Package evaluation of SDDP on Julia 1.13.0-DEV.636 (2bd37fbbab*) started at 2025-05-25T19:22:18.587


################################################################################
# Set-up
#

Installing PkgEval dependencies (TestEnv)...

Set-up completed after 9.89s


################################################################################
# Installation
#

Installing SDDP...
   Resolving package versions...
   Installed DiffResults ────────── v1.1.0
   Installed Bzip2_jll ──────────── v1.0.9+0
   Installed CodecZlib ──────────── v0.7.8
   Installed URIs ───────────────── v1.5.2
   Installed ConcurrentUtilities ── v2.5.0
   Installed MacroTools ─────────── v0.5.16
   Installed DataStructures ─────── v0.18.22
   Installed ForwardDiff ────────── v1.0.1
   Installed ExprTools ──────────── v0.1.10
   Installed ExceptionUnwrapping ── v0.1.11
   Installed RecipesBase ────────── v1.3.4
   Installed Compat ─────────────── v4.16.0
   Installed Statistics ─────────── v1.11.1
   Installed OrderedCollections ─── v1.8.1
   Installed TranscodingStreams ─── v0.11.3
   Installed PrecompileTools ────── v1.3.2
   Installed StaticArraysCore ───── v1.4.3
   Installed CommonSubexpressions ─ v0.3.1
   Installed IrrationalConstants ── v0.2.4
   Installed MbedTLS ────────────── v1.1.9
   Installed OpenSSL ────────────── v1.5.0
   Installed LoggingExtras ──────── v1.1.0
   Installed TimerOutputs ───────── v0.5.29
   Installed NaNMath ────────────── v1.1.3
   Installed OpenSpecFun_jll ────── v0.5.6+0
   Installed JSON3 ──────────────── v1.14.3
   Installed LogExpFunctions ────── v0.3.29
   Installed CodecBzip2 ─────────── v0.8.5
   Installed HTTP ───────────────── v1.10.16
   Installed BitFlags ───────────── v0.1.9
   Installed DiffRules ──────────── v1.15.1
   Installed Parsers ────────────── v2.8.3
   Installed SpecialFunctions ───── v2.5.1
   Installed JSON ───────────────── v0.21.4
   Installed Reexport ───────────── v1.2.2
   Installed SimpleBufferStream ─── v1.2.0
   Installed Preferences ────────── v1.4.3
   Installed MbedTLS_jll ────────── v2.28.6+2
   Installed BenchmarkTools ─────── v1.6.0
   Installed JLLWrappers ────────── v1.7.0
   Installed MutableArithmetics ─── v1.6.4
   Installed JuMP ───────────────── v1.26.0
   Installed StructTypes ────────── v1.11.0
   Installed DocStringExtensions ── v0.9.4
   Installed SDDP ───────────────── v1.11.0
   Installed MathOptInterface ───── v1.40.1
  Installing 3 artifacts
   Installed artifact OpenSpecFun 194.9 KiB
   Installed artifact Bzip2       503.5 KiB
   Installed artifact MbedTLS     2.1 MiB
    Updating `~/.julia/environments/v1.13/Project.toml`
  [f4570300] + SDDP v1.11.0
    Updating `~/.julia/environments/v1.13/Manifest.toml`
  [6e4b80f9] + BenchmarkTools v1.6.0
  [d1d4a3ce] + BitFlags v0.1.9
  [523fee87] + CodecBzip2 v0.8.5
  [944b1d66] + CodecZlib v0.7.8
  [bbf7d656] + CommonSubexpressions v0.3.1
  [34da2185] + Compat v4.16.0
  [f0e56b4a] + ConcurrentUtilities v2.5.0
  [864edb3b] + DataStructures v0.18.22
  [163ba53b] + DiffResults v1.1.0
  [b552c78f] + DiffRules v1.15.1
  [ffbed154] + DocStringExtensions v0.9.4
  [460bff9d] + ExceptionUnwrapping v0.1.11
  [e2ba6199] + ExprTools v0.1.10
  [f6369f11] + ForwardDiff v1.0.1
  [cd3eb016] + HTTP v1.10.16
  [92d709cd] + IrrationalConstants v0.2.4
  [692b3bcd] + JLLWrappers v1.7.0
  [682c06a0] + JSON v0.21.4
  [0f8b85d8] + JSON3 v1.14.3
  [4076af6c] + JuMP v1.26.0
  [2ab3a3ac] + LogExpFunctions v0.3.29
  [e6f89c97] + LoggingExtras v1.1.0
  [1914dd2f] + MacroTools v0.5.16
  [b8f27783] + MathOptInterface v1.40.1
  [739be429] + MbedTLS v1.1.9
  [d8a4904e] + MutableArithmetics v1.6.4
  [77ba4419] + NaNMath v1.1.3
  [4d8831e6] + OpenSSL v1.5.0
  [bac558e1] + OrderedCollections v1.8.1
  [69de0a69] + Parsers v2.8.3
  [aea7be01] + PrecompileTools v1.3.2
  [21216c6a] + Preferences v1.4.3
  [3cdcf5f2] + RecipesBase v1.3.4
  [189a3867] + Reexport v1.2.2
  [f4570300] + SDDP v1.11.0
  [777ac1f9] + SimpleBufferStream v1.2.0
  [276daf66] + SpecialFunctions v2.5.1
  [1e83bf80] + StaticArraysCore v1.4.3
  [10745b16] + Statistics v1.11.1
  [856f2bd8] + StructTypes v1.11.0
  [a759f4b9] + TimerOutputs v0.5.29
  [3bb67fe8] + TranscodingStreams v0.11.3
  [5c2747f8] + URIs v1.5.2
  [6e34b625] + Bzip2_jll v1.0.9+0
  [c8ffd9c3] + MbedTLS_jll v2.28.6+2
  [efe28fd5] + OpenSpecFun_jll v0.5.6+0
  [56f22d72] + Artifacts v1.11.0
  [2a0f44e3] + Base64 v1.11.0
  [ade2ca70] + Dates v1.11.0
  [8ba89e20] + Distributed v1.11.0
  [b77e0a4c] + InteractiveUtils v1.11.0
  [ac6e5ff7] + JuliaSyntaxHighlighting v1.12.0
  [8f399da3] + Libdl v1.11.0
  [37e2e46d] + LinearAlgebra v1.12.0
  [56ddb016] + Logging v1.11.0
  [d6f4376e] + Markdown v1.11.0
  [a63ad114] + Mmap v1.11.0
  [ca575930] + NetworkOptions v1.3.0
  [de0858da] + Printf v1.11.0
  [9abbd945] + Profile v1.11.0
  [9a3f8284] + Random v1.11.0
  [ea8e919c] + SHA v0.7.0
  [9e88b42a] + Serialization v1.11.0
  [6462fe0b] + Sockets v1.11.0
  [2f01184e] + SparseArrays v1.12.0
  [f489334b] + StyledStrings v1.11.0
  [fa267f1f] + TOML v1.0.3
  [8dfed614] + Test v1.11.0
  [cf7118a7] + UUIDs v1.11.0
  [4ec0a83e] + Unicode v1.11.0
  [e66e0078] + CompilerSupportLibraries_jll v1.3.0+1
  [14a3606d] + MozillaCACerts_jll v2025.5.20
  [4536629a] + OpenBLAS_jll v0.3.29+0
  [05823500] + OpenLibm_jll v0.8.5+0
  [458c3c95] + OpenSSL_jll v3.5.0+0
  [bea87d4a] + SuiteSparse_jll v7.10.1+0
  [83775a58] + Zlib_jll v1.3.1+2
  [8e850b90] + libblastrampoline_jll v5.12.0+0

Installation completed after 8.96s


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# Precompilation
#

Precompiling PkgEval dependencies...
Precompiling packages...
   4942.2 ms  ✓ TestEnv
  1 dependency successfully precompiled in 5 seconds. 25 already precompiled.

Precompiling package dependencies...

Precompilation completed after 882.51s


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# Testing
#

     Testing SDDP
      Status `/tmp/jl_WZhznH/Project.toml`
  [87dc4568] HiGHS v1.17.0
  [b6b21f68] Ipopt v1.10.3
  [682c06a0] JSON v0.21.4
  [7d188eb4] JSONSchema v1.4.1
  [91a5bcdd] Plots v1.40.13
  [f4570300] SDDP v1.11.0
  [10745b16] Statistics v1.11.1
  [8ba89e20] Distributed v1.11.0
  [f43a241f] Downloads v1.7.0
  [44cfe95a] Pkg v1.13.0
  [9a3f8284] Random v1.11.0
  [8dfed614] Test v1.11.0
      Status `/tmp/jl_WZhznH/Manifest.toml`
  [66dad0bd] AliasTables v1.1.3
  [6e4b80f9] BenchmarkTools v1.6.0
  [d1d4a3ce] BitFlags v0.1.9
  [523fee87] CodecBzip2 v0.8.5
  [944b1d66] CodecZlib v0.7.8
  [35d6a980] ColorSchemes v3.29.0
  [3da002f7] ColorTypes v0.12.1
  [c3611d14] ColorVectorSpace v0.11.0
  [5ae59095] Colors v0.13.1
  [bbf7d656] CommonSubexpressions v0.3.1
  [34da2185] Compat v4.16.0
  [f0e56b4a] ConcurrentUtilities v2.5.0
  [d38c429a] Contour v0.6.3
  [9a962f9c] DataAPI v1.16.0
  [864edb3b] DataStructures v0.18.22
  [8bb1440f] DelimitedFiles v1.9.1
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  [c87230d0] FFMPEG v0.4.2
  [53c48c17] FixedPointNumbers v0.8.5
  [1fa38f19] Format v1.3.7
  [f6369f11] ForwardDiff v1.0.1
  [28b8d3ca] GR v0.73.16
  [42e2da0e] Grisu v1.0.2
  [cd3eb016] HTTP v1.10.16
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  [b6b21f68] Ipopt v1.10.3
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  [1019f520] JLFzf v0.1.11
  [692b3bcd] JLLWrappers v1.7.0
  [682c06a0] JSON v0.21.4
  [0f8b85d8] JSON3 v1.14.3
  [7d188eb4] JSONSchema v1.4.1
  [4076af6c] JuMP v1.26.0
  [b964fa9f] LaTeXStrings v1.4.0
  [23fbe1c1] Latexify v0.16.7
  [2ab3a3ac] LogExpFunctions v0.3.29
  [e6f89c97] LoggingExtras v1.1.0
  [1914dd2f] MacroTools v0.5.16
  [b8f27783] MathOptInterface v1.40.1
  [739be429] MbedTLS v1.1.9
  [442fdcdd] Measures v0.3.2
  [e1d29d7a] Missings v1.2.0
  [d8a4904e] MutableArithmetics v1.6.4
  [77ba4419] NaNMath v1.1.3
  [4d8831e6] OpenSSL v1.5.0
  [bac558e1] OrderedCollections v1.8.1
  [69de0a69] Parsers v2.8.3
  [ccf2f8ad] PlotThemes v3.3.0
  [995b91a9] PlotUtils v1.4.3
  [91a5bcdd] Plots v1.40.13
  [aea7be01] PrecompileTools v1.3.2
  [21216c6a] Preferences v1.4.3
  [43287f4e] PtrArrays v1.3.0
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  [01d81517] RecipesPipeline v0.6.12
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  [05181044] RelocatableFolders v1.0.1
  [ae029012] Requires v1.3.1
  [f4570300] SDDP v1.11.0
  [6c6a2e73] Scratch v1.2.1
  [992d4aef] Showoff v1.0.3
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  [ae81ac8f] ASL_jll v0.1.3+0
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⌃ [83423d85] Cairo_jll v1.18.4+0
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⌃ [7746bdde] Glib_jll v2.82.4+0
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⌅ [9cc047cb] Ipopt_jll v300.1400.1700+0
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⌅ [d7ed1dd3] MUMPS_seq_jll v500.700.301+0
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⌅ [30392449] Pixman_jll v0.44.2+0
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⌅ [319450e9] SPRAL_jll v2024.5.8+0
  [a44049a8] Vulkan_Loader_jll v1.3.243+0
⌃ [a2964d1f] Wayland_jll v1.21.0+2
  [2381bf8a] Wayland_protocols_jll v1.36.0+0
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  [83775a58] Zlib_jll v1.3.1+2
  [3161d3a3] Zstd_jll v1.5.7+1
  [8e850b90] libblastrampoline_jll v5.12.0+0
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  [3f19e933] p7zip_jll v17.5.0+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...
[ Info: Experimental.jl
[ Info: fetching remote ref https://jump.dev/MathOptFormat/schemas/mof.1.schema.json
[ Info: MSPFormat.jl
[ Info: algorithm.jl
┌ Warning: Unable to recover in direct mode! Remove `direct = true` when creating the policy graph.
└ @ SDDP ~/.julia/packages/SDDP/EWTpZ/src/algorithm.jl:391
[ Info: Writing cuts to the file `model_infeasible_node_1.cuts.json`
[ Info: Writing cuts to the file `model_infeasible_node_1.cuts.json`
-------------------------------------------------------------------
         SDDP.jl (c) Oscar Dowson and contributors, 2017-25
-------------------------------------------------------------------
problem
  nodes           : 2
  state variables : 1
  scenarios       : 1.00000e+00
  existing cuts   : false
options
  solver          : serial mode
  risk measure    : SDDP.Expectation()
  sampling scheme : SDDP.InSampleMonteCarlo
subproblem structure
  VariableRef                                  : [3, 3]
  JuMP.AffExpr in MOI.GreaterThan{Float64}     : [1, 1]
  JuMP.VariableRef in MOI.GreaterThan{Float64} : [2, 2]
  JuMP.VariableRef in MOI.LessThan{Float64}    : [1, 1]
numerical stability report
  matrix range     [1e+00, 1e+00]
  objective range  [1e+00, 1e+00]
  bounds range     [0e+00, 0e+00]
  rhs range        [2e+00, 2e+00]
-------------------------------------------------------------------
 iteration    simulation      bound        time (s)     solves  pid
-------------------------------------------------------------------
†        1   0.000000e+00  0.000000e+00  3.601582e-01         4   1
         3   0.000000e+00  0.000000e+00  8.312941e-01        12   1
-------------------------------------------------------------------
status         : iteration_limit
total time (s) : 8.312941e-01
total solves   : 12
best bound     :  0.000000e+00
simulation ci  :  0.000000e+00 ± 0.000000e+00
numeric issues : 1
-------------------------------------------------------------------

-------------------------------------------------------------------
         SDDP.jl (c) Oscar Dowson and contributors, 2017-25
-------------------------------------------------------------------
problem
  nodes           : 3
  state variables : 1
  scenarios       : 8.00000e+00
  existing cuts   : false
options
  solver          : serial mode
  risk measure    : SDDP.Expectation()
  sampling scheme : SDDP.InSampleMonteCarlo
subproblem structure
  VariableRef                                  : [6, 6]
  JuMP.AffExpr in MOI.EqualTo{Float64}         : [1, 1]
  JuMP.VariableRef in MOI.EqualTo{Float64}     : [1, 1]
  JuMP.VariableRef in MOI.GreaterThan{Float64} : [4, 4]
  JuMP.VariableRef in MOI.LessThan{Float64}    : [2, 3]
numerical stability report
  matrix range     [1e+00, 1e+00]
  objective range  [1e+00, 3e+02]
  bounds range     [1e+02, 2e+02]
  rhs range        [0e+00, 0e+00]
-------------------------------------------------------------------
 iteration    simulation      bound        time (s)     solves  pid
-------------------------------------------------------------------
         1   1.100000e+05  1.075000e+05  2.571797e-02         9   1
        20   7.500000e+04  1.075000e+05  7.333419e-01       204   1
-------------------------------------------------------------------
status         : simulation_stopping
total time (s) : 7.333419e-01
total solves   : 204
best bound     :  1.075000e+05
simulation ci  :  8.268750e+04 ± 1.084410e+04
numeric issues : 0
-------------------------------------------------------------------

