Descent Representations of Generalized Coinvariant Algebras

Abstract: The coinvariant algebra $R_n$ is a well-studied $\mathfrak{S}n$-module that is a graded version of the regular representation of $\mathfrak{S}_n$. Using a straightening algorithm on monomials and the Garsia-Stanton basis, Adin, Brenti, and Roichman gave a description of the Frobenius image of $R_n$, graded by partitions, in terms of descents of standard Young tableaux. Motivated by the Delta Conjecture of Macdonald polynomials, Haglund, Rhoades, and Shimozono gave an extension of the coinvariant algebra $R{n,k}$ and an extension of the Garsia-Stanton basis. Chan and Rhoades further extend these results from $\mathfrak{S}n$ to the complex reflection group $G(r,1,n)$ by defining a $G(r,1,n)$ module $S{n,k}$ that generalizes the coinvariant algebra for $G(r,1,n)$. We extend the results of Adin, Brenti, and Roichman to $R_{n,k}$ and $S_{n,k}$.