Complexity for Modules Over the Classical Lie Superalgebra gl(m|n)

Abstract

Let g=g0 g1 be a classical Lie superalgebra and F be the category of finite dimensional g-supermodules which are completely reducible over the reductive Lie algebra g0. In an earlier paper the authors demonstrated that for any module M in F the rate of growth of the minimal projective resolution (i.e., the complexity of M) is bounded by the dimension of g1. In this paper we compute the complexity of the simple modules and the Kac modules for the Lie superalgebra gl(m|n). In both cases we show that the complexity is related to the atypicality of the block containing the module.