Resource Times:

Date / Time: 09/29/08 16:20:38


See the solver return definitions for optimal/feasible model and solve statuses. Solutions are not checked for how close they are to eachother. Resource times are considered the same, if they are within 10% of eachother. A solver is considered faster than another, if it is less than 50% faster than the other. A solver is considered much faster than another, if it is more than 50% faster than the other.

If a model was not solved optimal/feasible by both solvers, the resource time is considered the same. If a model was solved optimal/feasible by solver A but not by solver B, then solver A is considered infinitely faster than solver B. Similarly, if one solver has trace data and the other has no data, then the first solver is consideredinfinitely faster.

A solver is considered to have a better objective function value, if the relative objective value difference is greater than 1.00E-05 For objective values below 1e-1 we use absolute differences.

Tracefile 1 :ALPHAECP-1.trc.convex
Tracefile 2 :SBB-1.trc.convex
Solvers used : ALPHAECP
SBB
Modeltype(s)   MINLP
Threshold: Solver Faster 10%
Threshold: Solver Much Faster 50%
Threshold: Solver Infinitely Faster Other solver failed


Total Obj ALPHAECP better Obj same Obj SBB better
Solver ALPHAECP infinitely faster : 1 1 - -
Solver ALPHAECP much faster : 11 4 7 -
Solver ALPHAECP faster : 16 2 14 -
Solvers perform the same : 3 - 3 -
Solver SBB faster : 2 - 1 1
Solver SBB much faster : 3 1 1 1
Solver SBB infinitely faster :- - - -
Both solvers failed to solve optimally : 2 - 2 -
Total models: : 388282



Solver return definition:

OutcomeModel StatusSolver Status
globally optimal 1 or 15 1
locally optimal/feasible 2 or 8 or 16 1 or 2 or 3 or 4 or 5



Resource Times:

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Solver ALPHAECP infinitely faster - Obj of ALPHAECP better:

Modelname Time (ALPHAECP) Time (SBB) Ratio (ALPHAECP / SBB) Obj (ALPHAECP) Obj (SBB)
tls63600.9000fail -- 3.81000000E+01 0.00000000E+00

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Solver ALPHAECP much faster - Obj of ALPHAECP better:

Modelname Time (ALPHAECP) Time (SBB) Ratio (ALPHAECP / SBB) Obj (ALPHAECP) Obj (SBB)
fo7356.45006719.63000.053 2.07298251E+01 3.00364183E+01
m711.64005959.90000.002 1.06756877E+02 1.23964378E+02
st_testgr10.08000.32600.245 -1.28116000E+01 -1.27281000E+01
st_testgr30.06000.31600.190 -2.05900000E+01 -2.04688000E+01

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Solver ALPHAECP much faster - Obj same for both solvers:

Modelname Time (ALPHAECP) Time (SBB) Ratio (ALPHAECP / SBB) Obj (ALPHAECP) Obj (SBB)
alan0.07000.20800.337 2.92500000E+00 2.92500000E+00
ex1223a0.08000.16300.491 4.57958240E+00 4.57958240E+00
fac10.10000.23000.435 1.60912612E+08 1.60912612E+08
m30.25001.11200.225 3.78000000E+01 3.78000000E+01
m63.58002884.97700.001 8.22568769E+01 8.22568769E+01
st_test50.05000.37900.132 -1.10000000E+02 -1.10000000E+02
synthes10.07000.16700.419 6.00975891E+00 6.00975891E+00

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Solver ALPHAECP faster - Obj of ALPHAECP better:

Modelname Time (ALPHAECP) Time (SBB) Ratio (ALPHAECP / SBB) Obj (ALPHAECP) Obj (SBB)
meanvarx0.12000.21200.566 1.43692321E+01 1.44969830E+01
o73456.29006631.94000.521 1.31653138E+02 1.81464728E+02

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Solver ALPHAECP faster - Obj same for both solvers:

Modelname Time (ALPHAECP) Time (SBB) Ratio (ALPHAECP / SBB) Obj (ALPHAECP) Obj (SBB)
du-opt512.872021.31600.604 8.07365758E+00 8.07365758E+00
ex12230.16000.21500.744 4.57958240E+00 4.57958240E+00
ex1223b0.13000.21500.605 4.57958240E+00 4.57958240E+00
gbd0.01000.1450--- 2.20000000E+00 2.20000000E+00
nvs030.01000.2040--- 1.60000000E+01 1.60000000E+01
nvs100.04000.1480--- -3.10800000E+02 -3.10800000E+02
st_e140.11000.21400.514 4.57958240E+00 4.57958240E+00
st_miqp10.00000.2000--- 2.81000000E+02 2.81000000E+02
st_miqp20.04000.2720--- 2.00000000E+00 2.00000000E+00
st_miqp30.01000.1130--- -6.00000000E+00 -6.00000000E+00
st_miqp40.00000.1340--- -4.57400000E+03 -4.57400000E+03
st_test60.02000.4920--- 4.71000000E+02 4.71000000E+02
st_test80.01000.1410--- -2.96050000E+04 -2.96050000E+04
st_testph40.01000.3650--- -8.05000000E+01 -8.05000000E+01

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Solvers perform the same - Obj same for both solvers:

Modelname Time (ALPHAECP) Time (SBB) Ratio (ALPHAECP / SBB) Obj (ALPHAECP) Obj (SBB)
fac30.57000.55701.023 3.19823098E+07 3.19823098E+07
st_miqp50.04000.1210--- -3.33888889E+02 -3.33888889E+02
synthes20.27000.26501.019 7.30353125E+01 7.30353125E+01

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Solver SBB faster - Obj same for both solvers:

Modelname Time (ALPHAECP) Time (SBB) Ratio (ALPHAECP / SBB) Obj (ALPHAECP) Obj (SBB)
synthes30.85000.43201.968 6.80097405E+01 6.80097405E+01

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Solver SBB faster - Obj of SBB better:

Modelname Time (ALPHAECP) Time (SBB) Ratio (ALPHAECP / SBB) Obj (ALPHAECP) Obj (SBB)
du-opt3.09001.72301.793 3.55923932E+00 3.55699635E+00

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Solver SBB much faster - Obj of ALPHAECP better:

Modelname Time (ALPHAECP) Time (SBB) Ratio (ALPHAECP / SBB) Obj (ALPHAECP) Obj (SBB)
risk2bpb1.10000.52402.099 -5.58761394E+01 -5.57361685E+01

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Solver SBB much faster - Obj same for both solvers:

Modelname Time (ALPHAECP) Time (SBB) Ratio (ALPHAECP / SBB) Obj (ALPHAECP) Obj (SBB)
batch4.10000.48708.419 2.85506508E+05 2.85506508E+05

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Solver SBB much faster - Obj of SBB better:

Modelname Time (ALPHAECP) Time (SBB) Ratio (ALPHAECP / SBB) Obj (ALPHAECP) Obj (SBB)
stockcycle3600.2400591.14006.090 1.23665843E+05 1.19948688E+05

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Both solvers failed to solve optimally - Obj same for both solvers:

Modelname Time (ALPHAECP) Time (SBB) Ratio (ALPHAECP / SBB) Obj (ALPHAECP) Obj (SBB)
tls12fail fail -- NA 0.00000000E+00
tls7fail fail -- NA NA

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