Invariant theory for wreath products acting on superpolynomials
Abstract
This paper considers a finite group G acting linearly on the variables V of a polynomial algebra, or an exterior algebra, or superpolynomial algebra with both commuting and anticommuting variables. In this setting, the Hilbert series for the G-invariant subalgebra turns out to determine the analogous Hilbert series for the wreath product P[G] acting on Vn for any permutation group P inside the symmetric group Sn on n letters. This leads to a structural result: one can collate the direct sum for all n of the Sn[G]-invariant subalgebras to form a graded ring via an external shuffle product, whose structure turns out to be a superpolynomial algebra generated by the G-invariants. A parallel statement holds for the direct sum of all Sn[G]-antiinvariants, which forms a graded ring via an external signed shuffle product, isomorphic to the superexterior algebra generated by the G-invariants.
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