Hamiltonicity of Sparse Pseudorandom Graphs

Abstract

We show that every (n,d,λ)-graph contains a Hamilton cycle for sufficiently large n, assuming that d≥ 6n and λ≤ cd, where c=170000. This significantly improves a recent result of Glock, Correia and Sudakov, who obtained a similar result for d that grows polynomially with n. The proof is based on a new result regarding the second largest eigenvalue of the adjacency matrix of a subgraph induced by a random subset of vertices, combined with a recent result on connecting designated pairs of vertices by vertex-disjoint paths in (n,d,λ)-graphs. We believe that the former result is of independent interest and will have further applications.