SLE-type growth processes and the Yang-Lee singularity
Abstract
The recently introduced SLE growth processes are based on conformal maps from an open and simply-connected subset of the upper half-plane to the half-plane itself. We generalize this by considering a hierarchy of stochastic evolutions mapping open and simply-connected subsets of smaller and smaller fractions of the upper half-plane to these fractions themselves. The evolutions are all driven by one-dimensional Brownian motion. Ordinary SLE appears at grade one in the hierarchy. At grade two we find a direct correspondence to conformal field theory through the explicit construction of a level-four null vector in a highest-weight module of the Virasoro algebra. This conformal field theory has central charge c=-22/5 and is associated to the Yang-Lee singularity. Our construction may thus offer a novel description of this statistical model.
Cite
@article{arxiv.math-ph/0307058,
title = {SLE-type growth processes and the Yang-Lee singularity},
author = {Frederic Lesage and Jorgen Rasmussen},
journal= {arXiv preprint arXiv:math-ph/0307058},
year = {2014}
}
Comments
12 pages, LaTeX, v2: thorough revision with corrections, v3: version to be published