A classification of sharp tridiagonal pairs

Abstract

Let F denote a field and let V denote a vector space over F with finite positive dimension. We consider a pair of linear transformations A:V V and A*:V V that satisfy the following conditions: (i) each of A,A* is diagonalizable; (ii) there exists an ordering Vii=0d of the eigenspaces of A such that A* Vi ⊂eq Vi-1 + Vi + Vi+1 for 0 ≤ i ≤ d, where V-1=0 and Vd+1=0; (iii) there exists an ordering V*ii=0δ of the eigenspaces of A* such that A V*i ⊂eq V*i-1 + V*i + V*i+1 for 0 ≤ i ≤ δ, where V*-1=0 and V*δ+1=0; (iv) there is no subspace W of V such that AW ⊂eq W, A* W ⊂eq W, W ≠ 0, W ≠ V. We call such a pair a tridiagonal pair on V. It is known that d=δ and for 0 ≤ i ≤ d the dimensions of Vi,Vd-i,V*i, V*d-i coincide. The pair A,A* is called sharp whenever dim V0=1. It is known that if F is algebraically closed then A,A* is sharp. In this paper we classify up to isomorphism the sharp tridiagonal pairs. As a corollary, we classify up to isomorphism the tridiagonal pairs over an algebraically closed field. We obtain these classifications by proving the μ-conjecture.