K4-intersecting families of graphs

Abstract

Ellis, Filmus, and Friedgut proved an old conjecture of Simonovits and S\'os showing that the maximum size of a triangle-intersecting family of graphs on n vertices has size at most 2n2 - 3, with equality for the family of graphs containing some fixed triangle. They conjectured that their results extend to cross-intersecting families, as well to Kt-intersecting families. We prove these conjectures for t ∈ \3,4\, showing that if F1 and F2 are families of graphs on n labeled vertices such that for any G1 ∈ F1 and G2 ∈ F2, G1 G2 contains a Kt, then F1 F2 4n2 - t2, with equality if and only if F1 = F2 consists of all graphs that contain some fixed Kt. We also establish a stability result. More generally, "G1 G2 contains a Kt" can be replaced by "G1 and G2 agree on a non-(t-1)-colorable graph."