Toward a 6/5 Bound for the Minimum Cost 2-Edge Connected Spanning Subgraph Problem

Abstract

Given a complete graph Kn=(V, E) with non-negative edge costs c∈ RE, the problem 2EC is that of finding a 2-edge connected spanning multi-subgraph of Kn of minimum cost. The integrality gap α2EC of the linear programming relaxation 2ECLP for 2EC has been conjectured to be 65, although currently we only know that 65≤α2EC≤32. In this paper, we explore the idea of using the structure of solutions for 2ECLP and the concept of convex combination to obtain improved bounds for α2EC. We focus our efforts on a family J of half-integer solutions that appear to give the largest integrality gap for 2ECLP. We successfully show that the conjecture α2EC = 65 is true for any cost functions optimized by some x*∈ J.