Rook placements and orbit harmonics
Abstract
For fixed positive integers n,m, let Matn× m(C) be the affine space consisting of all n× m complex matrices, and let C[xn× m] be its coordinate ring. For 0 r\m,n\, we apply the orbit harmonics method to the finite matrix loci Zn,m,r of rook placements with exactly r rooks, yielding a graded Sn×Sm-module R(Zn,m,r). We find one signed and two sign-free graded character formulae for R(Zn,m,r). We also exhibit some applications of these formulae, such as proving a concise presentation of R(Zn,m,r), and proving some module injections and isomorphisms. Some of our techniques are still valid for involution matrix loci.
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