Classical height models with topological order
Statistical Mechanics
2011-03-21 v3 Strongly Correlated Electrons
Abstract
I discuss a family of statistical-mechanics models in which (some classes of) elements of a finite group occupy the (directed) edges of a lattice; the product around any plaquette is constrained to be the group identity . Such a model may possess topological order, i.e. its equilibrium ensemble has distinct, symmetry-related thermodynamic components that cannot be distinguished by any local order parameter. In particular, if is a non-abelian group, the topological order may be non-abelian. Criteria are given for the viability of particular models, in particular for Monte Carlo updates.
Cite
@article{arxiv.0910.4574,
title = {Classical height models with topological order},
author = {Christopher L. Henley},
journal= {arXiv preprint arXiv:0910.4574},
year = {2011}
}
Comments
17 pp, two figures. Massive revisions since 1st submission (one figure added, Sec VI transfer matrix added, total length 50% longer)