On the triangle space of a random graph

Abstract

Settling a first case of a conjecture of M. Kahle on the homology of the clique complex of the random graph G=Gn,p, we show, roughly speaking, that (with high probability) the triangles of G span its cycle space whenever each of its edges lies in a triangle (which happens (w.h.p.) when p is at least about (3/2) n/n, and not below this unless p is very small.) We give two related proofs of this statement, together with a relatively simple proof of a fundamental "stability" theorem for triangle-free subgraphs of Gn,p, originally due to Kohayakawa, uczak and R\"odl, that underlies the first of our proofs.