Hilbert Series of S3-Quasi-Invariant Polynomials in Characteristics 2, 3
Abstract
We compute the Hilbert series of the space of n=3 variable quasi-invariant polynomials in characteristic 2 and 3, capturing the dimension of the homogeneous components of the space, and explicitly describe the generators in the characteristic 2 case. In doing so we extend the work of the first author in 2023 on quasi-invariant polynomials in characteristic p>n and prove that a sufficient condition found by Ren-Xu in 2020 on when the Hilbert series differs between characteristic 0 and p is also necessary for n=3, p=2,3. This is the first description of quasi-invariant polynomials in the case, where the space forms a modular representation over the symmetric group, bringing us closer to describing the quasi-invariant polynomials in all characteristics and numbers of variables.
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