┌ Warning: Re-training a model with existing cuts!
│ 
│ Are you sure you want to do this? The output from this training may be
│ misleading because the policy is already partially trained.
│ 
│ If you meant to train a new policy with different settings, you must
│ build a new model.
│ 
│ If you meant to refine a previously trained policy, turn off this
│ warning by passing `add_to_existing_cuts = true` as a keyword argument
│ to `SDDP.train`.
│ 
│ In a future release, this warning may turn into an error.
└ @ SDDP ~/.julia/packages/SDDP/EWTpZ/src/algorithm.jl:1170
┌ Warning: Re-training a model with existing cuts!
│ 
│ Are you sure you want to do this? The output from this training may be
│ misleading because the policy is already partially trained.
│ 
│ If you meant to train a new policy with different settings, you must
│ build a new model.
│ 
│ If you meant to refine a previously trained policy, turn off this
│ warning by passing `add_to_existing_cuts = true` as a keyword argument
│ to `SDDP.train`.
│ 
│ In a future release, this warning may turn into an error.
└ @ SDDP ~/.julia/packages/SDDP/EWTpZ/src/algorithm.jl:1170
[ Info: binary_expansion.jl
[ Info: deterministic_equivalent.jl
[ Info: modeling_aids.jl
┌ Warning: Budget for nodes is less than the number of stages. Using one node per stage.
└ @ SDDP ~/.julia/packages/SDDP/EWTpZ/src/modeling_aids.jl:125
[ Info: user_interface.jl
[ Info: backward_sampling_schemes.jl
[ Info: bellman_functions.jl
-------------------------------------------------------------------
         SDDP.jl (c) Oscar Dowson and contributors, 2017-25
-------------------------------------------------------------------
problem
  nodes           : 3
  state variables : 1
  scenarios       : 2.70000e+01
  existing cuts   : false
options
  solver          : serial mode
  risk measure    : SDDP.Expectation()
  sampling scheme : SDDP.InSampleMonteCarlo
subproblem structure
  VariableRef                                  : [6, 6]
  JuMP.AffExpr in MOI.EqualTo{Float64}         : [2, 2]
  JuMP.VariableRef in MOI.GreaterThan{Float64} : [5, 5]
  JuMP.VariableRef in MOI.LessThan{Float64}    : [1, 2]
numerical stability report
  matrix range     [1e+00, 1e+00]
  objective range  [1e+00, 1e+01]
  bounds range     [5e+00, 2e+01]
  rhs range        [2e+00, 1e+01]
-------------------------------------------------------------------
 iteration    simulation      bound        time (s)     solves  pid
-------------------------------------------------------------------
         1   2.500000e+01  2.138889e+01  1.170788e+00        12   1
        10   2.500000e+00  3.361111e+01  1.197204e+00       120   1
-------------------------------------------------------------------
status         : iteration_limit
total time (s) : 1.197204e+00
total solves   : 120
best bound     :  3.361111e+01
simulation ci  :  2.775000e+01 ± 3.280073e+01
numeric issues : 0
-------------------------------------------------------------------

-------------------------------------------------------------------
         SDDP.jl (c) Oscar Dowson and contributors, 2017-25
-------------------------------------------------------------------
problem
  nodes           : 3
  state variables : 1
  scenarios       : 2.70000e+01
  existing cuts   : false
options
  solver          : serial mode
  risk measure    : SDDP.Expectation()
  sampling scheme : SDDP.InSampleMonteCarlo
subproblem structure
  VariableRef                                  : [6, 6]
  JuMP.AffExpr in MOI.EqualTo{Float64}         : [2, 2]
  JuMP.VariableRef in MOI.GreaterThan{Float64} : [5, 5]
  JuMP.VariableRef in MOI.LessThan{Float64}    : [1, 2]
numerical stability report
  matrix range     [1e+00, 1e+00]
  objective range  [1e+00, 1e+01]
  bounds range     [5e+00, 2e+01]
  rhs range        [2e+00, 1e+01]
-------------------------------------------------------------------
 iteration    simulation      bound        time (s)     solves  pid
-------------------------------------------------------------------
         1   2.500000e+01  2.083333e+01  1.395917e-02        12   1
        10   2.500000e+00  3.361111e+01  3.702903e-02       120   1
-------------------------------------------------------------------
status         : iteration_limit
total time (s) : 3.702903e-02
total solves   : 120
best bound     :  3.361111e+01
simulation ci  :  2.775000e+01 ± 3.280073e+01
numeric issues : 0
-------------------------------------------------------------------

-------------------------------------------------------------------
         SDDP.jl (c) Oscar Dowson and contributors, 2017-25
-------------------------------------------------------------------
problem
  nodes           : 1
  state variables : 1
  scenarios       : Inf
  existing cuts   : false
options
  solver          : serial mode
  risk measure    : SDDP.Expectation()
  sampling scheme : SDDP.InSampleMonteCarlo
subproblem structure
  VariableRef                                  : [8, 8]
  JuMP.AffExpr in MOI.EqualTo{Float64}         : [2, 2]
  JuMP.VariableRef in MOI.EqualTo{Float64}     : [3, 3]
  JuMP.VariableRef in MOI.GreaterThan{Float64} : [5, 5]
  JuMP.VariableRef in MOI.LessThan{Float64}    : [1, 1]
numerical stability report
  matrix range     [1e+00, 1e+00]
  objective range  [1e+00, 1e+01]
  bounds range     [5e+00, 2e+01]
  rhs range        [0e+00, 0e+00]
-------------------------------------------------------------------
 iteration    simulation      bound        time (s)     solves  pid
-------------------------------------------------------------------
         1   9.250000e+01  5.268631e+01  9.824038e-03        46   1
        50   0.000000e+00  1.191663e+02  4.635079e-01      1625   1
-------------------------------------------------------------------
status         : iteration_limit
total time (s) : 4.635079e-01
total solves   : 1625
best bound     :  1.191663e+02
simulation ci  :  7.795000e+01 ± 2.885518e+01
numeric issues : 0
-------------------------------------------------------------------

-------------------------------------------------------------------
         SDDP.jl (c) Oscar Dowson and contributors, 2017-25
-------------------------------------------------------------------
problem
  nodes           : 1
  state variables : 1
  scenarios       : Inf
  existing cuts   : false
options
  solver          : serial mode
  risk measure    : SDDP.Expectation()
  sampling scheme : SDDP.InSampleMonteCarlo
subproblem structure
  VariableRef                                  : [8, 8]
  JuMP.AffExpr in MOI.EqualTo{Float64}         : [2, 2]
  JuMP.VariableRef in MOI.EqualTo{Float64}     : [3, 3]
  JuMP.VariableRef in MOI.GreaterThan{Float64} : [5, 5]
  JuMP.VariableRef in MOI.LessThan{Float64}    : [1, 1]
numerical stability report
  matrix range     [1e+00, 1e+00]
  objective range  [1e+00, 1e+01]
  bounds range     [5e+00, 2e+01]
  rhs range        [0e+00, 0e+00]
-------------------------------------------------------------------
 iteration    simulation      bound        time (s)     solves  pid
-------------------------------------------------------------------
         1   9.250000e+01  5.268631e+01  1.009202e-02        46   1
        50   0.000000e+00  1.191663e+02  4.688170e-01      1625   1
-------------------------------------------------------------------
status         : iteration_limit
total time (s) : 4.688170e-01
total solves   : 1625
best bound     :  1.191663e+02
simulation ci  :  7.795000e+01 ± 2.885518e+01
numeric issues : 0
-------------------------------------------------------------------

[ Info: duality_handlers.jl
-------------------------------------------------------------------
         SDDP.jl (c) Oscar Dowson and contributors, 2017-25
-------------------------------------------------------------------
problem
  nodes           : 2
  state variables : 2
  scenarios       : 1.00000e+02
  existing cuts   : false
options
  solver          : serial mode
  risk measure    : SDDP.Expectation()
  sampling scheme : SDDP.InSampleMonteCarlo
subproblem structure
  VariableRef                                  : [5, 11]
  JuMP.AffExpr in MOI.LessThan{Float64}        : [2, 2]
  JuMP.VariableRef in MOI.EqualTo{Float64}     : [2, 2]
  JuMP.VariableRef in MOI.GreaterThan{Float64} : [3, 7]
  JuMP.VariableRef in MOI.LessThan{Float64}    : [2, 7]
  JuMP.VariableRef in MOI.ZeroOne              : [4, 4]
numerical stability report
  matrix range     [1e+00, 6e+00]
  objective range  [1e+00, 3e+01]
  bounds range     [1e+00, 1e+02]
  rhs range        [0e+00, 0e+00]
-------------------------------------------------------------------
 iteration    simulation      bound        time (s)     solves  pid
-------------------------------------------------------------------
         1  -4.650000e+01 -7.053967e+01  3.937069e+00       103   1
         3S -5.785826e+01 -6.755367e+01  5.767461e+00       309   1
        13S -3.268889e+01 -6.677644e+01  7.223988e+00      1339   1
        19S -4.168889e+01 -6.677644e+01  8.647419e+00      1957   1
        41S -6.068889e+01 -6.677644e+01  1.377759e+01      4223   1
        63S -8.068889e+01 -6.677644e+01  1.903317e+01      6489   1
        85S -6.068889e+01 -6.677644e+01  2.423876e+01      8755   1
       100  -8.368889e+01 -6.677644e+01  2.760182e+01     10300   1
-------------------------------------------------------------------
status         : iteration_limit
total time (s) : 2.760182e+01
total solves   : 10300
best bound     : -6.677644e+01
simulation ci  : -5.960112e+01 ± 3.154656e+00
numeric issues : 0
-------------------------------------------------------------------


******************************************************************************
This program contains Ipopt, a library for large-scale nonlinear optimization.
 Ipopt is released as open source code under the Eclipse Public License (EPL).
         For more information visit https://github.com/coin-or/Ipopt
******************************************************************************

[ Info: forward_passes.jl
┌ Warning: Re-training a model with existing cuts!
│ 
│ Are you sure you want to do this? The output from this training may be
│ misleading because the policy is already partially trained.
│ 
│ If you meant to train a new policy with different settings, you must
│ build a new model.
│ 
│ If you meant to refine a previously trained policy, turn off this
│ warning by passing `add_to_existing_cuts = true` as a keyword argument
│ to `SDDP.train`.
│ 
│ In a future release, this warning may turn into an error.
└ @ SDDP ~/.julia/packages/SDDP/EWTpZ/src/algorithm.jl:1170
[ Info: local_improvement_search.jl
[ Info: exp = 15
[ Info: OA(exp) = 220
[ Info: piecewise = 7
[ Info: OA(piecewise) = 6
[ Info: squared = 3
[ Info: OA(squared) = 16
[ Info: parallel_schemes.jl
-------------------------------------------------------------------
         SDDP.jl (c) Oscar Dowson and contributors, 2017-25
-------------------------------------------------------------------
problem
  nodes           : 2
  state variables : 1
  scenarios       : 4.00000e+00
  existing cuts   : false
options
  solver          : Asynchronous mode with 4 workers.
  risk measure    : SDDP.Expectation()
  sampling scheme : SDDP.InSampleMonteCarlo
subproblem structure
  VariableRef                             : [3, 3]
  VariableRef in MOI.GreaterThan{Float64} : [2, 2]
  VariableRef in MOI.LessThan{Float64}    : [1, 1]
numerical stability report
  matrix range     [0e+00, 0e+00]
  objective range  [1e+00, 1e+00]
  bounds range     [1e+00, 6e+00]
  rhs range        [0e+00, 0e+00]
-------------------------------------------------------------------
 iteration    simulation      bound        time (s)     solves  pid
-------------------------------------------------------------------
         1   7.000000e+00  6.000000e+00  3.250483e+02         2   3
        20   7.000000e+00  6.000000e+00  3.301378e+02        40   3
-------------------------------------------------------------------
status         : iteration_limit
total time (s) : 3.301378e+02
total solves   : 40
best bound     :  6.000000e+00
simulation ci  :  6.900000e+00 ± 1.004453e+00
numeric issues : 0
-------------------------------------------------------------------

┌ Warning: Re-training a model with existing cuts!
│ 
│ Are you sure you want to do this? The output from this training may be
│ misleading because the policy is already partially trained.
│ 
│ If you meant to train a new policy with different settings, you must
│ build a new model.
│ 
│ If you meant to refine a previously trained policy, turn off this
│ warning by passing `add_to_existing_cuts = true` as a keyword argument
│ to `SDDP.train`.
│ 
│ In a future release, this warning may turn into an error.
└ @ SDDP ~/.julia/packages/SDDP/EWTpZ/src/algorithm.jl:1170
-------------------------------------------------------------------
         SDDP.jl (c) Oscar Dowson and contributors, 2017-25
-------------------------------------------------------------------
problem
  nodes           : 2
  state variables : 1
  scenarios       : 4.00000e+00
  existing cuts   : true
options
  solver          : Asynchronous mode with 4 workers.
  risk measure    : SDDP.Expectation()
  sampling scheme : SDDP.InSampleMonteCarlo
subproblem structure
  VariableRef                             : [3, 3]
  AffExpr in MOI.GreaterThan{Float64}     : [2, 2]
  VariableRef in MOI.EqualTo{Float64}     : [1, 1]
  VariableRef in MOI.GreaterThan{Float64} : [2, 2]
  VariableRef in MOI.LessThan{Float64}    : [1, 1]
numerical stability report
  matrix range     [1e+00, 1e+00]
  objective range  [1e+00, 1e+00]
  bounds range     [1e+00, 6e+00]
  rhs range        [4e+00, 4e+00]
-------------------------------------------------------------------
 iteration    simulation      bound        time (s)     solves  pid
-------------------------------------------------------------------
         1   5.000000e+00  6.000000e+00  3.088050e-01        48   1
        20   9.000000e+00  6.000000e+00  6.006520e-01       162   1
-------------------------------------------------------------------
status         : iteration_limit
total time (s) : 6.006520e-01
total solves   : 162
best bound     :  6.000000e+00
simulation ci  :  5.900000e+00 ± 9.633534e-01
numeric issues : 0
-------------------------------------------------------------------

[ Info: risk_measures.jl
┌ Warning: Radius is very small. You should probably use `SDDP.Expectation()` instead.
└ @ SDDP ~/.julia/packages/SDDP/EWTpZ/src/plugins/risk_measures.jl:528
┌ Warning: Radius is very small. You should probably use `SDDP.Expectation()` instead.
└ @ SDDP ~/.julia/packages/SDDP/EWTpZ/src/plugins/risk_measures.jl:528
┌ Warning: Radius is very small. You should probably use `SDDP.Expectation()` instead.
└ @ SDDP ~/.julia/packages/SDDP/EWTpZ/src/plugins/risk_measures.jl:528
[ Info: sampling_schemes.jl
[ Info: stopping_rules.jl
-------------------------------------------------------------------
         SDDP.jl (c) Oscar Dowson and contributors, 2017-25
-------------------------------------------------------------------
problem
  nodes           : 2
  state variables : 1
  scenarios       : 1.00000e+00
  existing cuts   : false
options
  solver          : serial mode
  risk measure    : SDDP.Expectation()
  sampling scheme : SDDP.InSampleMonteCarlo
subproblem structure
  VariableRef                             : [3, 3]
  VariableRef in MOI.GreaterThan{Float64} : [2, 2]
  VariableRef in MOI.LessThan{Float64}    : [1, 1]
numerical stability report
  matrix range     [0e+00, 0e+00]
  objective range  [1e+00, 1e+00]
  bounds range     [0e+00, 0e+00]
  rhs range        [0e+00, 0e+00]
-------------------------------------------------------------------
 iteration    simulation      bound        time (s)     solves  pid
-------------------------------------------------------------------
         1   0.000000e+00  0.000000e+00  5.147934e-03         4   1
        50   0.000000e+00  0.000000e+00  2.522969e-01       200   1
-------------------------------------------------------------------
status         : first_stage_stopping
total time (s) : 2.522969e-01
total solves   : 200
best bound     :  0.000000e+00
simulation ci  :  0.000000e+00 ± 0.000000e+00
numeric issues : 0
-------------------------------------------------------------------

