Positive combinatorial formulae for involution matrix loci and orbit harmonics

Abstract

Let Mn,a be the set consisting of involutions in symmetric group Sn with exactly a fixed points and apply the orbit harmonics method to obtain a graded Sn-module R(Mn,a). Liu, Ma, Rhoades, and Zhu figured out a signed combinatorial formula for the graded Frobenius image grFrob(R(Mn,a);q) of R(Mn,a). Our goal is to cancel these signs. Finally, we find two positive combinatorial formulae for grFrob(R(Mn,a);q). As an application, we deduce a series of Sn-equivariant isomorphisms between graded components R(Mn,a)d and R(Mn,a)d for some integers a≠ a and d. Our positive formulae also yield potential attempts to find a linear basis for R(Mn,a) and a statistic stat:Mn,a→Z0 to interpret the Hilbert series Hilb(R(Mn,a);q) of R(Mn,a).