Long paths and cycles in random subgraphs of H-free graphs

Abstract

Let H be a given finite (possibly empty) family of connected graphs, each containing a cycle, and let G be an arbitrary finite H-free graph with minimum degree at least k. For p ∈ [0,1], we form a p-random subgraph Gp of G by independently keeping each edge of G with probability p. Extending a classical result of Ajtai, Koml\'os, and Szemer\'edi, we prove that for every positive , there exists a positive δ (depending only on ) such that the following holds: If p 1+k, then with probability tending to 1 as k ∞, the random graph Gp contains a cycle of length at least nH(δ k), where nH(k)>k is the minimum number of vertices in an H-free graph of average degree at least k. Thus in particular Gp as above typically contains a cycle of length at least linear in k.