Littlewood Complexes for Symmetric Groups

Abstract

We construct a complex Lλ resolving the irreducible representations Sλ[n] of the symmetric groups Sn by representations restricted from GLn(k). This construction lifts to Rep(S∞), where it yields injective resolutions of simple objects. It categorifies stable Specht polynomials, and allows us to understand evaluations of these polynomials for all n.