On degree sequences forcing the square of a Hamilton cycle

Abstract

A famous conjecture of P\'osa from 1962 asserts that every graph on n vertices and with minimum degree at least 2n/3 contains the square of a Hamilton cycle. The conjecture was proven for large graphs in 1996 by Koml\'os, S\'ark\"ozy and Szemer\'edi. In this paper we prove a degree sequence version of P\'osa's conjecture: Given any η >0, every graph G of sufficiently large order n contains the square of a Hamilton cycle if its degree sequence d1≤ … ≤ dn satisfies di ≥ (1/3+η)n+i for all i ≤ n/3. The degree sequence condition here is asymptotically best possible. Our approach uses a hybrid of the Regularity-Blow-up method and the Connecting-Absorbing method.