Generalized polynomial functors

Abstract

We define Schur categories, d C, associated to a -linear category C, over a commutative ring . The corresponding representation categories, rep\, d C, generalize categories of strict polynomial functors. Given a -superalgebra A, we show that for certain categories V = VA, EA of A-supermodules, there is a Morita equivalence between rep\, dV and the category of supermodules over a generalized Schur superalgebra of the form SA(m|n,d) and SA(n,d), respectively. We also describe a formulation of generalized Schur-Weyl duality from the viewpoint of the category rep\, d EA.