Embedding spanning bounded degree graphs in randomly perturbed graphs

Abstract

We study the model Gα G(n,p) of randomly perturbed dense graphs, where Gα is any n-vertex graph with minimum degree at least α n and G(n,p) is the binomial random graph. We introduce a general approach for studying the appearance of spanning subgraphs in this model using absorption. This approach yields simpler proofs of several known results. We also use it to derive the following two new results. For every α>0 and 5, and every n-vertex graph F with maximum degree at most , we show that if p=ω(n-2/(+1)) then Gα G(n,p) with high probability contains a copy of F. The bound used for p here is lower by a -factor in comparison to the conjectured threshold for the general appearance of such subgraphs in G(n,p) alone, a typical feature of previous results concerning randomly perturbed dense graphs. We also give the first example of graphs where the appearance threshold in Gα G(n,p) is lower than the appearance threshold in G(n,p) by substantially more than a -factor. We prove that, for every k≥ 2 and α >0, there is some η>0 for which the kth power of a Hamilton cycle with high probability appears in Gα G(n,p) when p=ω(n-1/k-η). The appearance threshold of the kth power of a Hamilton cycle in G(n,p) alone is known to be n-1/k, up to a -term when k=2, and exactly for k>2.