English

Self-avoiding walks and polygons on hyperbolic graphs

Probability 2022-08-26 v2 Mathematical Physics Combinatorics math.MP

Abstract

We prove that for the dd-regular tessellations of the hyperbolic plane by kk-gons, there are exponentially more self-avoiding walks of length nn than there are self-avoiding polygons of length nn. We then prove that this property implies that the self-avoiding walk is ballistic, even on an arbitrary vertex-transitive graph. Moreover, for every fixed kk, we show that the connective constant for self-avoiding walks satisfies the asymptotic expansion d1O(1/d)d-1-O(1/d) as dd\to \infty; on the other hand, the connective constant for self-avoiding polygons remains bounded. Finally, we show for all but two tessellations that the number of self-avoiding walks of length nn is comparable to the nnth power of their connective constant. Some of these results were previously obtained by Madras and Wu \cite{MaWuSAW} for all but finitely many regular tessellations of the hyperbolic plane.

Keywords

Cite

@article{arxiv.1908.00127,
  title  = {Self-avoiding walks and polygons on hyperbolic graphs},
  author = {Christoforos Panagiotis},
  journal= {arXiv preprint arXiv:1908.00127},
  year   = {2022}
}
R2 v1 2026-06-23T10:36:45.892Z