Near-bipartite Leonard pairs

Abstract

Let denote a field, and let V denote a vector space over with finite positive dimension. A Leonard pair on V is an ordered pair of diagonalizable -linear maps A: V V and A* : V V that each act on an eigenbasis for the other in an irreducible tridiagonal fashion. Let A,A* denote a Leonard pair on V. Let \vi\i=0d denote an eigenbasis for A* on which A acts in an irreducible tridiagonal fashion. For 0 ≤ i ≤ d define an -linear map E*i : V V such that E*i vi = vi and E*i vj = 0 if j ≠ i (0 ≤ j ≤ d). The map F = Σi=0d E*i A E*i is called the flat part of A. The Leonard pair A,A* is bipartite whenever F=0. The Leonard pair A,A* is said to be near-bipartite whenever the pair A-F, A* is a Leonard pair on V. In this case, the Leonard pair A-F, A* is bipartite, and called the bipartite contraction of A,A*. Let B,B* denote a bipartite Leonard pair on V. By a near-bipartite expansion of B,B* we mean a near-bipartite Leonard pair on V with bipartite contraction B,B*. In the present paper we have three goals. Assuming is algebraically closed, (i) we classify up to isomorphism the near-bipartite Leonard pairs over ; (ii) for each near-bipartite Leonard pair over we describe its bipartite contraction; (iii) for each bipartite Leonard pair over we describe its near-bipartite expansions.