neos-4285819-pedja

numerics aggregations precedence variable_bound set_partitioning invariant_knapsack mixed_binary

Submitter Variables Constraints Density Status Group Objective MPS File
Jeff Linderoth 721438 1518618 4.4415e-06 open neos-pseudoapplication-79 89.50319072956324* neos-4285819-pedja.mps.gz

Instance Statistics

Detailed explanation of the following tables can be found here.

Size Related Properties
Original Presolved
Variables 721438 481545
Constraints 1518618 609752
Binaries 686647 446852
Integers 0 0
Continuous 34791 34693
Implicit Integers 0 0
Fixed Variables 0 0
Nonzero Density 4.44150e-06 6.53983e-06
Nonzeroes 4866060 1920240
Constraint Classification Properties
Original Presolved
Total 1518618 609752
Empty 0 0
Free 0 0
Singleton 0 0
Aggregations 196 196
Precedence 10349 9980
Variable Bound 23617 26077
Set Partitioning 49 49
Set Packing 0 0
Set Covering 0 0
Cardinality 0 0
Invariant Knapsack 114428 110958
Equation Knapsack 0 0
Bin Packing 0 0
Knapsack 0 0
Integer Knapsack 0 0
Mixed Binary 1369979 462492
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
Constraint %
Variable %
Score

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
2 89.50319 89.50316 0 0 0 Michael Winkler 2022-09-02 Found with Gurobi 9.5.1
1 101.62542 101.62538 0 0 0 Edward Rothberg 2021-07-29 This was found using the Gurobi NoRel heuristic.

Similar instances in collection

The following instances are most similar to neos-4285819-pedja 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
l2p12 easy 11786 10906 590 290 21315 59629 Gleb Belov l2p 5 benchmark_suitable aggregations precedence variable_bound set_partitioning set_packing cardinality invariant_knapsack general_linear
gfd-schedulen180f7d50m30k18 hard 227535 192408 2025 33102 457985 1233372 Gleb Belov gfd-schedule 1 benchmark feasibility benchmark_suitable aggregations precedence variable_bound set_partitioning cardinality invariant_knapsack mixed_binary general_linear
neos-3709489-menik easy 48005 31506 15424 1075 59587 199272 Jeff Linderoth neos-pseudoapplication-44 Unbounded aggregations precedence variable_bound set_packing set_covering cardinality invariant_knapsack binpacking mixed_binary general_linear
neos-3699044-maipo easy 48007 31506 15424 1077 59589 199334 Jeff Linderoth neos-pseudoapplication-63 Unbounded aggregations precedence variable_bound set_packing set_covering cardinality binpacking mixed_binary general_linear
neos-4650160-yukon easy 1412 624 0 788 1969 6416 Jeff Linderoth neos-pseudoapplication-79 59.88499998695507 benchmark_suitable aggregations precedence variable_bound set_partitioning set_covering knapsack mixed_binary

Reference

No bibliographic information available

Last Update Mar 04, 2024 by Julian Manns
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