Leonard triples of q-Racah type

Abstract

Let F denote a field, and let V denote a vector space over F with finite positive dimension. Pick a nonzero q ∈ F such that q4 =1, and let A,B,C denote a Leonard triple on V that has q-Racah type. We show that there exist invertible W, W', W'' in End(V) such that (i) A commutes with W and W-1BW-C; (ii) B commutes with W' and (W')-1CW'-A; (iii) C commutes with W'' and (W'')-1AW''-B. Moreover each of W,W', W'' is unique up to multiplication by a nonzero scalar in F. We show that the three elements W'W, W''W', WW'' mutually commute, and their product is a scalar multiple of the identity. A number of related results are obtained.