On Harish-Chandra modules of the Lie algebra arising from the 2-Dimensional Torus

Abstract

Let A=C[t11,t21] be the algebra of Laurent polynomials in two variables and B be the set of skew derivations of A. Let L be the universal central extension of the derived Lie subalgebra of the Lie algebra A B. Set L=L d1 d2, where d1, d2 are two degree derivations. A Harish-Chandra module is defined as an irreducible weight module with finite dimensional weight spaces. In this paper, we prove that a Harish-Chandra module of the Lie algebra L is a uniformly bounded module or a generalized highest weight (GHW for short) module. Furthermore, we prove that the nonzero level Harish-Chandra modules of L are GHW modules. Finally, we classify all the GHW Harish-Chandra modules of L.