English

The Jordan Structure of Two Dimensional Loop Models

Mathematical Physics 2011-04-20 v4 Statistical Mechanics math.MP

Abstract

We show how to use the link representation of the transfer matrix DND_N of loop models on the lattice to calculate partition functions, at criticality, of the Fortuin-Kasteleyn model with various boundary conditions and parameter β=2cos(π(1a/b)),a,bN\beta = 2 \cos(\pi(1-a/b)), a,b\in \mathbb N and, more specifically, partition functions of the corresponding QQ-Potts spin models, with Q=β2Q=\beta^2. The braid limit of DND_N is shown to be a central element FN(β)F_N(\beta) of the Temperley-Lieb algebra TLN(β)TL_N(\beta), its eigenvalues are determined and, for generic β\beta, a basis of its eigenvectors is constructed using the Wenzl-Jones projector. To any element of this basis is associated a number of defects dd, 0dN0\le d\le N, and the basis vectors with the same dd span a sector. Because components of these eigenvectors are singular when bZb \in \mathbb{Z}^* and a2Z+1a \in 2 \mathbb{Z} + 1, the link representations of FNF_N and DND_N are shown to have Jordan blocks between sectors dd and dd' when dd<2bd-d' < 2b and (d+d)/2b1 mod 2b(d+d')/2 \equiv b-1 \ \textrm{mod} \ 2b (d>dd>d'). When aa and bb do not satisfy the previous constraint, DND_N 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

R2 v1 2026-06-21T17:12:20.516Z