Tridiagonal pairs of q-Racah type and the μ-conjecture

Let K denote a field and let V denote a vector space over K with finite positive dimension. We consider a pair of linear transformations A:V→V and A∗:V→V that satisfy the following conditions: (i) each of is diagonalizable; (ii) there exists an ordering of the eigenspaces of A such that A∗Vi⊆Vi-1+Vi+Vi+1 for 0⩽i⩽d, where V-1=0 and Vd+1=0; (iii) there exists an ordering of the eigenspaces of A∗ such that for 0⩽i⩽δ, where and ; (iv) there is no subspace W of V such that . We call such a pair a tridiagonal pair on V. It is known that d=δ and for 0⩽i⩽d the dimensions of , coincide. We say the pair A,A∗ is sharp whenever dimV0=1. It is known that if K is algebraically closed then is sharp. A conjectured classification of the sharp tridiagonal pairs was recently introduced by Ito and the second author. Shortly afterwards we introduced a conjecture, called the μ-conjecture, which implies the classification conjecture. In this paper we show that the μ-conjecture holds in a special case called q-Racah.