English

Counting self-avoiding walks

Combinatorics 2015-03-29 v2 Mathematical Physics math.MP Probability

Abstract

The connective constant μ(G)\mu(G) of a graph GG is the asymptotic growth rate of the number of self-avoiding walks on GG from a given starting vertex. We survey three aspects of the dependence of the connective constant on the underlying graph GG. Firstly, when GG is cubic, we study the effect on μ(G)\mu(G) of the Fisher transformation (that is, the replacement of vertices by triangles). Secondly, we discuss upper and lower bounds for μ(G)\mu(G) when GG is regular. Thirdly, we present strict inequalities for the connective constants μ(G)\mu(G) of vertex-transitive graphs GG, as GG varies. As a consequence of the last, the connective constant of a Cayley graph of a finitely generated group decreases strictly when a new relator is added, and increases strictly when a non-trivial group element is declared to be a generator. Special prominence is given to open problems.

Keywords

Cite

@article{arxiv.1304.7216,
  title  = {Counting self-avoiding walks},
  author = {Geoffrey R. Grimmett and Zhongyang Li},
  journal= {arXiv preprint arXiv:1304.7216},
  year   = {2015}
}

Comments

Very minor changes for v2. arXiv admin note: text overlap with arXiv:1301.3091

R2 v1 2026-06-22T00:07:03.499Z