An upper bound on the number of self-avoiding polygons via joining

Abstract

For d ≥ 2 and n ∈ N even, let pn = pn(d) denote the number of length n self-avoiding polygons in Zd up to translation. The polygon cardinality grows exponentially, and the growth rate n ∈ 2N pn1/n ∈ (0,∞) is called the connective constant and denoted by μ. Madras [J. Statist. Phys. 78 (1995) no. 3--4, 681--699] has shown that pn μ-n ≤ C n-1/2 in dimension d=2. Here we establish that pn μ-n ≤ n-3/2 + o(1) for a set of even n of full density when d=2. We also consider a certain variant of self-avoiding walk and argue that, when d ≥ 3, an upper bound of n-2 + d-1 + o(1) holds on a full density set for the counterpart in this variant model of this normalized polygon cardinality.