Max-cut and extendability of matchings in distance-regular graphs

Abstract

Let G be a distance-regular graph of order v and size e. In this paper, we show that the max-cut in G is at most e(1-1/g), where g is the odd girth of G. This result implies that the independence number of G is at most v2(1-1/g). We use this fact to also study the extendability of matchings in distance-regular graphs. A graph G of even order v is called t-extendable if it contains a perfect matching, t<v/2 and any matching of t edges is contained in some perfect matching. The extendability of G is the maximum t such that G is t-extendable. We generalize previous results on strongly regular graphs and show that all distance-regular graphs with diameter D≥ 3 are 2-extendable. We also obtain various lower bounds for the extendability of distance-regular graphs of valency k that depend on k, λ and μ, where λ is the number of common neighbors of any two adjacent vertices and μ is the number of common neighbors of any two vertices in distance two.