Specht modules decompose as alternating sums of restrictions of Schur modules

Abstract

Schur modules give the irreducible polynomial representations of the general linear group GLt. Viewing the symmetric group St as a subgroup of GLt, we may restrict Schur modules to St and decompose the result into a direct sum of Specht modules, the irreducible representations of St. We give an equivariant M\"obius inversion formula that we use to invert this expansion in the representation ring for St for t large. In addition to explicit formulas in terms of plethysms, we show the coefficients that appear alternate in sign by degree. In particular, this allows us to define a new basis of symmetric functions whose structure constants are stable Kronecker coefficients and which expand with alternating signs into the Schur basis.