A proof of the Fields Conjectures
Abstract
The superspace ring of rank n is the algebra n of differential forms on affine n-space. The algebra n is bigraded with respect to polynomial and exterior degree and carries a natural action of the symmetric group Sn. Modding out by Sn-invariants with vanishing constant term yields the superspace coinvariant ring SRn. We prove that, as an ungraded Sn-module, the space SRn is isomorphic to the sign-twisted permutation action of Sn on ordered set partitions of \1,…,n\. We refine this result by calculating the bigraded Sn-isomorphism type of SRn. This proves the Fields Conjectures of N. Bergeron, L. Colmenarejo, S.-X. Li, J. Machacek, R. Sulzgruber, and M. Zabrocki as well as a related conjecture of V. Reiner.
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