Litcius/Paper detail

The Running Intersection Relaxation of the Multilinear Polytope

Alberto Del Pia, Aida Khajavirad

2021Mathematics of Operations Research28 citationsDOI

Abstract

The multilinear polytope of a hypergraph is the convex hull of a set of binary points satisfying a collection of multilinear equations. We introduce the running intersection inequalities, a new class of facet-defining inequalities for the multilinear polytope. Accordingly, we define a new polyhedral relaxation of the multilinear polytope, referred to as the running intersection relaxation, and identify conditions under which this relaxation is tight. Namely, we show that for kite-free beta-acyclic hypergraphs, a class that lies between gamma-acyclic and beta-acyclic hypergraphs, the running intersection relaxation coincides with the multilinear polytope and it admits a polynomial size extended formulation.

Topics & Concepts

Multilinear mapMathematicsPolytopeCombinatoricsConvex hullIntersection (aeronautics)Convex polytopeBirkhoff polytopeClass (philosophy)Relaxation (psychology)Discrete mathematicsRegular polygonConvex optimizationConvex setPure mathematicsGeometryComputer scienceArtificial intelligencePsychologyAerospace engineeringSocial psychologyEngineeringAdvanced Optimization Algorithms ResearchOptimization and Mathematical ProgrammingTransport Systems and Technology