A condition for Hamiltonicity in Sparse Random Graphs with a Fixed Degree Sequence

Abstract

We consider the random graph Gn, d chosen uniformly at random from the set of all graphs with a given sparse degree sequence d. We assume d has minimum degree at least 4, at most a power law tail, and place one more condition on its tail. For k 2 define βk(G) = e(A, B) + k(|A|-|B|) - d(A), with the maximum taken over disjoint vertex sets A, B. It is shown that the problem of determining if Gn, d contains a Hamilton cycle reduces to calculating β2(Gn, d). If k 2 and δ k+2, the problem of determining if Gn, d contains a k-factor reduces to calculating βk(Gn, d).