Forbidden Induced Subgraphs for Bounded p-Intersection Number

Abstract

A graph G has p-intersection number at most d if it is possible to assign to every vertex u of G, a subset S(u) of some ground set U with |U|=d in such a way that distinct vertices u and v of G are adjacent in G if and only if |S(u) S(v)|≥ p. We show that every minimal forbidden induced subgraph for the hereditary class G(d,p) of graphs whose p-intersection number is at most d, has order at most 3· 2d+1+1, and that the exponential dependence on d in this upper bound is necessary. For p∈ \ d-1,d-2\, we provide more explicit results characterizing the graphs in G(d,p) without isolated/universal vertices using forbidden induced subgraphs.