Cluster Variables on Double Bruhat Cells Gu,e of Classical Groups and Monomial Realizations of Demazure Crystals

Abstract

Let G be a simply connected simple algebraic group over C, B and B- its two opposite Borel subgroups, and W the associated Weyl group. It is shown that the coordinate ring C[Gu,v] (u, v∈ W) of the double Bruhat cell Gu,v=BuB B-vB- is isomorphic to the cluster algebra A(i) C and the initial cluster variables of C[Gu,v] are the generalized minors (k;i) by Berenstein, Fomin, Zelevinsky, Goodearl and Yakimov. In the case that a classical group G is of type Br, Cr or Dr, we shall describe the non-trivial last r initial cluster variables \(k;i)\(m-2)r<k≤ (m-1)r (m is some positive integer) of the cluster algebra C[Lu,e] in terms of monomial realization of Demazure crystals, where Lu,e is the reduced double Bruhat cell of type (u,e). The relation between (k;i) on Gu,e and on Lu,e is described as well. We also present the corresponding results for type Ar though the results for all initial cluster variables have been obtained by ourselves.