724 ✔ +4.4 +0.099800000 +0.100195461 ✔ +4.5 +0.106400000 +0.104895971 ✔ +4.6 +0.108500000 +0.109466058 ✔ +4.7 +0.108600000 +0.113885851 ✔ +4.8 +0.119500000 +0.118136915 ✔ +4.9 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+0.000800000 +0.000383953 ✔ +19.8 +0.000500000 +0.000359035 ✔ +19.9 +0.001000000 +0.000335678 ✔ +20.0 +0.000700000 +0.000313790 ✔ +20.1 +0.001100000 +0.000293281 ✔ +20.2 +0.000500000 +0.000274069 ✔ +20.3 +0.000400000 +0.000256074 ✔ +20.4 +0.000700000 +0.000239223 ✔ +20.5 +0.000500000 +0.000223446 ✔ +20.6 +0.000400000 +0.000208678 ✔ +20.7 +0.000700000 +0.000194855 ✔ +20.8 +0.000600000 +0.000181921 ✔ +20.9 +0.000300000 +0.000169820 ✔ +21.0 +0.000600000 +0.000158500 ✔ +21.1 +0.000300000 +0.000147913 ✔ ------------------------------------ d = TriangularDist{Float64}(a=0.0, b=1.0, c=0.2) ------------------------------------ x Exact Metropolis ------------------------------------ -0.7 +0.000000000 +0.000000000 ✔ -0.6 +0.000000000 +0.000000000 ✔ -0.5 +0.000000000 +0.000000000 ✔ -0.4 +0.000000000 +0.000000000 ✔ -0.3 +0.000000000 +0.000000000 ✔ -0.2 +0.000000000 +0.000000000 ✔ -0.1 +0.000000000 +0.000000000 ✔ +0.0 +0.211900000 +0.198765503 ✔ +0.1 +1.175200000 +1.198765503 ✔ +0.2 +1.877800000 +1.950308624 ✔ +0.3 +1.661900000 +1.700308624 ✔ +0.4 +1.421100000 +1.450308624 ✔ +0.5 +1.203500000 +1.200308624 ✔ +0.6 +0.991700000 +0.950308624 ✔ +0.7 +0.755200000 +0.700308624 ✔ +0.8 +0.486400000 +0.450308624 ✔ +0.9 +0.200300000 +0.200308624 ✔ +1.0 +0.015000000 +0.000000000 ✔ +1.1 +0.000000000 +0.000000000 ✔ +1.2 +0.000000000 +0.000000000 ✔ +1.3 +0.000000000 +0.000000000 ✔ +1.4 +0.000000000 +0.000000000 ✔ ------------------------------------ d = Semicircle{Float64}(r=1.0) ------------------------------------ x Exact Metropolis ------------------------------------ -2.5 +0.000000000 +0.000000000 ✔ -2.4 +0.000000000 +0.000000000 ✔ -2.3 +0.000000000 +0.000000000 ✔ -2.2 +0.000000000 +0.000000000 ✔ -2.1 +0.000000000 +0.000000000 ✔ -2.0 +0.000000000 +0.000000000 ✔ -1.9 +0.000000000 +0.000000000 ✔ -1.8 +0.000000000 +0.000000000 ✔ -1.7 +0.000000000 +0.000000000 ✔ -1.6 +0.000000000 +0.000000000 ✔ -1.5 +0.000000000 +0.000000000 ✔ -1.4 +0.000000000 +0.000000000 ✔ -1.3 +0.000000000 +0.000000000 ✔ -1.2 +0.000000000 +0.000000000 ✔ -1.1 +0.000000000 +0.000000000 ✔ -1.0 +0.059100000 +0.000000000 ✔ -0.9 +0.273000000 +0.277496125 ✔ -0.8 +0.359700000 +0.381971863 ✔ -0.7 +0.437000000 +0.454637454 ✔ -0.6 +0.488000000 +0.509295818 ✔ -0.5 +0.541200000 +0.551328895 ✔ -0.4 +0.575400000 +0.583471659 ✔ -0.3 +0.606000000 +0.607296557 ✔ -0.2 +0.623300000 +0.623757441 ✔ -0.1 +0.624000000 +0.633428676 ✔ +0.0 +0.636000000 +0.636619772 ✔ +0.1 +0.637800000 +0.633428676 ✔ +0.2 +0.633300000 +0.623757441 ✔ +0.3 +0.611700000 +0.607296557 ✔ +0.4 +0.594800000 +0.583471659 ✔ +0.5 +0.574700000 +0.551328895 ✔ +0.6 +0.519600000 +0.509295818 ✔ +0.7 +0.473300000 +0.454637454 ✔ +0.8 +0.384600000 +0.381971863 ✔ +0.9 +0.280400000 +0.277496125 ✔ +1.0 +0.067100000 +0.000000000 ✔ +1.1 +0.000000000 +0.000000000 ✔ +1.2 +0.000000000 +0.000000000 ✔ +1.3 +0.000000000 +0.000000000 ✔ +1.4 +0.000000000 +0.000000000 ✔ +1.5 +0.000000000 +0.000000000 ✔ +1.6 +0.000000000 +0.000000000 ✔ +1.7 +0.000000000 +0.000000000 ✔ +1.8 +0.000000000 +0.000000000 ✔ +1.9 +0.000000000 +0.000000000 ✔ +2.0 +0.000000000 +0.000000000 ✔ +2.1 +0.000000000 +0.000000000 ✔ +2.2 +0.000000000 +0.000000000 ✔ +2.3 +0.000000000 +0.000000000 ✔ +2.4 +0.000000000 +0.000000000 ✔ +2.5 +0.000000000 +0.000000000 ✔ ------------------------------------ Test Summary: | Pass Total Time MetropolisAlgorithm.jl | 518 518 18.7s Normal{Float64}(μ=0.0, σ=1.0) | 101 101 5.0s SymTriangularDist{Float64}(μ=0.0, σ=1.0) | 41 41 1.1s Uniform{Float64}(a=0.0, b=1.0) | 29 29 1.2s Gamma{Float64}(α=7.5, θ=1.0) | 274 274 5.5s TriangularDist{Float64}(a=0.0, b=1.0, c=0.2) | 22 22 0.6s Semicircle{Float64}(r=1.0) | 51 51 1.5s Testing MetropolisAlgorithm tests passed Testing completed after 32.39s PkgEval succeeded after 150.03s