Finite-dimensional irreducible modules of the Bannai--Ito algebra at characteristic zero
Abstract
Assume that F is an algebraically closed with characteristic 0. The Bannai--Ito algebra BI is a unital associative F-algebra generated by X,Y,Z and the relations assert that each of gather* \X,Y\-Z, \Y,Z\-X, \Z,X\-Y gather* is central in BI. In this paper we classify the finite-dimensional irreducible BI-modules up to isomorphism. As we will see the elements X,Y,Z are not always diagonalizable on finite-dimensional irreducible BI-modules.
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