Syzygies of Determinantal Thickenings

Abstract

Let S = C[xi,j] be the ring of polynomial functions on the space of m × n matrices, and consider the action of the group GL = GLm × GLn via row and column operations on the matrix entries. It is proven by Raicu and Weyman that for a GL-invariant ideal I ⊂eq S, the linear strands of its minimal free resolution translates via the BGG correspondence to modules over the general linear Lie superalgebra gl(m|n). When I=Iλ is the ideal generated by the GL-orbit of a highest weight vector of weight λ, they gave a conjectural description of the classes of these gl(m|n)-modules in the Grothendieck group. We prove their conjecture here. We also give a algorithmic description of how to get the classes of these gl(m|n)-modules for any GL-invariant ideal I ⊂eq S.