Self-avoiding walk on the hypercube

Abstract

We study the number cn(N) of n-step self-avoiding walks on the N-dimensional hypercube, and identify an N-dependent connective constant μN and amplitude AN such that cn(N) is O(μNn) for all n and N, and is asymptotically AN μNn as long as n 2pN for any fixed p< 12. We refer to the regime n 2N/2 as the dilute phase. We discuss conjectures concerning different behaviours of cn(N) when n reaches and exceeds 2N/2, corresponding to a critical window and a dense phase. In addition, we prove that the connective constant has an asymptotic expansion to all orders in N-1, with integer coefficients, and we compute the first five coefficients μN = N-1-N-1-4N-2-26N-3+O(N-4). The proofs are based on generating function and Tauberian methods implemented via the lace expansion, for which an introductory account is provided.