A proof of the Lewis-Reiner-Stanton conjecture for the Borel subgroup
Abstract
For each parabolic subgroup P of the general linear group GLn(Fq), a conjecture due to Lewis, Reiner and Stanton LewisReinerStanton2017 predicts a formula for the Hilbert series of the space of invariants Qm(n)P where Qm(n) is the quotient ring Fq[x1,…,xn]/(x1qm,…,xnqm). In this paper, we prove the conjecture for the Borel subgroup B by constructing a linear basis for mathcalQm(n)B. The construction is based on an operator δ which produces new invariants from old invariants of lower ranks. We also upgrade the conjecture of Lewis, Reiner and Stanton by proposing an explicit basis for the space of invariants for each parabolic subgroup.
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