The fixed irreducible bridge ensemble for self-avoiding walks

Abstract

We define a new ensemble for self-avoiding walks in the upper half-plane, the fixed irredicible bridge ensemble, by considering self-avoiding walks in the upper half-plane up to their n-th bridge height, Yn, and scaling the walk by 1/Yn to obtain a curve in the unit strip, and then taking n∞. We then conjecture a relationship between this ensemble to in the unit strip from 0 to a fixed point along the upper boundary of the strip, integrated over the conjectured exit density of self-avoiding walk spanning a strip in the scaling limit. We conjecture that there exists a positive constant σ such that n-σYn converges in distribution to that of a stable random variable as n∞. Then the conjectured relationship between the fixed irreducible bridge scaling limit and can be described as follows: If one takes a SAW considered up to Yn and scales by 1/Yn and then weights the walk by Yn to an appropriate power, then in the limit n∞, one should obtain a curve from the scaling limit of the self-avoiding walk spanning the unit strip. In addition to a heuristic derivation, we provide numerical evidence to support the conjecture and give estimates for the boundary scaling exponent.