Accession Number ADA586516
Title How Tight is the Corner Relaxation. Insights Gained from the Stable Set Problem.
Publication Date Feb 2012
Media Count 28p
Personal Author C. Michini G. Cornuejols G. Nannicini
Abstract The corner relaxation of a mixed-integer linear program is a central concept in cutting plane theory. In a recent paper Fischetti and Monaci provide an empirical assessment of the strength of the corner and other related relaxations on benchmark problems. In this paper we give a precise characterization of the bounds given by these relaxations for the edge formulation of the maximum stable set problem in a graph.
Keywords Corner relaxation
Cuttinig planes
Formulations
Integer programming
Linear programming
Milp(Mixed-integer linear program)
Relaxation
Stable sets


 
Source Agency Non Paid ADAS
NTIS Subject Category 72E - Operations Research
Corporate Author Carnegie-Mellon Univ., Pittsburgh, PA. Tepper School of Business.
Document Type Technical report
Title Note N/A
NTIS Issue Number 1405
Contract Number N00014-12-1-0032

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