English

Leonard pairs, spin models, and distance-regular graphs

Rings and Algebras 2019-07-18 v2

Abstract

A Leonard pair is an ordered pair of diagonalizable linear maps on a finite-dimensional vector space, that each act on an eigenbasis for the other one in an irreducible tridiagonal fashion. In the present paper we consider a type of Leonard pair, said to have spin. The notion of a spin model was introduced by V.F.R. Jones to construct link invariants. A spin model is a symmetric matrix over C\mathbb{C} that satisfies two conditions, called the type II and type III conditions. It is known that a spin model W\sf W is contained in a certain finite-dimensional algebra N(W)N({\sf W}), called the Nomura algebra. It often happens that a spin model W\sf W satisfies WMN(W){\sf W} \in {\sf M} \subseteq N({\sf W}), where M\sf M is the Bose-Mesner algebra of a distance-regular graph Γ\Gamma; in this case we say that Γ\Gamma affords W\sf W. If Γ\Gamma affords a spin model, then each irreducible module for every Terwilliger algebra of Γ\Gamma takes a certain form, recently described by Caughman, Curtin, Nomura, and Wolff. In the present paper we show that the converse is true; if each irreducible module for every Terwilliger algebra of Γ\Gamma takes this form, then Γ\Gamma affords a spin model. We explicitly construct this spin model when Γ\Gamma has qq-Racah type. The proof of our main result relies heavily on the theory of spin Leonard pairs.

Keywords

Cite

@article{arxiv.1907.03900,
  title  = {Leonard pairs, spin models, and distance-regular graphs},
  author = {Kazumasa Nomura and Paul Terwilliger},
  journal= {arXiv preprint arXiv:1907.03900},
  year   = {2019}
}
R2 v1 2026-06-23T10:15:30.402Z