┌ Warning: Are you really sure you want to use this stopping rule? Read why we don't recommend it by typing `? SDDP.Statistical` into the REPL to read the docstring.
│ 
│ If you understand what you are doing, you can disable this warning with `SDDP.Statistical(; disable_warning = true)`
└ @ SDDP ~/.julia/packages/SDDP/EWTpZ/src/plugins/stopping_rules.jl:132
Simulated policy value: [ 5.035598e+00,  6.964402e+00]
Simulated policy value: [ 5.282880e+00,  7.117120e+00]
Simulated policy value: [ 5.606329e+00,  7.393671e+00]
┌ Warning: Are you really sure you want to use this stopping rule? Read why we don't recommend it by typing `? SDDP.Statistical` into the REPL to read the docstring.
│ 
│ If you understand what you are doing, you can disable this warning with `SDDP.Statistical(; disable_warning = true)`
└ @ SDDP ~/.julia/packages/SDDP/EWTpZ/src/plugins/stopping_rules.jl:132
Simulated policy value: [ 5.035598e+00,  6.964402e+00]
Simulated policy value: [ 5.282880e+00,  7.117120e+00]
Simulated policy value: [ 5.606329e+00,  7.393671e+00]
┌ Warning: Are you really sure you want to use this stopping rule? Read why we don't recommend it by typing `? SDDP.Statistical` into the REPL to read the docstring.
│ 
│ If you understand what you are doing, you can disable this warning with `SDDP.Statistical(; disable_warning = true)`
└ @ SDDP ~/.julia/packages/SDDP/EWTpZ/src/plugins/stopping_rules.jl:132
[ Info: threaded.jl
[ Info: value_functions.jl
[ Info: visualization.jl

test_SpaghettiPlot: Test Failed at /home/pkgeval/.julia/packages/SDDP/EWTpZ/test/visualization/visualization.jl:49
  Expression: read("test.html", String) == read(control, String)
   Evaluated: "<!--\n    Copyright (c) 2017-25, Oscar Dowson and SDDP.jl contributors.\n    This Source Code Form is subject to the terms of the Mozilla Public License,\n    v. 2.0. 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i < plot_data.data.length; i++) {\n                    diff = Math.abs(plot_data.data[i][stage] - ydata[stage]);\n                    if (i != this_path_index) {\n                        set_path_style(i,\n                            modifying_domain.range([\"#8D9091\", \"white\"])(diff),\n                            modifying_domain.range([1.0, 0.0])(diff),\n                            \"2pt\"\n                        )\n                    }\n                }\n            })\n            .on(\"mouseup\", function(d, this_path_index) {\n                // Restore to default all paths except the current hover.\n                for (var i = 0; i < plot_data.data.length; i++) {\n                    if (i != this_path_index) {\n                        set_path_style(i, \"#8D9091\", 0.1, \"2px\");\n                    }\n                }\n            });\n\n        // Add the x-axis label.\n        svg.append(\"text\")\n            .attr(\"transform\", \"translate(\" + (width / 2) + \" ,\" + (height + margin.bottom) + \")\")\n            .attr(\"class\", \"axislabel\")\n            .text(plot_data.xlabel);\n\n        // Add the y-axis label.\n        svg.append(\"text\")\n            .attr(\"transform\", \"rotate(-90)\")\n            .attr(\"y\", 0 - margin.left)\n            .attr(\"x\", 0 - (height / 2))\n            .attr(\"dy\", \"1em\")\n            .attr(\"class\", \"axislabel\")\n            .text(plot_data.ylabel);\n\n        // Add the plot title.\n        svg.append(\"text\")\n            .attr(\"x\", (width / 2))\n            .attr(\"y\", 0 - (margin.top / 2))\n            .attr(\"text-anchor\", \"middle\")\n            .attr(\"class\", \"title\")\n            .text(plot_data.title);\n\n        plots.push({\n            svg: svg,\n            data: plot_data.data\n        })\n    });\n};\n\n    </script>\n</head>\n\n<body>\n    <div class=\"plots\"></div>\n    <script>\n        main( [{\"ymin\":\"\",\"interpolate\":\"linear\",\"ymax\":\"\",\"data\":[[1.0,3.0,6.0],[1.5,4.0,7.5]],\"title\":\"\",\"xlabel\":\"Stages\",\"cumulative\":true,\"ylabel\":\"\"},{\"ymin\":\"\",\"interpolate\":\"linear\",\"ymax\":\"\",\"data\":[[8.0,10.0,12.0],[9.0,11.0,13.0]],\"title\":\"y\",\"xlabel\":\"Stages\",\"cumulative\":false,\"ylabel\":\"\"}]);\n    </script>\n\n</body>\n\n</html>\n"
  Stacktrace:
   [1] macro expansion
     @ /opt/julia/share/julia/stdlib/v1.13/Test/src/Test.jl:730 [inlined]
   [2] test_SpaghettiPlot()
     @ Main.TestVisualization ~/.julia/packages/SDDP/EWTpZ/test/visualization/visualization.jl:49
   [3] macro expansion
     @ ~/.julia/packages/SDDP/EWTpZ/test/visualization/visualization.jl:17 [inlined]
   [4] macro expansion
     @ /opt/julia/share/julia/stdlib/v1.13/Test/src/Test.jl:1833 [inlined]
   [5] runtests()
     @ Main.TestVisualization ~/.julia/packages/SDDP/EWTpZ/test/visualization/visualization.jl:17
┌ Warning: `SDDP.save` is deprecated. Use `SDDP.plot` instead.
│   caller = test_SpaghettiPlot() at visualization.jl:51
└ @ Core ~/.julia/packages/SDDP/EWTpZ/test/visualization/visualization.jl:51

test_SpaghettiPlot: Test Failed at /home/pkgeval/.julia/packages/SDDP/EWTpZ/test/visualization/visualization.jl:55
  Expression: read("test.html", String) == read(control, String)
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  Stacktrace:
   [1] macro expansion
     @ /opt/julia/share/julia/stdlib/v1.13/Test/src/Test.jl:730 [inlined]
   [2] test_SpaghettiPlot()
     @ Main.TestVisualization ~/.julia/packages/SDDP/EWTpZ/test/visualization/visualization.jl:55
   [3] macro expansion
     @ ~/.julia/packages/SDDP/EWTpZ/test/visualization/visualization.jl:17 [inlined]
   [4] macro expansion
     @ /opt/julia/share/julia/stdlib/v1.13/Test/src/Test.jl:1833 [inlined]
   [5] runtests()
     @ Main.TestVisualization ~/.julia/packages/SDDP/EWTpZ/test/visualization/visualization.jl:17
[ Info: FAST_hydro_thermal.jl
-------------------------------------------------------------------
         SDDP.jl (c) Oscar Dowson and contributors, 2017-25
-------------------------------------------------------------------
problem
  nodes           : 2
  state variables : 1
  scenarios       : 2.00000e+00
  existing cuts   : false
options
  solver          : serial mode
  risk measure    : SDDP.Expectation()
  sampling scheme : SDDP.InSampleMonteCarlo
subproblem structure
  VariableRef                             : [6, 6]
  AffExpr in MOI.GreaterThan{Float64}     : [1, 1]
  AffExpr in MOI.LessThan{Float64}        : [1, 1]
  VariableRef in MOI.EqualTo{Float64}     : [1, 1]
  VariableRef in MOI.GreaterThan{Float64} : [3, 4]
  VariableRef in MOI.LessThan{Float64}    : [2, 2]
numerical stability report
  matrix range     [1e+00, 1e+00]
  objective range  [1e+00, 5e+00]
  bounds range     [8e+00, 8e+00]
  rhs range        [6e+00, 6e+00]
-------------------------------------------------------------------
 iteration    simulation      bound        time (s)     solves  pid
-------------------------------------------------------------------
         1  -2.000000e+01 -1.000000e+01  6.906174e+00         5   1
        20   0.000000e+00 -1.000000e+01  7.539606e+00       104   1
-------------------------------------------------------------------
status         : simulation_stopping
total time (s) : 7.539606e+00
total solves   : 104
best bound     : -1.000000e+01
simulation ci  : -1.100000e+01 ± 4.474009e+00
numeric issues : 0
-------------------------------------------------------------------

[ Info: FAST_production_management.jl
-------------------------------------------------------------------
         SDDP.jl (c) Oscar Dowson and contributors, 2017-25
-------------------------------------------------------------------
problem
  nodes           : 3
  state variables : 2
  scenarios       : 4.00000e+00
  existing cuts   : false
options
  solver          : serial mode
  risk measure    : SDDP.Expectation()
  sampling scheme : SDDP.InSampleMonteCarlo
subproblem structure
  VariableRef                             : [8, 8]
  AffExpr in MOI.LessThan{Float64}        : [3, 3]
  VariableRef in MOI.EqualTo{Float64}     : [1, 1]
  VariableRef in MOI.GreaterThan{Float64} : [5, 5]
  VariableRef in MOI.LessThan{Float64}    : [1, 1]
numerical stability report
  matrix range     [1e+00, 1e+00]
  objective range  [2e-01, 3e+00]
  bounds range     [5e+01, 5e+01]
  rhs range        [0e+00, 0e+00]
-------------------------------------------------------------------
 iteration    simulation      bound        time (s)     solves  pid
-------------------------------------------------------------------
         5  -5.320000e+00 -2.396000e+01  2.063608e-02        52   1
        10  -2.396000e+01 -2.396000e+01  2.787304e-02        92   1
        15  -4.260000e+01 -2.396000e+01  3.568506e-02       132   1
        20  -2.396000e+01 -2.396000e+01  4.406095e-02       172   1
        25  -5.320000e+00 -2.396000e+01  5.488515e-02       224   1
        30  -5.320000e+00 -2.396000e+01  6.465697e-02       264   1
        35  -2.396000e+01 -2.396000e+01  7.575297e-02       304   1
        40  -2.396000e+01 -2.396000e+01  9.121299e-02       344   1
-------------------------------------------------------------------
status         : simulation_stopping
total time (s) : 9.121299e-02
total solves   : 344
best bound     : -2.396000e+01
simulation ci  : -1.868714e+01 ± 3.990349e+00
numeric issues : 0
-------------------------------------------------------------------

────────────────────────────────────────────────────────────────────────────────────
                                           Time                    Allocations      
                                  ───────────────────────   ────────────────────────
        Tot / % measured:              407ms /  19.9%           12.8MiB /  61.8%    

Section                   ncalls     time    %tot     avg     alloc    %tot      avg
────────────────────────────────────────────────────────────────────────────────────
backward_pass                 40   48.5ms   60.1%  1.21ms   5.86MiB   74.1%   150KiB
  solve_subproblem           160   24.9ms   30.8%   156μs    934KiB   11.5%  5.84KiB
    get_dual_solution        160   1.27ms    1.6%  7.95μs    190KiB    2.3%  1.19KiB
  prepare_backward_pass      160   67.2μs    0.1%   420ns     0.00B    0.0%    0.00B
forward_pass                  40   21.9ms   27.1%   546μs   1.77MiB   22.4%  45.4KiB
  solve_subproblem           120   19.7ms   24.4%   164μs   1.60MiB   20.2%  13.6KiB
    get_dual_solution        120   88.1μs    0.1%   734ns   13.1KiB    0.2%     112B
  sample_scenario             40    398μs    0.5%  9.95μs   24.2KiB    0.3%     620B
calculate_bound               40   10.4ms   12.8%   259μs    281KiB    3.5%  7.02KiB
  get_dual_solution           40   39.7μs    0.0%   993ns   4.38KiB    0.1%     112B
get_dual_solution             36   28.5μs    0.0%   792ns   3.94KiB    0.0%     112B
────────────────────────────────────────────────────────────────────────────────────

-------------------------------------------------------------------
         SDDP.jl (c) Oscar Dowson and contributors, 2017-25
-------------------------------------------------------------------
problem
  nodes           : 3
  state variables : 2
  scenarios       : 4.00000e+00
  existing cuts   : false
options
  solver          : serial mode
  risk measure    : SDDP.Expectation()
  sampling scheme : SDDP.InSampleMonteCarlo
subproblem structure
  VariableRef                             : [8, 8]
  AffExpr in MOI.LessThan{Float64}        : [3, 3]
  VariableRef in MOI.EqualTo{Float64}     : [1, 1]
  VariableRef in MOI.GreaterThan{Float64} : [5, 5]
  VariableRef in MOI.LessThan{Float64}    : [1, 1]
numerical stability report
  matrix range     [1e+00, 1e+00]
  objective range  [2e-01, 3e+00]
  bounds range     [5e+01, 5e+01]
  rhs range        [0e+00, 0e+00]
-------------------------------------------------------------------
 iteration    simulation      bound        time (s)     solves  pid
-------------------------------------------------------------------
         5  -2.396000e+01 -2.396000e+01  5.775118e-02        52   1
        10  -2.396000e+01 -2.396000e+01  6.603098e-02        92   1
        15  -2.396000e+01 -2.396000e+01  7.562017e-02       132   1
        20  -4.260000e+01 -2.396000e+01  8.672714e-02       172   1
        25  -5.320000e+00 -2.396000e+01  1.017292e-01       224   1
        30  -2.396000e+01 -2.396000e+01  1.158381e-01       264   1
        35  -2.396000e+01 -2.396000e+01  1.318741e-01       304   1
        40  -5.320000e+00 -2.396000e+01  1.502430e-01       344   1
-------------------------------------------------------------------
status         : simulation_stopping
total time (s) : 1.502430e-01
total solves   : 344
best bound     : -2.396000e+01
simulation ci  : -2.237170e+01 ± 4.300524e+00
numeric issues : 0
-------------------------------------------------------------------

────────────────────────────────────────────────────────────────────────────────────
                                           Time                    Allocations      
                                  ───────────────────────   ────────────────────────
        Tot / % measured:              157ms /  88.1%           15.1MiB /  94.0%    

Section                   ncalls     time    %tot     avg     alloc    %tot      avg
────────────────────────────────────────────────────────────────────────────────────
backward_pass                 40    106ms   76.1%  2.64ms   12.2MiB   85.5%   311KiB
  solve_subproblem           160   25.7ms   18.5%   161μs    940KiB    6.5%  5.88KiB
    get_dual_solution        160   1.44ms    1.0%  9.02μs    190KiB    1.3%  1.19KiB
  prepare_backward_pass      160   93.9μs    0.1%   587ns     0.00B    0.0%    0.00B
forward_pass                  40   22.0ms   15.9%   550μs   1.77MiB   12.5%  45.4KiB
  solve_subproblem           120   19.8ms   14.2%   165μs   1.60MiB   11.2%  13.6KiB
    get_dual_solution        120   84.9μs    0.1%   708ns   13.1KiB    0.1%     112B
  sample_scenario             40    448μs    0.3%  11.2μs   24.3KiB    0.2%     623B
calculate_bound               40   11.2ms    8.0%   279μs    291KiB    2.0%  7.27KiB
  get_dual_solution           40   41.0μs    0.0%  1.02μs   4.38KiB    0.0%     112B
get_dual_solution             36   23.8μs    0.0%   661ns   3.94KiB    0.0%     112B
────────────────────────────────────────────────────────────────────────────────────

