A group commutator involving the last distance matrix and dual distance matrix of a Q-polynomial distance-regular graph
Abstract
Let denote the Hamming graph H(D,r) with r ≥ 3. Consider the distance matrices \Ai\i=0D of . Fix a vertex x of , and consider the dual distance matrices \Ai*\i=0D of with respect to x. We investigate the group commutator AD-1AD*-1ADAD*. We show that this matrix is diagonalizable. We compute its eigenvalues and their eigenspaces. Let T denote the subconstituent algebra of with respect to x. We describe the action of AD-1AD*-1ADAD* on each irreducible T-module.
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