Homological properties of invariant rings of permutation groups

Abstract

Consider the action of a subgroup G of the permutation group on the polynomial ring S := k[x1, …, xn] via permutations. We show that if k does not have characteristic two, then the following are independent of k: the a-invariant of SG, the property of SG being quasi-Gorenstein, and the Hilbert functions of Hmn(S)G as well as Hnn(SG); moreover, these Hilbert functions coincide. In particular, being independent of characteristic, they may be computed using characteristic zero techniques, such as Molien's formula. In characteristic two, we show that the ring of invariants is always quasi-Gorenstein, compute the a-invariant explicitly, and show that the Hilbert functions of Hmn(S)G and Hnn(SG) agree up to a shift, given by the number of transpositions. We determine when the inclusion SG S splits, thereby proving the Shank--Wehlau conjecture for permutation subgroups. Lastly, we determine the ring of k-linear differential operators on SG, and show that each differential operator lifts to one over Z.

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