Perfect matchings and Hamilton cycles in uniform attachment graphs

Abstract

We study Hamilton cycles and perfect matchings in a uniform attachment graph. In this random graph, vertices are added sequentially, and when a vertex t is created, it makes k independent and uniform choices from \1,…,t-1\ and attaches itself to these vertices. Improving the results of Frieze, P\'erez-Gim\'enez, Praat and Reiniger (2019), we show that, with probability approaching 1 as n tends to infinity, a uniform attachment graph on n vertices has a perfect matching for k 5 and a Hamilton cycle for k 13. One of the ingredients in our proofs is the identification of a subset of vertices that is least likely to expand, which provides us with better expansion rates than the existing ones.