The self-avoiding walk in a strip
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 of the probability measure on all finite length walks with the probability of proportional to where is the number of steps in . The self-avoiding walk in a strip is defined by considering all self-avoiding walks in the strip which start at the origin and end somewhere on the top boundary with probability proportional to We prove that this probability measure may be obtained by conditioning the SAW in the half plane to have a bridge at height . 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 SLE.
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