Gruson-Serganova character formulas and the Duflo-Serganova cohomology functor

Abstract

We establish an explicit formula for the character of an irreducible finite-dimensional representation of gl(m|n). The formula is a finite sum with integer coefficients in terms of a basis Eμ (Euler characters) of the character ring. We prove a simple formula for the behaviour of the ``superversion'' of Eμ in the gl(m|n) and osp(m|2n)-case under the map ds on the supercharacter ring induced by the Duflo-Serganova cohomology functor DS. As an application we get combinatorial formulas for superdimensions, dimensions and g0-decompositions for gl(m|n) and osp(m|2n).