[ Info: FAST_quickstart.jl
-------------------------------------------------------------------
         SDDP.jl (c) Oscar Dowson and contributors, 2017-25
-------------------------------------------------------------------
problem
  nodes           : 2
  state variables : 1
  scenarios       : 2.00000e+00
  existing cuts   : false
options
  solver          : serial mode
  risk measure    : SDDP.Expectation()
  sampling scheme : SDDP.InSampleMonteCarlo
subproblem structure
  VariableRef                             : [3, 4]
  AffExpr in MOI.LessThan{Float64}        : [1, 1]
  VariableRef in MOI.GreaterThan{Float64} : [2, 3]
  VariableRef in MOI.LessThan{Float64}    : [2, 2]
numerical stability report
  matrix range     [1e+00, 1e+00]
  objective range  [1e+00, 2e+00]
  bounds range     [2e+00, 5e+00]
  rhs range        [0e+00, 0e+00]
-------------------------------------------------------------------
 iteration    simulation      bound        time (s)     solves  pid
-------------------------------------------------------------------
         1   0.000000e+00 -2.500000e+00  1.798680e-01         5   1
         2  -2.500000e+00 -2.000000e+00  1.823270e-01        14   1
         3  -1.000000e+00 -2.000000e+00  1.831200e-01        19   1
         4  -1.000000e+00 -2.000000e+00  1.837480e-01        24   1
         5  -1.000000e+00 -2.000000e+00  1.846211e-01        29   1
         6  -3.000000e+00 -2.000000e+00  1.862180e-01        34   1
         7  -1.000000e+00 -2.000000e+00  1.871629e-01        39   1
         8  -1.000000e+00 -2.000000e+00  1.878860e-01        44   1
         9  -3.000000e+00 -2.000000e+00  1.887529e-01        49   1
        10  -1.000000e+00 -2.000000e+00  1.900499e-01        54   1
        11  -3.000000e+00 -2.000000e+00  1.908300e-01        59   1
        12  -3.000000e+00 -2.000000e+00  1.915901e-01        64   1
        13  -1.000000e+00 -2.000000e+00  1.924670e-01        69   1
        14  -1.000000e+00 -2.000000e+00  1.939049e-01        74   1
        15  -3.000000e+00 -2.000000e+00  1.948569e-01        79   1
        16  -1.000000e+00 -2.000000e+00  1.956201e-01        84   1
        17  -3.000000e+00 -2.000000e+00  1.965349e-01        89   1
        18  -3.000000e+00 -2.000000e+00  1.979809e-01        94   1
        19  -1.000000e+00 -2.000000e+00  1.988130e-01        99   1
        20  -3.000000e+00 -2.000000e+00  1.996989e-01       104   1
        21  -1.000000e+00 -2.000000e+00  2.022560e-01       113   1
        22  -1.000000e+00 -2.000000e+00  2.032449e-01       118   1
        23  -3.000000e+00 -2.000000e+00  2.040300e-01       123   1
        24  -3.000000e+00 -2.000000e+00  2.055941e-01       128   1
        25  -1.000000e+00 -2.000000e+00  2.063680e-01       133   1
        26  -3.000000e+00 -2.000000e+00  2.072001e-01       138   1
        27  -3.000000e+00 -2.000000e+00  2.082679e-01       143   1
        28  -1.000000e+00 -2.000000e+00  2.102389e-01       148   1
        29  -3.000000e+00 -2.000000e+00  2.118120e-01       153   1
        30  -3.000000e+00 -2.000000e+00  2.128770e-01       158   1
        31  -1.000000e+00 -2.000000e+00  2.141750e-01       163   1
        32  -1.000000e+00 -2.000000e+00  2.159541e-01       168   1
        33  -1.000000e+00 -2.000000e+00  2.173700e-01       173   1
        34  -3.000000e+00 -2.000000e+00  2.187359e-01       178   1
        35  -1.000000e+00 -2.000000e+00  2.197199e-01       183   1
        36  -3.000000e+00 -2.000000e+00  2.207520e-01       188   1
        37  -1.000000e+00 -2.000000e+00  2.219961e-01       193   1
        38  -1.000000e+00 -2.000000e+00  2.238989e-01       198   1
        39  -1.000000e+00 -2.000000e+00  2.257979e-01       203   1
        40  -1.000000e+00 -2.000000e+00  2.269919e-01       208   1
-------------------------------------------------------------------
status         : simulation_stopping
total time (s) : 2.269919e-01
total solves   : 208
best bound     : -2.000000e+00
simulation ci  : -1.812500e+00 ± 3.171441e-01
numeric issues : 0
-------------------------------------------------------------------

[ Info: Hydro_thermal.jl
-------------------------------------------------------------------
         SDDP.jl (c) Oscar Dowson and contributors, 2017-25
-------------------------------------------------------------------
problem
  nodes           : 3
  state variables : 1
  scenarios       : Inf
  existing cuts   : false
options
  solver          : serial mode
  risk measure    : SDDP.Expectation()
  sampling scheme : SDDP.InSampleMonteCarlo
subproblem structure
  VariableRef                             : [6, 6]
  AffExpr in MOI.EqualTo{Float64}         : [2, 2]
  VariableRef in MOI.GreaterThan{Float64} : [5, 5]
  VariableRef in MOI.LessThan{Float64}    : [1, 1]
numerical stability report
  matrix range     [1e+00, 1e+00]
  objective range  [1e+00, 3e+00]
  bounds range     [5e+00, 2e+01]
  rhs range        [2e+00, 1e+01]
-------------------------------------------------------------------
 iteration    simulation      bound        time (s)     solves  pid
-------------------------------------------------------------------
         1   4.000000e+01  1.882708e+01  2.871010e-01        51   1
        24   2.178733e+02  2.251256e+02  1.321198e+00      3972   1
        30   2.138334e+03  2.336430e+02  2.801166e+00      7674   1
        38   8.025312e+02  2.352957e+02  4.201566e+00     10194   1
        45   4.103715e+01  2.358381e+02  5.201656e+00     11835   1
        54   1.830901e+02  2.360657e+02  6.254507e+00     13446   1
        63   1.493193e+03  2.362190e+02  8.090244e+00     15909   1
        71   1.519535e+02  2.362929e+02  9.152928e+00     17205   1
        98   5.715017e+02  2.364082e+02  1.458867e+01     23094   1
       100   4.969839e+02  2.364135e+02  1.547894e+01     23928   1
-------------------------------------------------------------------
status         : iteration_limit
total time (s) : 1.547894e+01
total solves   : 23928
best bound     :  2.364135e+02
simulation ci  :  2.345669e+02 ± 6.032770e+01
numeric issues : 0
-------------------------------------------------------------------

On average, 2.1 units of thermal are used in the first stage.
[ Info: StochDynamicProgramming.jl_multistock.jl
-------------------------------------------------------------------
         SDDP.jl (c) Oscar Dowson and contributors, 2017-25
-------------------------------------------------------------------
problem
  nodes           : 5
  state variables : 3
  scenarios       : 1.43489e+07
  existing cuts   : false
options
  solver          : serial mode
  risk measure    : SDDP.Expectation()
  sampling scheme : SDDP.InSampleMonteCarlo
subproblem structure
  VariableRef                             : [13, 13]
  AffExpr in MOI.EqualTo{Float64}         : [3, 3]
  AffExpr in MOI.LessThan{Float64}        : [1, 1]
  VariableRef in MOI.EqualTo{Float64}     : [3, 3]
  VariableRef in MOI.GreaterThan{Float64} : [7, 7]
  VariableRef in MOI.LessThan{Float64}    : [6, 7]
numerical stability report
  matrix range     [1e+00, 1e+00]
  objective range  [3e-01, 2e+00]
  bounds range     [5e-01, 5e+00]
  rhs range        [2e+00, 2e+00]
-------------------------------------------------------------------
 iteration    simulation      bound        time (s)     solves  pid
-------------------------------------------------------------------
        10  -4.977586e+00 -4.446713e+00  7.953608e-01      1400   1
        20  -4.764789e+00 -4.394789e+00  1.027118e+00      2800   1
        30  -4.672487e+00 -4.377000e+00  1.216239e+00      4200   1
        40  -4.483495e+00 -4.370632e+00  1.424550e+00      5600   1
        50  -4.167321e+00 -4.364999e+00  1.680363e+00      7000   1
        60  -4.362455e+00 -4.358864e+00  1.985964e+00      8400   1
        70  -4.849916e+00 -4.355337e+00  2.258189e+00      9800   1
        80  -4.861568e+00 -4.353006e+00  2.536686e+00     11200   1
        90  -4.268264e+00 -4.350407e+00  2.847262e+00     12600   1
       100  -4.539897e+00 -4.348641e+00  3.163836e+00     14000   1
-------------------------------------------------------------------
status         : iteration_limit
total time (s) : 3.163836e+00
total solves   : 14000
best bound     : -4.348641e+00
simulation ci  : -4.325071e+00 ± 8.068858e-02
numeric issues : 0
-------------------------------------------------------------------

[ Info: StochDynamicProgramming.jl_stock.jl
-------------------------------------------------------------------
         SDDP.jl (c) Oscar Dowson and contributors, 2017-25
-------------------------------------------------------------------
problem
  nodes           : 5
  state variables : 1
  scenarios       : 1.00000e+05
  existing cuts   : false
options
  solver          : serial mode
  risk measure    : SDDP.Expectation()
  sampling scheme : SDDP.InSampleMonteCarlo
subproblem structure
  VariableRef                             : [5, 5]
  AffExpr in MOI.EqualTo{Float64}         : [1, 1]
  VariableRef in MOI.EqualTo{Float64}     : [1, 1]
  VariableRef in MOI.GreaterThan{Float64} : [3, 3]
  VariableRef in MOI.LessThan{Float64}    : [2, 3]
numerical stability report
  matrix range     [1e+00, 1e+00]
  objective range  [3e-01, 2e+00]
  bounds range     [5e-01, 2e+00]
  rhs range        [0e+00, 0e+00]
-------------------------------------------------------------------
 iteration    simulation      bound        time (s)     solves  pid
-------------------------------------------------------------------
        10  -1.671715e+00 -1.476962e+00  4.248009e-01      1050   1
        20  -1.529197e+00 -1.471817e+00  5.015659e-01      1600   1
        30  -1.410768e+00 -1.471408e+00  6.714258e-01      2650   1
        40  -1.596461e+00 -1.471258e+00  7.562029e-01      3200   1
        50  -1.002277e+00 -1.471216e+00  9.401269e-01      4250   1
        60  -1.085156e+00 -1.471164e+00  1.031928e+00      4800   1
        70  -1.391746e+00 -1.471164e+00  1.218676e+00      5850   1
        80  -1.448703e+00 -1.471132e+00  1.317355e+00      6400   1
        90  -1.488989e+00 -1.471087e+00  1.501683e+00      7450   1
       100  -1.564260e+00 -1.471075e+00  1.581190e+00      8000   1
       110  -1.738157e+00 -1.471075e+00  1.685918e+00      8550   1
       120  -1.591292e+00 -1.471075e+00  1.793480e+00      9100   1
       130  -1.271481e+00 -1.471075e+00  1.902512e+00      9650   1
       140  -1.249746e+00 -1.471075e+00  2.014882e+00     10200   1
       150  -1.536222e+00 -1.471075e+00  2.134832e+00     10750   1
       160  -1.565422e+00 -1.471075e+00  2.263339e+00     11300   1
       170  -1.631076e+00 -1.471075e+00  2.386432e+00     11850   1
       180  -1.494909e+00 -1.471075e+00  2.513134e+00     12400   1
       182  -9.083563e-01 -1.471075e+00  2.537497e+00     12510   1
-------------------------------------------------------------------
status         : simulation_stopping
total time (s) : 2.537497e+00
total solves   : 12510
best bound     : -1.471075e+00
simulation ci  : -1.462065e+00 ± 2.699238e-02
numeric issues : 0
-------------------------------------------------------------------

[ Info: StructDualDynProg.jl_prob5.2_2stages.jl
-------------------------------------------------------------------
         SDDP.jl (c) Oscar Dowson and contributors, 2017-25
-------------------------------------------------------------------
problem
  nodes           : 2
  state variables : 4
  scenarios       : 2.00000e+00
  existing cuts   : false
options
  solver          : serial mode
  risk measure    : SDDP.Expectation()
  sampling scheme : SDDP.InSampleMonteCarlo
subproblem structure
  VariableRef                             : [29, 29]
  AffExpr in MOI.EqualTo{Float64}         : [4, 5]
  AffExpr in MOI.GreaterThan{Float64}     : [3, 3]
  AffExpr in MOI.LessThan{Float64}        : [4, 4]
  VariableRef in MOI.EqualTo{Float64}     : [3, 3]
  VariableRef in MOI.GreaterThan{Float64} : [22, 22]
  VariableRef in MOI.LessThan{Float64}    : [1, 1]
numerical stability report
  matrix range     [1e+00, 1e+00]
  objective range  [1e+00, 1e+06]
  bounds range     [0e+00, 0e+00]
  rhs range        [0e+00, 0e+00]
-------------------------------------------------------------------
 iteration    simulation      bound        time (s)     solves  pid
-------------------------------------------------------------------
        10   3.455904e+05  3.147347e+05  2.271295e-02        54   1
        20   3.336455e+05  3.402383e+05  3.615689e-02       104   1
        30   3.993519e+05  3.403155e+05  4.804206e-02       158   1
        40   3.337559e+05  3.403155e+05  5.856395e-02       208   1
        48   3.337559e+05  3.403155e+05  6.831193e-02       248   1
-------------------------------------------------------------------
status         : simulation_stopping
total time (s) : 6.831193e-02
total solves   : 248
best bound     :  3.403155e+05
simulation ci  :  1.298444e+08 ± 1.785864e+08
numeric issues : 0
-------------------------------------------------------------------

[ Info: StructDualDynProg.jl_prob5.2_3stages.jl
-------------------------------------------------------------------
         SDDP.jl (c) Oscar Dowson and contributors, 2017-25
-------------------------------------------------------------------
problem
  nodes           : 3
  state variables : 4
  scenarios       : 4.00000e+00
  existing cuts   : false
options
  solver          : serial mode
  risk measure    : SDDP.Expectation()
  sampling scheme : SDDP.InSampleMonteCarlo
subproblem structure
  VariableRef                             : [29, 29]
  AffExpr in MOI.EqualTo{Float64}         : [4, 5]
  AffExpr in MOI.GreaterThan{Float64}     : [3, 3]
  AffExpr in MOI.LessThan{Float64}        : [4, 4]
  VariableRef in MOI.EqualTo{Float64}     : [3, 3]
  VariableRef in MOI.GreaterThan{Float64} : [22, 22]
  VariableRef in MOI.LessThan{Float64}    : [1, 1]
numerical stability report
  matrix range     [1e+00, 1e+00]
  objective range  [1e+00, 1e+05]
  bounds range     [0e+00, 0e+00]
  rhs range        [0e+00, 0e+00]
-------------------------------------------------------------------
 iteration    simulation      bound        time (s)     solves  pid
-------------------------------------------------------------------
        10   4.403329e+05  3.509666e+05  3.239799e-02        92   1
        20   4.506600e+05  4.054833e+05  5.317903e-02       172   1
        30   3.959476e+05  4.067125e+05  6.993198e-02       264   1
        40   4.497721e+05  4.067125e+05  8.571100e-02       344   1
        47   3.959476e+05  4.067125e+05  1.001401e-01       400   1
-------------------------------------------------------------------
status         : simulation_stopping
total time (s) : 1.001401e-01
total solves   : 400
best bound     :  4.067125e+05
simulation ci  :  2.696242e+07 ± 3.645299e+07
numeric issues : 0
-------------------------------------------------------------------

[ Info: agriculture_mccardle_farm.jl
-------------------------------------------------------------------
         SDDP.jl (c) Oscar Dowson and contributors, 2017-25
-------------------------------------------------------------------
problem
  nodes           : 10
  state variables : 4
  scenarios       : 2.70000e+01
  existing cuts   : false
options
  solver          : serial mode
  risk measure    : SDDP.Expectation()
  sampling scheme : SDDP.InSampleMonteCarlo
subproblem structure
  VariableRef                             : [24, 24]
  AffExpr in MOI.EqualTo{Float64}         : [3, 3]
  AffExpr in MOI.GreaterThan{Float64}     : [1, 1]
  AffExpr in MOI.LessThan{Float64}        : [1, 6]
  VariableRef in MOI.GreaterThan{Float64} : [20, 20]
  VariableRef in MOI.LessThan{Float64}    : [1, 2]
numerical stability report
  matrix range     [1e+00, 8e+01]
  objective range  [1e+00, 1e+03]
  bounds range     [6e+01, 6e+01]
  rhs range        [2e+02, 3e+03]
-------------------------------------------------------------------
 iteration    simulation      bound        time (s)     solves  pid
-------------------------------------------------------------------
         1   8.316000e+03  0.000000e+00  4.671726e+00        14   1
        40   2.308500e+03  4.074139e+03  5.191886e+00       776   1
-------------------------------------------------------------------
status         : simulation_stopping
total time (s) : 5.191886e+00
total solves   : 776
best bound     :  4.074139e+03
simulation ci  :  4.224313e+03 ± 6.692189e+02
numeric issues : 0
-------------------------------------------------------------------

[ Info: air_conditioning.jl
-------------------------------------------------------------------
         SDDP.jl (c) Oscar Dowson and contributors, 2017-25
-------------------------------------------------------------------
problem
  nodes           : 3
  state variables : 1
  scenarios       : 4.00000e+00
  existing cuts   : false
options
  solver          : serial mode
  risk measure    : SDDP.Expectation()
  sampling scheme : SDDP.InSampleMonteCarlo
subproblem structure
  VariableRef                             : [6, 6]
  AffExpr in MOI.EqualTo{Float64}         : [1, 1]
  VariableRef in MOI.EqualTo{Float64}     : [1, 1]
  VariableRef in MOI.GreaterThan{Float64} : [4, 4]
  VariableRef in MOI.Integer              : [3, 3]
  VariableRef in MOI.LessThan{Float64}    : [2, 3]
numerical stability report
  matrix range     [1e+00, 1e+00]
  objective range  [1e+00, 3e+02]
  bounds range     [1e+02, 2e+02]
  rhs range        [0e+00, 0e+00]
-------------------------------------------------------------------
 iteration    simulation      bound        time (s)     solves  pid
-------------------------------------------------------------------
         1L  7.000000e+04  6.250000e+04  1.875839e+00         8   1
        20L  6.000000e+04  6.250000e+04  2.655104e+00       172   1
-------------------------------------------------------------------
status         : simulation_stopping
total time (s) : 2.655104e+00
total solves   : 172
best bound     :  6.250000e+04
simulation ci  :  5.475000e+04 ± 7.336233e+03
numeric issues : 0
-------------------------------------------------------------------

