Extensions for Generalized Current Algebras

Abstract

Given a complex semisimple Lie algebra g and a commutative C-algebra A, let g[A] = g A be the corresponding generalized current algebra. In this paper we explore questions involving the computation and finite-dimensionality of extension groups for finite-dimensional g[A]-modules. Formulas for computing Ext1 and Ext2 between simple g[A]-modules are presented. As an application of these methods and of the use of the first cyclic homology, we completely describe Ext2 g[t](L1,L2) for g=sl2 when L1 and L2 are simple g[t]-modules that are each given by the tensor product of two evaluation modules.