Distance-regular graphs of q-Racah type and the q-tetrahedron algebra

Abstract

In this paper we discuss a relationship between the following two algebras: (i) the subconstituent algebra T of a distance-regular graph that has q-Racah type; (ii) the q-tetrahedron algebra q which is a q-deformation of the three-point sl2 loop algebra. Assuming that every irreducible T-module is thin, we display an algebra homomorphism from q into T and show that T is generated by the image together with the center Z(T).