Cycle factors in randomly perturbed graphs

Abstract

We study the problem of finding pairwise vertex-disjoint copies of the -vertex cycle C in the randomly perturbed graph model, which is the union of a deterministic n-vertex graph G and the binomial random graph G(n,p). For 3 we prove that asymptotically almost surely G G(n,p) contains \δ(G), n/ \ pairwise vertex-disjoint cycles C, provided p C n/n for C sufficiently large. Moreover, when δ(G) α n with 0<α 1/ and G is not `close' to the complete bipartite graph Kα n,(1-α) n, then p C/n suffices to get the same conclusion. This provides a stability version of our result. In particular, we conclude that p C/n suffices when α>1/ for finding n/ cycles C. Our results are asymptotically optimal. They can be seen as an interpolation between the Johansson--Kahn--Vu Theorem for C-factors and the resolution of the El-Zahar Conjecture for C-factors by Abbasi.