[en] In this paper a new lower bound for unconstrained quadratic 0-1 minimization is investigated. It is shown that this bound can be computed by solving a linear programming problem of polynomial size in the number of variables; and it is shown that the polyhedron S[3], defined by the constraints of this LP formulation is precisely the first Chvátal closure of the polyhedron associated with standard linearization procedures. By rewriting the quadratic minimization problem as a balancing problem in a weighted signed graph, it can be seen that the polyhedron defined by the odd cycle inequalities is equivalent, in a certain sense, with S[3]. As a corollary, a compact linear programming formulation is presented for the maximum cut problem for the case of weakly bipartite graphs.
Disciplines :
Quantitative methods in economics & management Mathematics
Author, co-author :
Boros, Endre
Crama, Yves ; Université de Liège - ULiège > HEC Liège : UER > Recherche opérationnelle et gestion de la production
Hammer, Peter L.
Language :
English
Title :
Chvátal cuts and odd cycle inequalities in quadratic 0-1 optimization
