McKay Matrices for Finite-dimensional Hopf Algebras

Abstract

For a finite-dimensional Hopf algebra A, the McKay matrix MV of an A-module V encodes the relations for tensoring the simple A-modules with V. We prove results about the eigenvalues and the right and left (generalized) eigenvectors of MV by relating them to characters. We show how the projective McKay matrix QV obtained by tensoring the projective indecomposable modules of A with V is related to the McKay matrix of the dual module of V. We illustrate these results for the Drinfeld double Dn of the Taft algebra by deriving expressions for the eigenvalues and eigenvectors of MV and QV in terms of several kinds of Chebyshev polynomials. For the matrix NV that encodes the fusion rules for tensoring V with a basis of projective indecomposable Dn-modules for the image of the Cartan map, we show that the eigenvalues and eigenvectors also have such Chebyshev expressions.