The Facets of the Subtours Elimination Polytope

Abstract

Let G=(V, E) be an undirected graph. The subtours elimination polytope P(G) is the set of x∈ RE such that: 0≤ x(e)≤ 1 for any edge e∈ E, x(δ (v))=2 for any vertex v∈ V, and x(δ (U))≥ 2 for any nonempty and proper subset U of V. P(G) is a relaxation of the Traveling Salesman Polytope, i.e., the convex hull of the Hamiton circuits of G. Maurras Maurras 1975 and Gr\"otschel and Padberg Grotschel and Padberg 1979b characterize the facets of P(G) when G is a complete graph. In this paper we generalize their result by giving a minimal description of P(G) in the general case and by presenting a short proof of it.