Lower bound is: 62500.0
With first stage solutions 200.0 (production) and 100.0 (stored_production).
-------------------------------------------------------------------
         SDDP.jl (c) Oscar Dowson and contributors, 2017-25
-------------------------------------------------------------------
problem
  nodes           : 3
  state variables : 1
  scenarios       : 4.00000e+00
  existing cuts   : false
options
  solver          : serial mode
  risk measure    : SDDP.Expectation()
  sampling scheme : SDDP.InSampleMonteCarlo
subproblem structure
  VariableRef                             : [6, 6]
  AffExpr in MOI.EqualTo{Float64}         : [1, 1]
  VariableRef in MOI.EqualTo{Float64}     : [1, 1]
  VariableRef in MOI.GreaterThan{Float64} : [4, 4]
  VariableRef in MOI.Integer              : [3, 3]
  VariableRef in MOI.LessThan{Float64}    : [2, 3]
numerical stability report
  matrix range     [1e+00, 1e+00]
  objective range  [1e+00, 3e+02]
  bounds range     [1e+02, 2e+02]
  rhs range        [0e+00, 0e+00]
-------------------------------------------------------------------
 iteration    simulation      bound        time (s)     solves  pid
-------------------------------------------------------------------
         1   7.000000e+04  6.250000e+04  1.252198e-02         8   1
        20   4.000000e+04  6.250000e+04  3.586679e-01       172   1
-------------------------------------------------------------------
status         : simulation_stopping
total time (s) : 3.586679e-01
total solves   : 172
best bound     :  6.250000e+04
simulation ci  :  5.950000e+04 ± 8.933885e+03
numeric issues : 0
-------------------------------------------------------------------

Lower bound is: 62500.0
With first stage solutions 200.0 (production) and 100.0 (stored_production).
[ Info: air_conditioning_forward.jl
-------------------------------------------------------------------
         SDDP.jl (c) Oscar Dowson and contributors, 2017-25
-------------------------------------------------------------------
problem
  nodes           : 3
  state variables : 1
  scenarios       : 4.00000e+00
  existing cuts   : false
options
  solver          : serial mode
  risk measure    : SDDP.Expectation()
  sampling scheme : SDDP.InSampleMonteCarlo
subproblem structure
  VariableRef                             : [5, 5]
  AffExpr in MOI.EqualTo{Float64}         : [1, 1]
  VariableRef in MOI.GreaterThan{Float64} : [4, 4]
  VariableRef in MOI.LessThan{Float64}    : [2, 3]
numerical stability report
  matrix range     [1e+00, 1e+00]
  objective range  [1e+00, 3e+02]
  bounds range     [1e+02, 2e+02]
  rhs range        [1e+02, 3e+02]
-------------------------------------------------------------------
 iteration    simulation      bound        time (s)     solves  pid
-------------------------------------------------------------------
         1   7.000000e+04  6.250000e+04  6.070399e-02         5   1
        10   4.000000e+04  6.250000e+04  3.858910e-01        50   1
-------------------------------------------------------------------
status         : iteration_limit
total time (s) : 3.858910e-01
total solves   : 50
best bound     :  6.250000e+04
simulation ci  :  5.450000e+04 ± 1.135842e+04
numeric issues : 0
-------------------------------------------------------------------

[ Info: all_blacks.jl
-------------------------------------------------------------------
         SDDP.jl (c) Oscar Dowson and contributors, 2017-25
-------------------------------------------------------------------
problem
  nodes           : 3
  state variables : 2
  scenarios       : 1.00000e+00
  existing cuts   : false
options
  solver          : serial mode
  risk measure    : SDDP.Expectation()
  sampling scheme : SDDP.InSampleMonteCarlo
subproblem structure
  VariableRef                             : [6, 6]
  AffExpr in MOI.EqualTo{Float64}         : [2, 2]
  VariableRef in MOI.GreaterThan{Float64} : [2, 3]
  VariableRef in MOI.LessThan{Float64}    : [3, 3]
  VariableRef in MOI.ZeroOne              : [3, 3]
numerical stability report
  matrix range     [1e+00, 1e+00]
  objective range  [1e+00, 6e+00]
  bounds range     [1e+00, 1e+02]
  rhs range        [0e+00, 0e+00]
-------------------------------------------------------------------
 iteration    simulation      bound        time (s)     solves  pid
-------------------------------------------------------------------
         1L  6.000000e+00  9.000000e+00  3.213499e-01         6   1
        20L  9.000000e+00  9.000000e+00  4.115958e-01       123   1
-------------------------------------------------------------------
status         : simulation_stopping
total time (s) : 4.115958e-01
total solves   : 123
best bound     :  9.000000e+00
simulation ci  :  8.850000e+00 ± 2.940000e-01
numeric issues : 0
-------------------------------------------------------------------

[ Info: asset_management_simple.jl
-------------------------------------------------------------------
         SDDP.jl (c) Oscar Dowson and contributors, 2017-25
-------------------------------------------------------------------
problem
  nodes           : 7
  state variables : 2
  scenarios       : 8.00000e+00
  existing cuts   : false
options
  solver          : serial mode
  risk measure    : SDDP.Expectation()
  sampling scheme : SDDP.InSampleMonteCarlo
subproblem structure
  VariableRef                             : [5, 7]
  AffExpr in MOI.EqualTo{Float64}         : [1, 1]
  VariableRef in MOI.GreaterThan{Float64} : [3, 5]
  VariableRef in MOI.LessThan{Float64}    : [1, 1]
numerical stability report
  matrix range     [1e+00, 1e+00]
  objective range  [1e+00, 4e+00]
  bounds range     [1e+03, 1e+03]
  rhs range        [6e+01, 8e+01]
-------------------------------------------------------------------
 iteration    simulation      bound        time (s)     solves  pid
-------------------------------------------------------------------
         5  -1.109375e+01  2.605769e-01  1.156792e+00        87   1
        10  -1.109375e+01  2.605769e-01  1.169078e+00       142   1
        15   3.105797e+00  5.434132e-01  1.183860e+00       197   1
        20  -2.463349e+01  1.503415e+00  1.198920e+00       252   1
        25  -1.421085e-14  1.514085e+00  1.213666e+00       307   1
        30   4.864000e+01  1.514085e+00  3.354302e+00       394   1
        35   4.864000e+01  1.514085e+00  3.369208e+00       449   1
        40  -8.870299e+00  1.514085e+00  3.384884e+00       504   1
        45  -1.428571e+00  1.514085e+00  3.400982e+00       559   1
        48  -1.428571e+00  1.514085e+00  3.412170e+00       592   1
-------------------------------------------------------------------
status         : simulation_stopping
total time (s) : 3.412170e+00
total solves   : 592
best bound     :  1.514085e+00
simulation ci  :  2.494033e+00 ± 5.472486e+00
numeric issues : 0
-------------------------------------------------------------------

[ Info: asset_management_stagewise.jl
-------------------------------------------------------------------
         SDDP.jl (c) Oscar Dowson and contributors, 2017-25
-------------------------------------------------------------------
problem
  nodes           : 7
  state variables : 2
  scenarios       : 3.20000e+01
  existing cuts   : false
options
  solver          : serial mode
  risk measure    : #108
  sampling scheme : SDDP.InSampleMonteCarlo
subproblem structure
  VariableRef                             : [5, 7]
  AffExpr in MOI.EqualTo{Float64}         : [1, 1]
  VariableRef in MOI.EqualTo{Float64}     : [1, 1]
  VariableRef in MOI.GreaterThan{Float64} : [2, 5]
  VariableRef in MOI.LessThan{Float64}    : [1, 1]
numerical stability report
  matrix range     [1e+00, 1e+00]
  objective range  [2e-02, 4e+00]
  bounds range     [1e+03, 1e+03]
  rhs range        [6e+01, 8e+01]
-------------------------------------------------------------------
 iteration    simulation      bound        time (s)     solves  pid
-------------------------------------------------------------------
        10   1.395796e+01  1.428818e+00  1.006833e+00       278   1
        20   1.440356e+01  1.278425e+00  1.047501e+00       428   1
        30   8.388546e+00  1.278425e+00  1.114077e+00       706   1
        40   6.666667e-03  1.278410e+00  1.170475e+00       856   1
        50  -5.614035e+00  1.278410e+00  1.235760e+00      1134   1
        60   1.426676e+01  1.278410e+00  1.281496e+00      1284   1
        64   1.261296e+01  1.278410e+00  1.301042e+00      1344   1
-------------------------------------------------------------------
status         : simulation_stopping
total time (s) : 1.301042e+00
total solves   : 1344
best bound     :  1.278410e+00
simulation ci  :  8.172580e-01 ± 5.385320e+00
numeric issues : 0
-------------------------------------------------------------------

-------------------------------------------------------------------
         SDDP.jl (c) Oscar Dowson and contributors, 2017-25
-------------------------------------------------------------------
problem
  nodes           : 7
  state variables : 2
  scenarios       : 3.20000e+01
  existing cuts   : false
options
  solver          : serial mode
  risk measure    : #108
  sampling scheme : SDDP.InSampleMonteCarlo
subproblem structure
  VariableRef                             : [5, 7]
  AffExpr in MOI.EqualTo{Float64}         : [1, 1]
  VariableRef in MOI.EqualTo{Float64}     : [1, 1]
  VariableRef in MOI.GreaterThan{Float64} : [2, 5]
  VariableRef in MOI.LessThan{Float64}    : [1, 1]
numerical stability report
  matrix range     [1e+00, 1e+00]
  objective range  [2e-02, 4e+00]
  bounds range     [1e+03, 1e+03]
  rhs range        [6e+01, 8e+01]
-------------------------------------------------------------------
 iteration    simulation      bound        time (s)     solves  pid
-------------------------------------------------------------------
        10   1.111809e+00  1.278488e+00  8.945704e-02       278   1
        20   1.111084e+01  1.278410e+00  1.379099e-01       428   1
        30   2.293779e+01  1.278410e+00  2.205269e-01       706   1
        40   1.426676e+01  1.278410e+00  3.009350e-01       856   1
-------------------------------------------------------------------
status         : simulation_stopping
total time (s) : 3.009350e-01
total solves   : 856
best bound     :  1.278410e+00
simulation ci  :  3.654300e+00 ± 6.176856e+00
numeric issues : 0
-------------------------------------------------------------------

[ Info: belief.jl
-------------------------------------------------------------------
         SDDP.jl (c) Oscar Dowson and contributors, 2017-25
-------------------------------------------------------------------
problem
  nodes           : 4
  state variables : 1
  scenarios       : Inf
  existing cuts   : false
options
  solver          : serial mode
  risk measure    : SDDP.Expectation()
  sampling scheme : SDDP.InSampleMonteCarlo
subproblem structure
  VariableRef                             : [7, 7]
  AffExpr in MOI.EqualTo{Float64}         : [1, 1]
  AffExpr in MOI.GreaterThan{Float64}     : [2, 2]
  VariableRef in MOI.EqualTo{Float64}     : [1, 1]
  VariableRef in MOI.GreaterThan{Float64} : [5, 5]
  VariableRef in MOI.LessThan{Float64}    : [3, 3]
numerical stability report
  matrix range     [1e+00, 1e+00]
  objective range  [1e+00, 2e+00]
  bounds range     [2e+00, 1e+02]
  rhs range        [0e+00, 0e+00]
-------------------------------------------------------------------
 iteration    simulation      bound        time (s)     solves  pid
-------------------------------------------------------------------
        10   4.787277e+00  9.346930e+00  5.800083e+00       900   1
        20   6.374753e+00  1.361934e+01  6.169310e+00      1720   1
        30   2.848217e+01  1.624016e+01  7.054688e+00      3036   1
        40   1.973944e+01  1.776547e+01  7.989627e+00      4192   1
        50   4.000000e+00  1.889360e+01  8.817499e+00      5020   1
        60   1.143524e+01  1.907862e+01  9.740934e+00      5808   1
        70   9.386174e+00  1.961343e+01  1.075386e+01      6540   1
        80   5.667808e+01  1.890971e+01  1.151341e+01      7088   1
        90   3.740638e+01  1.993168e+01  1.318739e+01      8180   1
       100   9.867073e+00  2.001710e+01  1.398352e+01      8664   1
-------------------------------------------------------------------
status         : iteration_limit
total time (s) : 1.398352e+01
total solves   : 8664
best bound     :  2.001710e+01
simulation ci  :  2.301353e+01 ± 4.670835e+00
numeric issues : 0
-------------------------------------------------------------------

[ Info: biobjective_hydro.jl
-------------------------------------------------------------------
         SDDP.jl (c) Oscar Dowson and contributors, 2017-25
-------------------------------------------------------------------
problem
  nodes           : 3
  state variables : 1
  scenarios       : 1.33100e+03
  existing cuts   : false
options
  solver          : serial mode
  risk measure    : SDDP.Expectation()
  sampling scheme : SDDP.InSampleMonteCarlo
subproblem structure
  VariableRef                             : [9, 9]
  AffExpr in MOI.EqualTo{Float64}         : [2, 4]
  AffExpr in MOI.GreaterThan{Float64}     : [3, 5]
  VariableRef in MOI.GreaterThan{Float64} : [8, 8]
  VariableRef in MOI.LessThan{Float64}    : [5, 6]
-------------------------------------------------------------------
 iteration    simulation      bound        time (s)     solves  pid
-------------------------------------------------------------------
         1   0.000000e+00  0.000000e+00  2.758890e+00        36   1
        10   0.000000e+00  0.000000e+00  2.794431e+00       360   1
-------------------------------------------------------------------
status         : iteration_limit
total time (s) : 2.794431e+00
total solves   : 360
best bound     :  0.000000e+00
simulation ci  :  0.000000e+00 ± 0.000000e+00
numeric issues : 0
-------------------------------------------------------------------

-------------------------------------------------------------------
         SDDP.jl (c) Oscar Dowson and contributors, 2017-25
-------------------------------------------------------------------
problem
  nodes           : 3
  state variables : 1
  scenarios       : 1.33100e+03
  existing cuts   : true
options
  solver          : serial mode
  risk measure    : SDDP.Expectation()
  sampling scheme : SDDP.InSampleMonteCarlo
subproblem structure
  VariableRef                             : [9, 9]
  AffExpr in MOI.EqualTo{Float64}         : [2, 4]
  AffExpr in MOI.GreaterThan{Float64}     : [3, 7]
  VariableRef in MOI.EqualTo{Float64}     : [1, 1]
  VariableRef in MOI.GreaterThan{Float64} : [8, 8]
  VariableRef in MOI.LessThan{Float64}    : [5, 6]
-------------------------------------------------------------------
 iteration    simulation      bound        time (s)     solves  pid
-------------------------------------------------------------------
         1   9.500000e+02  5.500000e+02  5.582094e-03       407   1
        10   2.850000e+02  5.728212e+02  5.260110e-02       731   1
-------------------------------------------------------------------
status         : iteration_limit
total time (s) : 5.260110e-02
total solves   : 731
best bound     :  5.728212e+02
simulation ci  :  6.480000e+02 ± 1.400040e+02
numeric issues : 0
-------------------------------------------------------------------

-------------------------------------------------------------------
         SDDP.jl (c) Oscar Dowson and contributors, 2017-25
-------------------------------------------------------------------
problem
  nodes           : 3
  state variables : 1
  scenarios       : 1.33100e+03
  existing cuts   : true
options
  solver          : serial mode
  risk measure    : SDDP.Expectation()
  sampling scheme : SDDP.InSampleMonteCarlo
subproblem structure
  VariableRef                             : [9, 9]
  AffExpr in MOI.EqualTo{Float64}         : [2, 4]
  AffExpr in MOI.GreaterThan{Float64}     : [3, 13]
  VariableRef in MOI.EqualTo{Float64}     : [1, 1]
  VariableRef in MOI.GreaterThan{Float64} : [8, 8]
  VariableRef in MOI.LessThan{Float64}    : [5, 6]
-------------------------------------------------------------------
 iteration    simulation      bound        time (s)     solves  pid
-------------------------------------------------------------------
         1   4.150000e+02  3.347014e+02  5.629063e-03       778   1
        10   2.825000e+02  3.465177e+02  5.837798e-02      1102   1
-------------------------------------------------------------------
status         : iteration_limit
total time (s) : 5.837798e-02
total solves   : 1102
best bound     :  3.465177e+02
simulation ci  :  3.598954e+02 ± 6.281469e+01
numeric issues : 0
-------------------------------------------------------------------

