Toward explicit Hilbert series of quasi-invariant polynomials in characteristic p and q-deformed quasi-invariants

Abstract

We study the spaces Qm of m-quasi-invariant polynomials of the symmetric group Sn in characteristic p. Using the representation theory of the symmetric group we describe the Hilbert series of Qm for n=3, proving a conjecture of Ren and Xu [arXiv:1907.13417]. From this we may deduce the palindromicity and highest term of the Hilbert polynomial and the freeness of Qm as a module over the ring of symmetric polynomials, which are conjectured for general n. We also prove further results in the case n=3 that allow us to compute values of m,p for which Qm has a different Hilbert series over characteristic 0 and characteristic p, and what the degrees of the generators of Qm are in such cases. We also extend various results to the spaces Qm,q of q-deformed m-quasi-invariants and prove a sufficient condition for the Hilbert series of Qm,q to differ from the Hilbert series of Qm.