Self-dual Leonard pairs

Abstract

Let denote a field and let V denote a vector space over with finite positive dimension. Consider a pair A,A* of diagonalizable -linear maps on V, each of which acts on an eigenbasis for the other one in an irreducible tridiagonal fashion. Such a pair is called a Leonard pair. We consider the self-dual case in which there exists an automorphism of the endomorphism algebra of V that swaps A and A*. Such an automorphism is unique, and called the duality A A*. In the present paper we give a comprehensive description of this duality. In particular, we display an invertible -linear map T on V such that the map X T X T-1 is the duality A A*. We express T as a polynomial in A and A*. We describe how T acts on 4 flags, 12 decompositions, and 24 bases for V.