-------------------------------------------------------------------
         SDDP.jl (c) Oscar Dowson and contributors, 2017-25
-------------------------------------------------------------------
problem
  nodes           : 3
  state variables : 1
  scenarios       : 1.33100e+03
  existing cuts   : true
options
  solver          : serial mode
  risk measure    : SDDP.Expectation()
  sampling scheme : SDDP.InSampleMonteCarlo
subproblem structure
  VariableRef                             : [9, 9]
  AffExpr in MOI.EqualTo{Float64}         : [2, 4]
  AffExpr in MOI.GreaterThan{Float64}     : [3, 19]
  VariableRef in MOI.EqualTo{Float64}     : [1, 1]
  VariableRef in MOI.GreaterThan{Float64} : [8, 8]
  VariableRef in MOI.LessThan{Float64}    : [5, 6]
-------------------------------------------------------------------
 iteration    simulation      bound        time (s)     solves  pid
-------------------------------------------------------------------
         1   2.387500e+02  2.006818e+02  6.219864e-03      1149   1
        10   2.587500e+02  2.052799e+02  5.816793e-02      1473   1
-------------------------------------------------------------------
status         : iteration_limit
total time (s) : 5.816793e-02
total solves   : 1473
best bound     :  2.052799e+02
simulation ci  :  2.206923e+02 ± 2.764045e+01
numeric issues : 0
-------------------------------------------------------------------

-------------------------------------------------------------------
         SDDP.jl (c) Oscar Dowson and contributors, 2017-25
-------------------------------------------------------------------
problem
  nodes           : 3
  state variables : 1
  scenarios       : 1.33100e+03
  existing cuts   : true
options
  solver          : serial mode
  risk measure    : SDDP.Expectation()
  sampling scheme : SDDP.InSampleMonteCarlo
subproblem structure
  VariableRef                             : [9, 9]
  AffExpr in MOI.EqualTo{Float64}         : [2, 4]
  AffExpr in MOI.GreaterThan{Float64}     : [3, 24]
  VariableRef in MOI.EqualTo{Float64}     : [1, 1]
  VariableRef in MOI.GreaterThan{Float64} : [8, 8]
  VariableRef in MOI.LessThan{Float64}    : [5, 6]
-------------------------------------------------------------------
 iteration    simulation      bound        time (s)     solves  pid
-------------------------------------------------------------------
         1   9.375000e+02  4.637735e+02  6.819963e-03      1520   1
        10   2.875000e+02  4.661908e+02  6.013989e-02      1844   1
-------------------------------------------------------------------
status         : iteration_limit
total time (s) : 6.013989e-02
total solves   : 1844
best bound     :  4.661908e+02
simulation ci  :  5.075000e+02 ± 1.503394e+02
numeric issues : 0
-------------------------------------------------------------------

-------------------------------------------------------------------
         SDDP.jl (c) Oscar Dowson and contributors, 2017-25
-------------------------------------------------------------------
problem
  nodes           : 3
  state variables : 1
  scenarios       : 1.33100e+03
  existing cuts   : true
options
  solver          : serial mode
  risk measure    : SDDP.Expectation()
  sampling scheme : SDDP.InSampleMonteCarlo
subproblem structure
  VariableRef                             : [9, 9]
  AffExpr in MOI.EqualTo{Float64}         : [2, 4]
  AffExpr in MOI.GreaterThan{Float64}     : [3, 30]
  VariableRef in MOI.EqualTo{Float64}     : [1, 1]
  VariableRef in MOI.GreaterThan{Float64} : [8, 8]
  VariableRef in MOI.LessThan{Float64}    : [5, 6]
-------------------------------------------------------------------
 iteration    simulation      bound        time (s)     solves  pid
-------------------------------------------------------------------
         1   1.112500e+02  1.129545e+02  6.242990e-03      1891   1
        10   1.000000e+02  1.129771e+02  6.367588e-02      2215   1
-------------------------------------------------------------------
status         : iteration_limit
total time (s) : 6.367588e-02
total solves   : 2215
best bound     :  1.129771e+02
simulation ci  :  1.068750e+02 ± 2.168477e+01
numeric issues : 0
-------------------------------------------------------------------

-------------------------------------------------------------------
         SDDP.jl (c) Oscar Dowson and contributors, 2017-25
-------------------------------------------------------------------
problem
  nodes           : 3
  state variables : 1
  scenarios       : 1.33100e+03
  existing cuts   : true
options
  solver          : serial mode
  risk measure    : SDDP.Expectation()
  sampling scheme : SDDP.InSampleMonteCarlo
subproblem structure
  VariableRef                             : [9, 9]
  AffExpr in MOI.EqualTo{Float64}         : [2, 4]
  AffExpr in MOI.GreaterThan{Float64}     : [3, 34]
  VariableRef in MOI.EqualTo{Float64}     : [1, 1]
  VariableRef in MOI.GreaterThan{Float64} : [8, 8]
  VariableRef in MOI.LessThan{Float64}    : [5, 6]
-------------------------------------------------------------------
 iteration    simulation      bound        time (s)     solves  pid
-------------------------------------------------------------------
         1   4.562500e+02  2.788383e+02  6.689072e-03      2262   1
        10   1.625000e+02  2.794553e+02  6.259108e-02      2586   1
-------------------------------------------------------------------
status         : iteration_limit
total time (s) : 6.259108e-02
total solves   : 2586
best bound     :  2.794553e+02
simulation ci  :  2.690625e+02 ± 6.720434e+01
numeric issues : 0
-------------------------------------------------------------------

-------------------------------------------------------------------
         SDDP.jl (c) Oscar Dowson and contributors, 2017-25
-------------------------------------------------------------------
problem
  nodes           : 3
  state variables : 1
  scenarios       : 1.33100e+03
  existing cuts   : true
options
  solver          : serial mode
  risk measure    : SDDP.Expectation()
  sampling scheme : SDDP.InSampleMonteCarlo
subproblem structure
  VariableRef                             : [9, 9]
  AffExpr in MOI.EqualTo{Float64}         : [2, 4]
  AffExpr in MOI.GreaterThan{Float64}     : [3, 38]
  VariableRef in MOI.EqualTo{Float64}     : [1, 1]
  VariableRef in MOI.GreaterThan{Float64} : [8, 8]
  VariableRef in MOI.LessThan{Float64}    : [5, 6]
-------------------------------------------------------------------
 iteration    simulation      bound        time (s)     solves  pid
-------------------------------------------------------------------
         1   4.810804e+02  4.073537e+02  7.181883e-03      2633   1
        10   5.487500e+02  4.077574e+02  6.517291e-02      2957   1
-------------------------------------------------------------------
status         : iteration_limit
total time (s) : 6.517291e-02
total solves   : 2957
best bound     :  4.077574e+02
simulation ci  :  3.863418e+02 ± 9.936379e+01
numeric issues : 0
-------------------------------------------------------------------

-------------------------------------------------------------------
         SDDP.jl (c) Oscar Dowson and contributors, 2017-25
-------------------------------------------------------------------
problem
  nodes           : 3
  state variables : 1
  scenarios       : 1.33100e+03
  existing cuts   : true
options
  solver          : serial mode
  risk measure    : SDDP.Expectation()
  sampling scheme : SDDP.InSampleMonteCarlo
subproblem structure
  VariableRef                             : [9, 9]
  AffExpr in MOI.EqualTo{Float64}         : [2, 4]
  AffExpr in MOI.GreaterThan{Float64}     : [3, 43]
  VariableRef in MOI.EqualTo{Float64}     : [1, 1]
  VariableRef in MOI.GreaterThan{Float64} : [8, 8]
  VariableRef in MOI.LessThan{Float64}    : [5, 6]
-------------------------------------------------------------------
 iteration    simulation      bound        time (s)     solves  pid
-------------------------------------------------------------------
         1   2.718750e+02  5.198033e+02  7.827997e-03      3004   1
        10   6.771875e+02  5.210100e+02  6.924415e-02      3328   1
-------------------------------------------------------------------
status         : iteration_limit
total time (s) : 6.924415e-02
total solves   : 3328
best bound     :  5.210100e+02
simulation ci  :  5.831217e+02 ± 1.295425e+02
numeric issues : 0
-------------------------------------------------------------------

-------------------------------------------------------------------
         SDDP.jl (c) Oscar Dowson and contributors, 2017-25
-------------------------------------------------------------------
problem
  nodes           : 3
  state variables : 1
  scenarios       : 1.33100e+03
  existing cuts   : true
options
  solver          : serial mode
  risk measure    : SDDP.Expectation()
  sampling scheme : SDDP.InSampleMonteCarlo
subproblem structure
  VariableRef                             : [9, 9]
  AffExpr in MOI.EqualTo{Float64}         : [2, 4]
  AffExpr in MOI.GreaterThan{Float64}     : [3, 50]
  VariableRef in MOI.EqualTo{Float64}     : [1, 1]
  VariableRef in MOI.GreaterThan{Float64} : [8, 8]
  VariableRef in MOI.LessThan{Float64}    : [5, 6]
-------------------------------------------------------------------
 iteration    simulation      bound        time (s)     solves  pid
-------------------------------------------------------------------
         1   7.812500e+01  5.720558e+01  6.861925e-03      3375   1
        10   5.312500e+01  5.938345e+01  5.585694e-02      3699   1
-------------------------------------------------------------------
status         : iteration_limit
total time (s) : 5.585694e-02
total solves   : 3699
best bound     :  5.938345e+01
simulation ci  :  6.187500e+01 ± 1.306667e+01
numeric issues : 0
-------------------------------------------------------------------

[ Info: booking_management.jl
-------------------------------------------------------------------
         SDDP.jl (c) Oscar Dowson and contributors, 2017-25
-------------------------------------------------------------------
problem
  nodes           : 5
  state variables : 2
  scenarios       : 3.20000e+01
  existing cuts   : false
options
  solver          : serial mode
  risk measure    : SDDP.Expectation()
  sampling scheme : SDDP.InSampleMonteCarlo
subproblem structure
  VariableRef                             : [10, 10]
  AffExpr in MOI.EqualTo{Float64}         : [2, 2]
  AffExpr in MOI.GreaterThan{Float64}     : [2, 2]
  AffExpr in MOI.LessThan{Float64}        : [6, 6]
  VariableRef in MOI.EqualTo{Float64}     : [2, 2]
  VariableRef in MOI.GreaterThan{Float64} : [5, 6]
  VariableRef in MOI.LessThan{Float64}    : [6, 6]
  VariableRef in MOI.ZeroOne              : [5, 5]
numerical stability report
  matrix range     [1e+00, 1e+00]
  objective range  [1e+00, 6e+00]
  bounds range     [1e+00, 1e+01]
  rhs range        [1e+00, 1e+00]
-------------------------------------------------------------------
 iteration    simulation      bound        time (s)     solves  pid
-------------------------------------------------------------------
         5   8.000000e+00  9.440450e+00  9.003592e-01       235   1
        10   1.000000e+01  9.159200e+00  1.048283e+00       310   1
        15   1.000000e+01  9.159200e+00  1.205920e+00       385   1
        20   1.000000e+01  9.159200e+00  1.365151e+00       460   1
        25   1.000000e+01  9.159200e+00  2.143197e+00       695   1
        30   4.000000e+00  9.159200e+00  2.290872e+00       770   1
        35   1.000000e+01  9.159200e+00  2.462877e+00       845   1
        40   1.000000e+01  9.159200e+00  2.656079e+00       920   1
-------------------------------------------------------------------
status         : simulation_stopping
total time (s) : 2.656079e+00
total solves   : 920
best bound     :  9.159200e+00
simulation ci  :  7.200000e+00 ± 8.485598e-01
numeric issues : 0
-------------------------------------------------------------------

-------------------------------------------------------------------
         SDDP.jl (c) Oscar Dowson and contributors, 2017-25
-------------------------------------------------------------------
problem
  nodes           : 3
  state variables : 4
  scenarios       : 2.16000e+02
  existing cuts   : false
options
  solver          : serial mode
  risk measure    : SDDP.Expectation()
  sampling scheme : SDDP.InSampleMonteCarlo
subproblem structure
  VariableRef                             : [18, 18]
  AffExpr in MOI.EqualTo{Float64}         : [4, 4]
  AffExpr in MOI.GreaterThan{Float64}     : [4, 4]
  AffExpr in MOI.LessThan{Float64}        : [12, 12]
  VariableRef in MOI.EqualTo{Float64}     : [4, 4]
  VariableRef in MOI.GreaterThan{Float64} : [9, 10]
  VariableRef in MOI.LessThan{Float64}    : [10, 10]
  VariableRef in MOI.ZeroOne              : [9, 9]
numerical stability report
  matrix range     [1e+00, 1e+00]
  objective range  [1e+00, 4e+00]
  bounds range     [1e+00, 2e+01]
  rhs range        [1e+00, 1e+00]
-------------------------------------------------------------------
 iteration    simulation      bound        time (s)     solves  pid
-------------------------------------------------------------------
        10   5.000000e+00  6.959189e+00  5.055740e-01       510   1
        20   1.000000e+01  6.834387e+00  1.088511e+00       720   1
        30   7.000000e+00  6.834387e+00  2.399550e+00      1230   1
        40   1.000000e+01  6.823805e+00  2.928532e+00      1440   1
        50   3.000000e+00  6.823805e+00  4.138566e+00      1950   1
        60   2.000000e+00  6.823805e+00  4.659557e+00      2160   1
-------------------------------------------------------------------
status         : simulation_stopping
total time (s) : 4.659557e+00
total solves   : 2160
best bound     :  6.823805e+00
simulation ci  :  6.183333e+00 ± 6.694539e-01
numeric issues : 0
-------------------------------------------------------------------

[ Info: generation_expansion.jl
-------------------------------------------------------------------
         SDDP.jl (c) Oscar Dowson and contributors, 2017-25
-------------------------------------------------------------------
problem
  nodes           : 5
  state variables : 5
  scenarios       : 3.27680e+04
  existing cuts   : false
options
  solver          : serial mode
  risk measure    : SDDP.Expectation()
  sampling scheme : SDDP.InSampleMonteCarlo
subproblem structure
  VariableRef                             : [14, 14]
  AffExpr in MOI.GreaterThan{Float64}     : [7, 7]
  AffExpr in MOI.LessThan{Float64}        : [4, 4]
  VariableRef in MOI.EqualTo{Float64}     : [1, 1]
  VariableRef in MOI.GreaterThan{Float64} : [8, 8]
  VariableRef in MOI.Integer              : [5, 5]
  VariableRef in MOI.LessThan{Float64}    : [5, 6]
numerical stability report
  matrix range     [1e+00, 1e+00]
  objective range  [1e+00, 5e+05]
  bounds range     [1e+00, 1e+00]
  rhs range        [0e+00, 0e+00]
-------------------------------------------------------------------
 iteration    simulation      bound        time (s)     solves  pid
-------------------------------------------------------------------
        10   5.299676e+06  2.074407e+06  5.693962e+00       920   1
        20   6.049875e+06  2.075240e+06  7.396055e+00      1340   1
        30   5.496647e+05  2.078257e+06  1.349806e+01      2260   1
        40   3.985383e+04  2.078257e+06  1.530405e+01      2680   1
        50   2.994548e+05  2.078257e+06  2.122993e+01      3600   1
        60   3.799457e+06  2.078257e+06  2.300077e+01      4020   1
-------------------------------------------------------------------
status         : simulation_stopping
total time (s) : 2.300077e+01
total solves   : 4020
best bound     :  2.078257e+06
simulation ci  :  2.419054e+06 ± 5.154891e+05
numeric issues : 0
-------------------------------------------------------------------

