chromaticindex1024-7

benchmark binary benchmark_suitable set_partitioning set_packing

Submitter Variables Constraints Density Status Group Objective MPS File
Pierre Le Bodic 73728 67583 5.42519e-05 easy chromaticindex 4 chromaticindex1024-7.mps.gz

Simple edge-coloring model on chains of Petersen-like subgraphs, designed to fool MIP solvers into producing very large Branch-and-Bound trees.

Instance Statistics

Detailed explanation of the following tables can be found here.

Size Related Properties
Original Presolved
Variables 73728 73728
Constraints 67583 67583
Binaries 73728 73728
Integers 0 0
Continuous 0 0
Implicit Integers 0 0
Fixed Variables 0 0
Nonzero Density 5.42519e-05 5.42519e-05
Nonzeroes 270324 270324
Constraint Classification Properties
Original Presolved
Total 67583 67583
Empty 0 0
Free 0 0
Singleton 0 0
Aggregations 0 0
Precedence 0 0
Variable Bound 0 0
Set Partitioning 18431 18431
Set Packing 49152 49152
Set Covering 0 0
Cardinality 0 0
Invariant Knapsack 0 0
Equation Knapsack 0 0
Bin Packing 0 0
Knapsack 0 0
Integer Knapsack 0 0
Mixed Binary 0 0
General Linear 0 0
Indicator 0 0

Structure

Available nonzero structure and decomposition information. Further information can be found here.

value min median mean max
Components 0.698970
Constraint % 18.1821 18.1821 18.1821 18.1821
Variable % 25.0000 25.0000 25.0000 25.0000
Score 0.545463

Best Known Solution(s)

Find solutions below. Download the archive containing all solutions from the Download page.

ID Objective Exact Int. Viol Cons. Viol Obj. Viol Submitter Date Description
1 4 4 0 0 0 - 2018-10-13 Solution found during MIPLIB2017 problem selection.

Similar instances in collection

The following instances are most similar to chromaticindex1024-7 in the collection. This similarity analysis is based on 100 scaled instance features describing properties of the variables, objective function, bounds, constraints, and right hand sides.

Instance Status Variables Binaries Integers Continuous Constraints Nonz. Submitter Group Objective Tags
chromaticindex512-7 easy 36864 36864 0 0 33791 135156 Pierre Le Bodic chromaticindex 4 benchmark binary benchmark_suitable set_partitioning set_packing
chromaticindex256-8 easy 18432 18432 0 0 16895 67572 Pierre Le Bodic chromaticindex 4 binary benchmark_suitable set_partitioning set_packing
chromaticindex128-5 easy 9216 9216 0 0 8447 33780 Pierre Le Bodic chromaticindex 4 binary benchmark_suitable set_partitioning set_packing
chromaticindex32-8 easy 2304 2304 0 0 2111 8436 Pierre Le Bodic chromaticindex 4 binary benchmark_suitable set_partitioning set_packing
netdiversion easy 129180 129180 0 0 119589 615282 Chris Cullenbine 242 benchmark binary benchmark_suitable precedence variable_bound set_partitioning set_packing cardinality invariant_knapsack

Reference

@article{lebodicnemhauser2015,
title = "How important are branching decisions: Fooling \{MIP\} solvers ",
journal = "Operations Research Letters ",
volume = "43",
number = "3",
pages = "273 - 278",
year = "2015",
note = "",
issn = "0167-6377",
doi = "http://dx.doi.org/10.1016/j.orl.2015.03.003",
url = "//www.sciencedirect.com/science/article/pii/S0167637715000413",
author = "Pierre Le Bodic and George L. Nemhauser",
keywords = "Mixed integer programming solvers",
keywords = "Branch and bound",
keywords = "Tree size",
keywords = "Edge coloring",
keywords = "Chromatic index "
}

Last Update Mar 04, 2024 by Julian Manns
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