Concatenating bipartite graphs

Abstract

Let x,y∈(0,1] and let A,B,C be disjoint nonempty subsets of a graph G, where every vertex in A has at least x|B| neighbours in B, and every vertex in B has at least y|C| neighbours in C. We denote by φ(x,y) the maximum z such that, in all such graphs G, there is a vertex v in C that is joined to at least z|A| vertices in A by two-edge paths. The function φ is interesting, and we investigate some of its properties. For instance, we show that it is symmetric in x and y, and that it has a discontinuity at x=y=1/k for all integers k>1. We raise a number of questions and conjectures.