Two linear transformations each tridiagonal with respect to an eigenbasis of the other; comments on the split decomposition

Abstract

Let K denote a field and let V denote a vector space over K with finite positive dimension. We consider an ordered pair of linear transformations A:V V and A*:V V that satisfy conditions (i), (ii) below. (i) There exists a basis for V with respect to which the matrix representing A is irreducible tridiagonal and the matrix representing A* is diagonal. (ii) There exists a basis for V with respect to which the matrix representing A is diagonal and the matrix representing A* is irreducible tridiagonal. We call such a pair a Leonard pair on V. Let A,A* denote a Leonard pair on V. There exists a decomposition of V into a direct sum of 1-dimensional subspaces, with respect to which A is lower bidiagonal and A* is upper bidiagonal. This is known as the split decomposition. We use the split decomposition to obtain several characterizations of Leonard pairs.

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