-------------------------------------------------------------------
         SDDP.jl (c) Oscar Dowson and contributors, 2017-25
-------------------------------------------------------------------
problem
  nodes           : 5
  state variables : 5
  scenarios       : 3.27680e+04
  existing cuts   : false
options
  solver          : serial mode
  risk measure    : SDDP.Expectation()
  sampling scheme : SDDP.InSampleMonteCarlo
subproblem structure
  VariableRef                             : [14, 14]
  AffExpr in MOI.GreaterThan{Float64}     : [7, 7]
  AffExpr in MOI.LessThan{Float64}        : [4, 4]
  VariableRef in MOI.EqualTo{Float64}     : [1, 1]
  VariableRef in MOI.GreaterThan{Float64} : [8, 8]
  VariableRef in MOI.Integer              : [5, 5]
  VariableRef in MOI.LessThan{Float64}    : [5, 6]
numerical stability report
  matrix range     [1e+00, 1e+00]
  objective range  [1e+00, 5e+05]
  bounds range     [1e+00, 1e+00]
  rhs range        [0e+00, 0e+00]
-------------------------------------------------------------------
 iteration    simulation      bound        time (s)     solves  pid
-------------------------------------------------------------------
        10L  1.299572e+06  2.079330e+06  1.198464e+01       920   1
        20L  3.984407e+04  2.079401e+06  2.056048e+01      1340   1
        30L  5.495606e+05  2.079457e+06  3.294651e+01      2260   1
        40L  3.799861e+06  2.079457e+06  4.174185e+01      2680   1
-------------------------------------------------------------------
status         : simulation_stopping
total time (s) : 4.174185e+01
total solves   : 2680
best bound     :  2.079457e+06
simulation ci  :  1.720973e+06 ± 5.166660e+05
numeric issues : 0
-------------------------------------------------------------------

[ Info: hydro_valley.jl
[ Info: infinite_horizon_hydro_thermal.jl
-------------------------------------------------------------------
         SDDP.jl (c) Oscar Dowson and contributors, 2017-25
-------------------------------------------------------------------
problem
  nodes           : 1
  state variables : 1
  scenarios       : Inf
  existing cuts   : false
options
  solver          : serial mode
  risk measure    : SDDP.Expectation()
  sampling scheme : SDDP.InSampleMonteCarlo
subproblem structure
  VariableRef                             : [8, 8]
  AffExpr in MOI.EqualTo{Float64}         : [2, 2]
  VariableRef in MOI.EqualTo{Float64}     : [2, 2]
  VariableRef in MOI.GreaterThan{Float64} : [5, 5]
  VariableRef in MOI.LessThan{Float64}    : [1, 1]
numerical stability report
  matrix range     [1e+00, 1e+00]
  objective range  [1e+00, 1e+01]
  bounds range     [5e+00, 2e+01]
  rhs range        [0e+00, 0e+00]
-------------------------------------------------------------------
 iteration    simulation      bound        time (s)     solves  pid
-------------------------------------------------------------------
       100   1.000000e+01  1.188534e+02  2.335419e+00      1914   1
       200   0.000000e+00  1.191645e+02  2.771355e+00      3840   1
       300   7.500000e+01  1.191666e+02  3.247930e+00      5738   1
       328   2.500000e+00  1.191667e+02  3.353662e+00      6034   1
-------------------------------------------------------------------
status         : simulation_stopping
total time (s) : 3.353662e+00
total solves   : 6034
best bound     :  1.191667e+02
simulation ci  :  2.272866e+01 ± 3.596240e+00
numeric issues : 0
-------------------------------------------------------------------

Confidence_interval = 128.14 ± 13.91
-------------------------------------------------------------------
         SDDP.jl (c) Oscar Dowson and contributors, 2017-25
-------------------------------------------------------------------
problem
  nodes           : 1
  state variables : 1
  scenarios       : Inf
  existing cuts   : false
options
  solver          : serial mode
  risk measure    : SDDP.Expectation()
  sampling scheme : SDDP.InSampleMonteCarlo
subproblem structure
  VariableRef                             : [8, 8]
  AffExpr in MOI.EqualTo{Float64}         : [2, 2]
  VariableRef in MOI.EqualTo{Float64}     : [2, 2]
  VariableRef in MOI.GreaterThan{Float64} : [5, 5]
  VariableRef in MOI.LessThan{Float64}    : [1, 1]
numerical stability report
  matrix range     [1e+00, 1e+00]
  objective range  [1e+00, 1e+01]
  bounds range     [5e+00, 2e+01]
  rhs range        [0e+00, 0e+00]
-------------------------------------------------------------------
 iteration    simulation      bound        time (s)     solves  pid
-------------------------------------------------------------------
       100   1.000000e+01  1.191232e+02  5.255821e-01      2806   1
       200   0.000000e+00  1.191666e+02  1.010491e+00      4749   1
       287   5.000000e+00  1.191667e+02  1.405475e+00      5662   1
-------------------------------------------------------------------
status         : simulation_stopping
total time (s) : 1.405475e+00
total solves   : 5662
best bound     :  1.191667e+02
simulation ci  :  2.112369e+01 ± 3.684376e+00
numeric issues : 0
-------------------------------------------------------------------

Confidence_interval = 122.02 ± 14.06
[ Info: infinite_horizon_trivial.jl
-------------------------------------------------------------------
         SDDP.jl (c) Oscar Dowson and contributors, 2017-25
-------------------------------------------------------------------
problem
  nodes           : 1
  state variables : 1
  scenarios       : Inf
  existing cuts   : false
options
  solver          : serial mode
  risk measure    : SDDP.Expectation()
  sampling scheme : SDDP.InSampleMonteCarlo
subproblem structure
  VariableRef                             : [3, 3]
  AffExpr in MOI.EqualTo{Float64}         : [1, 1]
  VariableRef in MOI.GreaterThan{Float64} : [1, 1]
numerical stability report
  matrix range     [1e+00, 1e+00]
  objective range  [1e+00, 1e+00]
  bounds range     [0e+00, 0e+00]
  rhs range        [0e+00, 0e+00]
-------------------------------------------------------------------
 iteration    simulation      bound        time (s)     solves  pid
-------------------------------------------------------------------
        10   2.000000e+01  1.998872e+01  9.971499e-02      1033   1
        20   8.000000e+00  2.000000e+01  1.192720e-01      1209   1
        30   1.200000e+01  2.000000e+01  2.186718e-01      2304   1
        40   3.000000e+01  2.000000e+01  4.115169e-01      2594   1
-------------------------------------------------------------------
status         : simulation_stopping
total time (s) : 4.115169e-01
total solves   : 2594
best bound     :  2.000000e+01
simulation ci  :  1.970000e+01 ± 4.721453e+00
numeric issues : 0
-------------------------------------------------------------------

[ Info: no_strong_duality.jl
-------------------------------------------------------------------
         SDDP.jl (c) Oscar Dowson and contributors, 2017-25
-------------------------------------------------------------------
problem
  nodes           : 1
  state variables : 1
  scenarios       : Inf
  existing cuts   : false
options
  solver          : serial mode
  risk measure    : SDDP.Expectation()
  sampling scheme : SDDP.InSampleMonteCarlo
subproblem structure
  VariableRef                             : [3, 3]
  AffExpr in MOI.EqualTo{Float64}         : [1, 1]
  VariableRef in MOI.GreaterThan{Float64} : [1, 1]
numerical stability report
  matrix range     [1e+00, 1e+00]
  objective range  [1e+00, 1e+00]
  bounds range     [0e+00, 0e+00]
  rhs range        [0e+00, 0e+00]
-------------------------------------------------------------------
 iteration    simulation      bound        time (s)     solves  pid
-------------------------------------------------------------------
         1   1.000000e+00  1.500000e+00  5.249023e-03         3   1
        40   2.000000e+00  2.000000e+00  7.807183e-02       604   1
-------------------------------------------------------------------
status         : simulation_stopping
total time (s) : 7.807183e-02
total solves   : 604
best bound     :  2.000000e+00
simulation ci  :  2.150000e+00 ± 5.038753e-01
numeric issues : 0
-------------------------------------------------------------------

[ Info: objective_state_newsvendor.jl
-------------------------------------------------------------------
         SDDP.jl (c) Oscar Dowson and contributors, 2017-25
-------------------------------------------------------------------
problem
  nodes           : 3
  state variables : 1
  scenarios       : 8.51840e+04
  existing cuts   : false
options
  solver          : serial mode
  risk measure    : SDDP.Expectation()
  sampling scheme : SDDP.InSampleMonteCarlo
subproblem structure
  VariableRef                             : [6, 6]
  AffExpr in MOI.EqualTo{Float64}         : [1, 3]
  AffExpr in MOI.LessThan{Float64}        : [2, 2]
  VariableRef in MOI.EqualTo{Float64}     : [1, 1]
  VariableRef in MOI.GreaterThan{Float64} : [3, 4]
  VariableRef in MOI.LessThan{Float64}    : [3, 3]
numerical stability report
  matrix range     [8e-01, 2e+00]
  objective range  [1e+00, 2e+00]
  bounds range     [1e+00, 1e+02]
  rhs range        [5e+01, 5e+01]
-------------------------------------------------------------------
 iteration    simulation      bound        time (s)     solves  pid
-------------------------------------------------------------------
        10   3.675000e+00  4.115510e+00  8.772628e-01      1350   1
        20   5.062500e+00  4.110713e+00  1.042746e+00      2700   1
        30   4.500000e+00  4.104200e+00  1.224455e+00      4050   1
        40   3.812500e+00  4.102669e+00  1.409507e+00      5400   1
        50   4.725000e+00  4.095504e+00  1.627268e+00      6750   1
        60   4.050000e+00  4.092999e+00  1.837756e+00      8100   1
        70   4.606250e+00  4.091524e+00  2.042330e+00      9450   1
        80   3.875000e+00  4.089694e+00  2.254937e+00     10800   1
        90   3.750000e+00  4.089490e+00  2.478230e+00     12150   1
       100   5.125000e+00  4.087894e+00  2.697260e+00     13500   1
       110   4.500000e+00  4.087478e+00  2.932510e+00     14850   1
       120   3.650000e+00  4.086704e+00  3.174736e+00     16200   1
       130   4.406250e+00  4.086063e+00  3.431680e+00     17550   1
       140   3.375000e+00  4.085981e+00  3.660688e+00     18900   1
       150   3.000000e+00  4.085945e+00  3.895664e+00     20250   1
       160   3.812500e+00  4.085838e+00  4.154763e+00     21600   1
       170   4.250000e+00  4.085728e+00  4.403169e+00     22950   1
       180   3.243750e+00  4.085593e+00  4.667911e+00     24300   1
       190   4.306250e+00  4.085487e+00  4.936034e+00     25650   1
       200   5.237500e+00  4.085446e+00  5.224747e+00     27000   1
       210   4.500000e+00  4.085441e+00  5.611271e+00     28350   1
       220   3.612500e+00  4.085405e+00  5.882624e+00     29700   1
       230   3.700000e+00  4.085382e+00  6.160823e+00     31050   1
       240   3.437500e+00  4.085254e+00  6.426045e+00     32400   1
       250   4.100000e+00  4.085115e+00  6.693658e+00     33750   1
       260   3.000000e+00  4.084973e+00  6.981878e+00     35100   1
       270   4.918750e+00  4.084943e+00  7.263076e+00     36450   1
       280   2.756250e+00  4.084920e+00  7.564500e+00     37800   1
       290   3.737500e+00  4.084868e+00  7.861226e+00     39150   1
       300   5.750000e+00  4.084868e+00  8.164964e+00     40500   1
       310   5.156250e+00  4.084858e+00  8.472196e+00     41850   1
       320   3.131250e+00  4.084855e+00  8.764311e+00     43200   1
       330   4.125000e+00  4.084846e+00  9.054952e+00     44550   1
       340   5.875000e+00  4.084820e+00  9.336559e+00     45900   1
       350   4.587500e+00  4.084810e+00  9.584454e+00     47250   1
       360   5.087500e+00  4.084805e+00  9.900626e+00     48600   1
       370   4.393750e+00  4.084802e+00  1.021187e+01     49950   1
       380   4.750000e+00  4.084792e+00  1.051980e+01     51300   1
       390   4.437500e+00  4.084785e+00  1.082961e+01     52650   1
       400   4.181250e+00  4.084785e+00  1.113617e+01     54000   1
       410   3.650000e+00  4.084777e+00  1.145380e+01     55350   1
       420   3.750000e+00  4.084769e+00  1.176038e+01     56700   1
       430   3.725000e+00  4.084762e+00  1.202732e+01     58050   1
       440   4.218750e+00  4.084751e+00  1.234482e+01     59400   1
       450   5.500000e+00  4.084751e+00  1.266715e+01     60750   1
       460   3.637500e+00  4.084747e+00  1.297017e+01     62100   1
       470   2.993750e+00  4.084743e+00  1.328945e+01     63450   1
       480   5.237500e+00  4.084743e+00  1.363549e+01     64800   1
       490   4.212500e+00  4.084743e+00  1.403861e+01     66150   1
       500   3.843750e+00  4.084743e+00  1.436213e+01     67500   1
       510   3.425000e+00  4.084743e+00  1.467369e+01     68850   1
       520   4.293750e+00  4.084743e+00  1.497692e+01     70200   1
       530   2.818750e+00  4.084740e+00  1.530517e+01     71550   1
       540   4.668750e+00  4.084740e+00  1.563020e+01     72900   1
       550   2.750000e+00  4.084740e+00  1.595234e+01     74250   1
       560   4.100000e+00  4.084740e+00  1.629634e+01     75600   1
       570   3.200000e+00  4.084738e+00  1.663254e+01     76950   1
       580   3.525000e+00  4.084738e+00  1.696612e+01     78300   1
       590   3.125000e+00  4.084738e+00  1.728238e+01     79650   1
       600   4.875000e+00  4.084736e+00  1.762353e+01     81000   1
       610   4.050000e+00  4.084736e+00  1.794035e+01     82350   1
       620   4.750000e+00  4.084733e+00  1.828262e+01     83700   1
       630   3.687500e+00  4.084733e+00  1.862318e+01     85050   1
       640   3.875000e+00  4.084733e+00  1.897763e+01     86400   1
       650   3.625000e+00  4.084733e+00  1.930751e+01     87750   1
       660   3.500000e+00  4.084732e+00  1.966141e+01     89100   1
       670   4.875000e+00  4.084732e+00  2.002301e+01     90450   1
-------------------------------------------------------------------
status         : time_limit
total time (s) : 2.002301e+01
total solves   : 90450
best bound     :  4.084732e+00
simulation ci  :  4.073507e+00 ± 5.824300e-02
numeric issues : 0
-------------------------------------------------------------------

-------------------------------------------------------------------
         SDDP.jl (c) Oscar Dowson and contributors, 2017-25
-------------------------------------------------------------------
problem
  nodes           : 3
  state variables : 1
  scenarios       : 8.51840e+04
  existing cuts   : false
options
  solver          : serial mode
  risk measure    : SDDP.Expectation()
  sampling scheme : SDDP.InSampleMonteCarlo
subproblem structure
  VariableRef                             : [6, 6]
  AffExpr in MOI.EqualTo{Float64}         : [1, 3]
  AffExpr in MOI.LessThan{Float64}        : [2, 2]
  VariableRef in MOI.EqualTo{Float64}     : [1, 1]
  VariableRef in MOI.GreaterThan{Float64} : [3, 4]
  VariableRef in MOI.LessThan{Float64}    : [3, 3]
numerical stability report
  matrix range     [8e-01, 2e+00]
  objective range  [1e+00, 2e+00]
  bounds range     [1e+00, 1e+02]
  rhs range        [5e+01, 5e+01]
-------------------------------------------------------------------
 iteration    simulation      bound        time (s)     solves  pid
-------------------------------------------------------------------
        10   3.375000e+00  6.701160e+00  4.548271e-01      1350   1
        20   4.875000e+00  5.028037e+00  1.266361e+00      2700   1
        30   3.562500e+00  4.045335e+00  2.149800e+00      4050   1
        40   4.125000e+00  4.042596e+00  3.361415e+00      5400   1
        50   4.875000e+00  4.042158e+00  4.997257e+00      6750   1
        60   4.218750e+00  4.040719e+00  6.550523e+00      8100   1
        70   3.500000e+00  4.038322e+00  9.942879e+00      9450   1
        80   3.875000e+00  4.037974e+00  1.215213e+01     10800   1
        90   4.131250e+00  4.037908e+00  1.463207e+01     12150   1
       100   3.750000e+00  4.037861e+00  1.743863e+01     13500   1
       109   5.250000e+00  4.037824e+00  2.012572e+01     14715   1
-------------------------------------------------------------------
status         : time_limit
total time (s) : 2.012572e+01
total solves   : 14715
best bound     :  4.037824e+00
simulation ci  :  4.109294e+00 ± 1.475340e-01
numeric issues : 0
-------------------------------------------------------------------

