English

The self-avoiding walk in a strip

Probability 2015-05-19 v2 Mathematical Physics math.MP

Abstract

We review the existence of the infinite length self-avoiding walk in the half plane and its relationship to bridges. We prove that this probability measure is also given by the limit as ββc\beta \rightarrow \beta_c- of the probability measure on all finite length walks ω\omega with the probability of ω\omega proportional to βcω\beta_c^{|\omega|} where ω|\omega| is the number of steps in ω\omega. The self-avoiding walk in a strip {z:0<(z)<y}\{z : 0<\Im(z)<y\} is defined by considering all self-avoiding walks ω\omega in the strip which start at the origin and end somewhere on the top boundary with probability proportional to βcω\beta_c^{|\omega|} We prove that this probability measure may be obtained by conditioning the SAW in the half plane to have a bridge at height yy. This observation is the basis for simulations to test conjectures on the distribution of the endpoint of the SAW in a strip and the relationship between the distribution of this strip SAW and SLE8/3_{8/3}.

Keywords

Cite

@article{arxiv.1008.4321,
  title  = {The self-avoiding walk in a strip},
  author = {Ben Dyhr and Michael Gilbert and Tom Kennedy and Gregory F. Lawler and Shane Passon},
  journal= {arXiv preprint arXiv:1008.4321},
  year   = {2015}
}

Comments

30 pages, 3 figures

R2 v1 2026-06-21T16:05:07.839Z