Evaluation modules for the q-tetrahedron algebra

Abstract

Let F denote an algebraically closed field, and fix a nonzero q ∈ F that is not a root of unity. We consider the q-tetrahedron algebra q over F. It is known that each finite-dimensional irreducible q-module of type 1 is a tensor product of evaluation modules. This paper contains a comprehensive description of the evaluation modules for q. This description includes the following topics. Given an evaluation module V for q, we display 24 bases for V that we find attractive. For each basis we give the matrices that represent the q-generators. We give the transition matrices between certain pairs of bases among the 24. It is known that the cyclic group 4 acts on q as a group of automorphisms. We describe what happens when V is twisted via an element of 4. We discuss how evaluation modules for q are related to Leonard pairs of q-Racah type.