[ Info: sldp_example_one.jl
-------------------------------------------------------------------
         SDDP.jl (c) Oscar Dowson and contributors, 2017-25
-------------------------------------------------------------------
problem
  nodes           : 8
  state variables : 1
  scenarios       : 1.00000e+08
  existing cuts   : false
options
  solver          : serial mode
  risk measure    : SDDP.Expectation()
  sampling scheme : SDDP.InSampleMonteCarlo
subproblem structure
  VariableRef                             : [7, 7]
  AffExpr in MOI.EqualTo{Float64}         : [1, 1]
  AffExpr in MOI.GreaterThan{Float64}     : [2, 2]
  VariableRef in MOI.EqualTo{Float64}     : [1, 1]
  VariableRef in MOI.GreaterThan{Float64} : [4, 4]
  VariableRef in MOI.LessThan{Float64}    : [1, 2]
  VariableRef in MOI.ZeroOne              : [1, 1]
numerical stability report
  matrix range     [1e+00, 2e+00]
  objective range  [5e-01, 1e+00]
  bounds range     [1e+00, 1e+00]
  rhs range        [1e+00, 1e+00]
-------------------------------------------------------------------
 iteration    simulation      bound        time (s)     solves  pid
-------------------------------------------------------------------
        10   3.219176e+00  1.165102e+00  4.894637e+00      1680   1
        20   2.078810e+00  1.166281e+00  5.437591e+00      2560   1
        30   3.973033e+00  1.166907e+00  6.004870e+00      3440   1
        40   3.706337e+00  1.167312e+00  1.093543e+01      5120   1
        50   3.158565e+00  1.167416e+00  1.154567e+01      6000   1
        60   3.642642e+00  1.167416e+00  1.650471e+01      7680   1
        70   3.451253e+00  1.167416e+00  1.713366e+01      8560   1
        71   2.984727e+00  1.167416e+00  1.718768e+01      8648   1
-------------------------------------------------------------------
status         : simulation_stopping
total time (s) : 1.718768e+01
total solves   : 8648
best bound     :  1.167416e+00
simulation ci  :  3.293853e+00 ± 1.130135e-01
numeric issues : 0
-------------------------------------------------------------------

[ Info: sldp_example_two.jl
-------------------------------------------------------------------
         SDDP.jl (c) Oscar Dowson and contributors, 2017-25
-------------------------------------------------------------------
problem
  nodes           : 2
  state variables : 2
  scenarios       : 4.00000e+00
  existing cuts   : false
options
  solver          : serial mode
  risk measure    : SDDP.Expectation()
  sampling scheme : SDDP.InSampleMonteCarlo
subproblem structure
  VariableRef                             : [7, 11]
  AffExpr in MOI.EqualTo{Float64}         : [2, 2]
  AffExpr in MOI.LessThan{Float64}        : [2, 2]
  VariableRef in MOI.EqualTo{Float64}     : [2, 2]
  VariableRef in MOI.GreaterThan{Float64} : [5, 7]
  VariableRef in MOI.Integer              : [2, 2]
  VariableRef in MOI.LessThan{Float64}    : [4, 7]
  VariableRef in MOI.ZeroOne              : [4, 4]
numerical stability report
  matrix range     [1e+00, 6e+00]
  objective range  [1e+00, 3e+01]
  bounds range     [1e+00, 1e+02]
  rhs range        [0e+00, 0e+00]
-------------------------------------------------------------------
 iteration    simulation      bound        time (s)     solves  pid
-------------------------------------------------------------------
        10  -4.000000e+01 -5.809615e+01  3.253088e-01        78   1
        20  -4.000000e+01 -5.809615e+01  6.763370e-01       148   1
        30  -4.000000e+01 -5.809615e+01  1.098463e+00       226   1
        40  -4.700000e+01 -5.809615e+01  1.457393e+00       296   1
-------------------------------------------------------------------
status         : simulation_stopping
total time (s) : 1.457393e+00
total solves   : 296
best bound     : -5.809615e+01
simulation ci  : -5.346250e+01 ± 7.152725e+00
numeric issues : 0
-------------------------------------------------------------------

-------------------------------------------------------------------
         SDDP.jl (c) Oscar Dowson and contributors, 2017-25
-------------------------------------------------------------------
problem
  nodes           : 2
  state variables : 2
  scenarios       : 9.00000e+00
  existing cuts   : false
options
  solver          : serial mode
  risk measure    : SDDP.Expectation()
  sampling scheme : SDDP.InSampleMonteCarlo
subproblem structure
  VariableRef                             : [7, 11]
  AffExpr in MOI.EqualTo{Float64}         : [2, 2]
  AffExpr in MOI.LessThan{Float64}        : [2, 2]
  VariableRef in MOI.EqualTo{Float64}     : [2, 2]
  VariableRef in MOI.GreaterThan{Float64} : [5, 7]
  VariableRef in MOI.Integer              : [2, 2]
  VariableRef in MOI.LessThan{Float64}    : [4, 7]
  VariableRef in MOI.ZeroOne              : [4, 4]
numerical stability report
  matrix range     [1e+00, 6e+00]
  objective range  [1e+00, 3e+01]
  bounds range     [1e+00, 1e+02]
  rhs range        [0e+00, 0e+00]
-------------------------------------------------------------------
 iteration    simulation      bound        time (s)     solves  pid
-------------------------------------------------------------------
        10  -6.300000e+01 -6.196125e+01  3.712640e-01       138   1
        20  -4.000000e+01 -6.196125e+01  7.522340e-01       258   1
        30  -7.500000e+01 -6.196125e+01  1.308338e+00       396   1
        40  -4.000000e+01 -6.196125e+01  1.681293e+00       516   1
-------------------------------------------------------------------
status         : simulation_stopping
total time (s) : 1.681293e+00
total solves   : 516
best bound     : -6.196125e+01
simulation ci  : -6.108750e+01 ± 7.148463e+00
numeric issues : 0
-------------------------------------------------------------------

-------------------------------------------------------------------
         SDDP.jl (c) Oscar Dowson and contributors, 2017-25
-------------------------------------------------------------------
problem
  nodes           : 2
  state variables : 2
  scenarios       : 3.60000e+01
  existing cuts   : false
options
  solver          : serial mode
  risk measure    : SDDP.Expectation()
  sampling scheme : SDDP.InSampleMonteCarlo
subproblem structure
  VariableRef                             : [7, 11]
  AffExpr in MOI.EqualTo{Float64}         : [2, 2]
  AffExpr in MOI.LessThan{Float64}        : [2, 2]
  VariableRef in MOI.EqualTo{Float64}     : [2, 2]
  VariableRef in MOI.GreaterThan{Float64} : [5, 7]
  VariableRef in MOI.Integer              : [2, 2]
  VariableRef in MOI.LessThan{Float64}    : [4, 7]
  VariableRef in MOI.ZeroOne              : [4, 4]
numerical stability report
  matrix range     [1e+00, 6e+00]
  objective range  [1e+00, 3e+01]
  bounds range     [1e+00, 1e+02]
  rhs range        [0e+00, 0e+00]
-------------------------------------------------------------------
 iteration    simulation      bound        time (s)     solves  pid
-------------------------------------------------------------------
        10  -7.000000e+01 -6.546793e+01  5.705550e-01       462   1
        20  -5.600000e+01 -6.546793e+01  9.817090e-01       852   1
        30  -4.000000e+01 -6.546793e+01  2.137590e+00      1314   1
        40  -4.000000e+01 -6.546793e+01  2.546650e+00      1704   1
-------------------------------------------------------------------
status         : simulation_stopping
total time (s) : 2.546650e+00
total solves   : 1704
best bound     : -6.546793e+01
simulation ci  : -5.991250e+01 ± 5.174250e+00
numeric issues : 0
-------------------------------------------------------------------

[ Info: stochastic_all_blacks.jl
-------------------------------------------------------------------
         SDDP.jl (c) Oscar Dowson and contributors, 2017-25
-------------------------------------------------------------------
problem
  nodes           : 3
  state variables : 2
  scenarios       : 2.70000e+01
  existing cuts   : false
options
  solver          : serial mode
  risk measure    : SDDP.Expectation()
  sampling scheme : SDDP.InSampleMonteCarlo
subproblem structure
  VariableRef                             : [9, 9]
  AffExpr in MOI.EqualTo{Float64}         : [2, 2]
  AffExpr in MOI.LessThan{Float64}        : [2, 2]
  VariableRef in MOI.EqualTo{Float64}     : [2, 2]
  VariableRef in MOI.GreaterThan{Float64} : [2, 3]
  VariableRef in MOI.LessThan{Float64}    : [3, 3]
  VariableRef in MOI.ZeroOne              : [4, 4]
numerical stability report
  matrix range     [1e+00, 1e+00]
  objective range  [1e+00, 6e+00]
  bounds range     [1e+00, 1e+02]
  rhs range        [0e+00, 0e+00]
-------------------------------------------------------------------
 iteration    simulation      bound        time (s)     solves  pid
-------------------------------------------------------------------
         1L  6.000000e+00  1.200000e+01  7.496750e-01        11   1
        15L  6.000000e+00  8.000000e+00  1.792715e+00       246   1
        26L  6.000000e+00  8.000000e+00  2.823729e+00       448   1
        39L  6.000000e+00  8.000000e+00  3.872713e+00       591   1
        40L  6.000000e+00  8.000000e+00  3.943733e+00       602   1
-------------------------------------------------------------------
status         : simulation_stopping
total time (s) : 3.943733e+00
total solves   : 602
best bound     :  8.000000e+00
simulation ci  :  8.475000e+00 ± 8.904404e-01
numeric issues : 0
-------------------------------------------------------------------

[ Info: the_farmers_problem.jl
-------------------------------------------------------------------
         SDDP.jl (c) Oscar Dowson and contributors, 2017-25
-------------------------------------------------------------------
problem
  nodes           : 2
  state variables : 3
  scenarios       : 3.00000e+00
  existing cuts   : false
options
  solver          : serial mode
  risk measure    : SDDP.Expectation()
  sampling scheme : SDDP.InSampleMonteCarlo
subproblem structure
  VariableRef                             : [7, 19]
  AffExpr in MOI.EqualTo{Float64}         : [3, 3]
  AffExpr in MOI.GreaterThan{Float64}     : [3, 3]
  AffExpr in MOI.LessThan{Float64}        : [1, 1]
  VariableRef in MOI.GreaterThan{Float64} : [3, 16]
  VariableRef in MOI.LessThan{Float64}    : [1, 2]
numerical stability report
  matrix range     [1e+00, 2e+01]
  objective range  [1e+00, 1e+03]
  bounds range     [6e+03, 5e+05]
  rhs range        [2e+02, 5e+02]
-------------------------------------------------------------------
 iteration    simulation      bound        time (s)     solves  pid
-------------------------------------------------------------------
         1  -9.800000e+04  4.922260e+05  7.827859e-01         6   1
        40   1.093500e+05  1.083900e+05  8.377690e-01       240   1
-------------------------------------------------------------------
status         : iteration_limit
total time (s) : 8.377690e-01
total solves   : 240
best bound     :  1.083900e+05
simulation ci  :  9.772505e+04 ± 1.969816e+04
numeric issues : 0
-------------------------------------------------------------------

[ Info: vehicle_location.jl
Test Summary:                              | Pass  Fail  Total      Time
SDDP.jl                                    | 2397     2   2399  28m27.4s
  Experimental.jl                          |   35           35   4m46.5s
  MSPFormat.jl                             |   51           51     19.5s
  algorithm.jl                             |   40           40   1m26.2s
  binary_expansion.jl                      |   38           38      3.6s
  deterministic_equivalent.jl              |   21           21     44.9s
  modeling_aids.jl                         |   47           47     19.1s
  user_interface.jl                        |  123          123   1m05.8s
  backward_sampling_schemes.jl             | 1203         1203      6.2s
  bellman_functions.jl                     |   45           45   1m04.0s
  duality_handlers.jl                      |  334          334   1m26.0s
  forward_passes.jl                        |   34           34     15.6s
  local_improvement_search.jl              |   12           12     18.1s
  parallel_schemes.jl                      |   19           19   8m23.9s
  risk_measures.jl                         |   91           91     14.0s
  sampling_schemes.jl                      |  158          158     30.1s
  stopping_rules.jl                        |   40           40     16.7s
  threaded.jl                              |                 0      0.3s
  value_functions.jl                       |   28           28     24.4s
  visualization.jl                         |    9     2     11   1m03.8s
    test_PublicationPlot                   |    5            5     20.1s
    test_PublicationPlot_different_lengths |    1            1      0.7s
    test_SpaghettiPlot                     |    3     2      5      9.7s
  FAST_hydro_thermal.jl                    |    3            3     15.8s
  FAST_production_management.jl            |    2            2      4.4s
  FAST_quickstart.jl                       |    2            2      1.6s
  Hydro_thermal.jl                         |                 0     21.8s
  StochDynamicProgramming.jl_multistock.jl |    3            3     13.8s
  StochDynamicProgramming.jl_stock.jl      |    3            3      5.2s
  StructDualDynProg.jl_prob5.2_2stages.jl  |    1            1      4.5s
  StructDualDynProg.jl_prob5.2_3stages.jl  |    2            2      2.7s
  agriculture_mccardle_farm.jl             |    2            2     13.0s
  air_conditioning.jl                      |    6            6      5.2s
  air_conditioning_forward.jl              |    2            2      2.1s
  all_blacks.jl                            |    1            1      2.2s
  asset_management_simple.jl               |    1            1      5.0s
  asset_management_stagewise.jl            |    2            2      4.5s
  belief.jl                                |    1            1     20.2s
  biobjective_hydro.jl                     |   10           10      7.6s
  booking_management.jl                    |    2            2     12.0s
  generation_expansion.jl                  |    2            2   1m15.9s
  hydro_valley.jl                          |    9            9     11.2s
  infinite_horizon_hydro_thermal.jl        |    4            4      8.3s
  infinite_horizon_trivial.jl              |    1            1      1.6s
  no_strong_duality.jl                     |    1            1      1.4s
  objective_state_newsvendor.jl            |    4            4     50.8s
  sldp_example_one.jl                      |    1            1     23.3s
  sldp_example_two.jl                      |    3            3      9.5s
  stochastic_all_blacks.jl                 |    1            1      7.9s
  the_farmers_problem.jl                   |                 0      5.9s
  vehicle_location.jl                      |                 0      0.1s
RNG of the outermost testset: Xoshiro(0xbae6c402e19c5b0b, 0xbb6dd0cb83b93fbb, 0xec68eb09c8ee8748, 0x77ec36336378f4fa, 0xd2b248fe11bf717a)
ERROR: LoadError: Some tests did not pass: 2397 passed, 2 failed, 0 errored, 0 broken.
in expression starting at /home/pkgeval/.julia/packages/SDDP/EWTpZ/test/runtests.jl:24

Testing failed after 1717.54s

ERROR: LoadError: Package SDDP errored during testing
Stacktrace:
  [1] pkgerror(msg::String)
    @ Pkg.Types /opt/julia/share/julia/stdlib/v1.13/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/v1.13/Pkg/src/Operations.jl:2421
  [3] test
    @ /opt/julia/share/julia/stdlib/v1.13/Pkg/src/Operations.jl:2276 [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/v1.13/Pkg/src/API.jl:498
  [5] test(pkgs::Vector{PackageSpec}; io::IOContext{IO}, kwargs::@Kwargs{julia_args::Cmd})
    @ Pkg.API /opt/julia/share/julia/stdlib/v1.13/Pkg/src/API.jl:164
  [6] test(pkgs::Vector{String}; kwargs::@Kwargs{julia_args::Cmd})
    @ Pkg.API /opt/julia/share/julia/stdlib/v1.13/Pkg/src/API.jl:152
  [7] test
    @ /opt/julia/share/julia/stdlib/v1.13/Pkg/src/API.jl:152 [inlined]
  [8] #test#81
    @ /opt/julia/share/julia/stdlib/v1.13/Pkg/src/API.jl:151 [inlined]
  [9] top-level scope
    @ /PkgEval.jl/scripts/evaluate.jl:219
 [10] include(mod::Module, _path::String)
    @ Base ./Base.jl:309
 [11] exec_options(opts::Base.JLOptions)
    @ Base ./client.jl:331
 [12] _start()
    @ Base ./client.jl:564
in expression starting at /PkgEval.jl/scripts/evaluate.jl:210

PkgEval failed after 2675.01s: package has test failures