Triangle packings in randomly perturbed graphs

Abstract

The longstanding Nash-Williams conjecture asserts that every K3-divisible graph G with δ(G) 3n/4 admits a triangle decomposition. In the random setting, Frankl and Rödl showed that, with high probability, G(n,p) contains a triangle packing covering all but o(n2p) edges whenever p n-1/2+. In this paper, we study near-perfect triangle packings in randomly perturbed graphs. We prove that for every d>0 and every p>2d/(1+2d), if Gd is a dn-regular graph on n vertices, then with high probability the union Gd G(n,p) contains a triangle packing covering all but o(n2) edges. Moreover, this bound on p is best possible for 0<d 1/2, thereby determining the threshold in this range. A key ingredient in the proof is a new triangle-weighting lemma for weighted complete graphs.