Compatibility and companions for Leonard pairs
Abstract
In this paper, we introduce the concepts of compatibility and companion for Leonard pairs. These concepts are roughly described as follows. Let F denote a field, and let V denote a vector space over F with finite positive dimension. A Leonard pair on V is an ordered pair of diagonalizable F-linear maps A : V V and A* : V V that each act in an irreducible tridiagonal fashion on an eigenbasis for the other one. Leonard pairs A,A* and B,B* on V are said to be compatible whenever A* = B* and [A,A*] = [B,B*], where [r,s] = r s - s r. For a Leonard pair A,A* on V, by a companion of A,A* we mean an F-linear map K: V V such that K is a polynomial in A* and A-K, A* is a Leonard pair on V. The concepts of compatibility and companion are related as follows. For compatible Leonard pairs A,A* and B,B* on V, define K = A-B. Then K is a companion of A,A*. For a Leonard pair A,A* on V and a companion K of A,A*, define B = A-K and B* = A*. Then B,B* is a Leonard pair on V that is compatible with A,A*. Let A,A* denote a Leonard pair on V. We find all the Leonard pairs B, B* on V that are compatible with A,A*. For each solution B, B* we describe the corresponding companion K = A-B.
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