Self Avoiding Surfaces in the 3D Ising Model
Abstract
We examine the geometrical and topological properties of surfaces surrounding clusters in the 3-- Ising model. For geometrical clusters at the percolation temperature and Fortuin--Kasteleyn clusters at , the number of surfaces of genus and area behaves as , with approximately linear in and constant. These scaling laws are the same as those we obtain for simulations of 3-- bond percolation. We observe that cross--sections of spin domain boundaries at decompose into a distribution of loops of length that scales as with . We also present some new numerical results for 2-- self-avoiding loops that we compare with analytic predictions. We address the prospects for a string--theoretic description of cluster boundaries.
Cite
@article{arxiv.hep-th/9504076,
title = {Self Avoiding Surfaces in the 3D Ising Model},
author = {Vl. S Dotsenko and G. Harris and E. Marinari and E. Martinec and M. Picco and P. Windey},
journal= {arXiv preprint arXiv:hep-th/9504076},
year = {2009}
}
Comments
latex file, followed by 34 ps figures (no epsf)