The Hammersley-Welsh bound for self-avoiding walk revisited

Abstract

The Hammersley-Welsh bound (1962) states that the number cn of length n self-avoiding walks on Zd satisfies \[ cn ≤ [ O(n1/2) ] μcn, \] where μc=μc(d) is the connective constant of Zd. While stronger estimates have subsequently been proven for d≥ 3, for d=2 this has remained the best rigorous, unconditional bound available. In this note, we give a new, simplified proof of this bound, which does not rely on the combinatorial analysis of unfolding. We also prove a small, non-quantitative improvement to the bound, namely \[ cn ≤ [ o(n1/2)] μcn. \] The improved bound is obtained as a corollary to the sub-ballisticity theorem of Duminil-Copin and Hammond (2013). We also show that any quantitative form of that theorem would yield a corresponding quantitative improvement to the Hammersley-Welsh bound.