Leonard triples and hypercubes

Abstract

Let V denote a vector space over C with finite positive dimension. By a Leonard triple on V we mean an ordered triple of linear operators on V such that for each of these operators there exists a basis of V with respect to which the matrix representing that operator is diagonal and the matrices representing the other two operators are irreducible tridiagonal. Let D denote a positive integer and let QD denote the graph of the D-dimensional hypercube. Let X denote the vertex set of QD and let A denote the adjacency matrix of QD. Fix x ∈ X and let A* denote the corresponding dual adjacency matrix. Let T denote the subalgebra of MatX(C) generated by A, A*. We refer to T as the Terwilliger algebra of QD with respect to x. The matrices A and A* are related by the fact that 2 A = A* Ae - Ae A* and 2 A* = Ae A - A Ae, where 2 Ae = A A* - A* A and 2=-1. We show that the triple A, A*, Ae acts on each irreducible T-module as a Leonard triple. We give a detailed description of these Leonard triples.