I discuss a family of statistical-mechanics models in which (some classes of) elements of a finite group G occupy the (directed) edges of a lattice; the product around any plaquette is constrained to be the group identity e. 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 G 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.
Download full-text PDF |
Source |
|---|---|
| http://dx.doi.org/10.1088/0953-8984/23/16/164212 | DOI Listing |
Publication Analysis
Top Keywords
topological order
12
classical height
4
height models
4
models topological
4
order
4
order discuss
4
discuss family
4
family statistical-mechanics
4
statistical-mechanics models
4
models classes
4
Similar Publications
Want AI Summaries of new PubMed Abstracts delivered to your In-box?
Enter search terms and have AI summaries delivered each week - change queries or unsubscribe any time!