Tridiagonal pairs and the q-tetrahedron algebra

Abstract

In this paper we further develop the connection between tridiagonal pairs and the q-tetrahedron algebra q. Let V denote a finite dimensional vector space over an algebraically closed field and let A, A* denote a tridiagonal pair on V. For 0 ≤ i ≤ d let θi (resp. θ*i) denote a standard ordering of the eigenvalues of A (resp. A*). Fix a nonzero scalar q which is not a root of unity. T. Ito and P. Terwilliger have shown that when θi = q2i-d and θ*i = qd-2i there exists an irreducible q-module structure on V such that the q generators x01, x23 act as A, A* respectively. In this paper we examine the case in which there exists a nonzero scalar c in K such that θi = q2i-d and θ*i = q2i-d + c qd-2i. In this case we associate to A,A* a polynomial P and prove the following equivalence. The following are equivalent: (i) There exists a q-module structure on V such that x01 acts as A and x30 + cx23 acts as A*, where x01, x30, x23 are standard generators for q. (ii) P(q2d-2 (q-q-1)-2) ≠ 0. Suppose (i),(ii) hold. Then the q-module structure on V is unique and irreducible.