The Jordan Structure of Two Dimensional Loop Models
Abstract
We show how to use the link representation of the transfer matrix of loop models on the lattice to calculate partition functions, at criticality, of the Fortuin-Kasteleyn model with various boundary conditions and parameter and, more specifically, partition functions of the corresponding -Potts spin models, with . The braid limit of is shown to be a central element of the Temperley-Lieb algebra , its eigenvalues are determined and, for generic , a basis of its eigenvectors is constructed using the Wenzl-Jones projector. To any element of this basis is associated a number of defects , , and the basis vectors with the same span a sector. Because components of these eigenvectors are singular when and , the link representations of and are shown to have Jordan blocks between sectors and when and (). When and do not satisfy the previous constraint, is diagonalizable.
Cite
@article{arxiv.1101.2885,
title = {The Jordan Structure of Two Dimensional Loop Models},
author = {Alexi Morin-Duchesne and Yvan Saint-Aubin},
journal= {arXiv preprint arXiv:1101.2885},
year = {2011}
}
Comments
55 pages