English

An O(|E|)-linear Model for the MaxCut Problem

Combinatorics 2016-04-11 v1 Discrete Mathematics

Abstract

A polytope PP is a {\em model} for a combinatorial problem on finite graphs GG whose variables are indexed by the edge set EE of GG if the points of PP with (0,1)-coordinates are precisely the characteristic vectors of the subset of edges inducing the feasible configurations for the problem. In the case of the (simple) MaxCut Problem, which is the one that concern us here, the feasible subsets of edges are the ones inducing the bipartite subgraphs of GG. In this paper we introduce a new polytope P12RE\mathbb{P}_{12} \subset \mathbb{R}^{|E|} given by at most 11E11|E| inequalities, which is a model for the MaxCut Problem on GG. Moreover, the left side of each inequality is the sum of at most 4 edge variables with coefficients ±1\pm1 and right side 0,1, or 2. We restrict our analysis to the case of G=KzG=K_{z}, the complete graph in zz vertices, where zz is an even positive integer z4z\ge 4. This case is sufficient to study because the simple MaxCut problem for general graphs GG can be reduced to the complete graph KzK_z by considering the obective function of the associated integer programming as the characteristic vector of the edges in GKzG \subseteq K_z. This is a polynomial algorithmic transformation.

Keywords

Cite

@article{arxiv.1604.02325,
  title  = {An O(|E|)-linear Model for the MaxCut Problem},
  author = {Sostenes L. Lins and Diogo B. Henriques},
  journal= {arXiv preprint arXiv:1604.02325},
  year   = {2016}
}

Comments

14 pages, 5 figures

R2 v1 2026-06-22T13:28:06.022Z