Generalized coinvariant algebras for \(G(r,1,n)\) in the Stanley-Reisner setting
The electronic journal of combinatorics, Tome 26 (2019) no. 3
Let $r$ and $n$ be positive integers, let $G_n$ be the complex reflection group of $n \times n$ monomial matrices whose entries are $r^{\textrm{th}}$ roots of unity and let $0 \leq k \leq n$ be an integer. Recently, Haglund, Rhoades and Shimozono ($r=1$) and Chan and Rhoades ($r>1$) introduced quotients $R_{n,k}$ (for $r>1$) and $S_{n,k}$ (for $r \geq 1$) of the polynomial ring $\mathbb{C}[x_1,\ldots,x_n]$ in $n$ variables, which for $k=n$ reduce to the classical coinvariant algebra attached to $G_n$. When $n=k$ and $r=1$, Garsia and Stanton exhibited a quotient of $\mathbb{C}[\mathbf{y}_S]$ isomorphic to the coinvariant algebra, where $\mathbb{C}[\mathbf{y}_S]$ is the polynomial ring in $2^n-1$ variables whose variables are indexed by nonempty subsets $S \subseteq [n]$. In this paper, we will define analogous quotients that are isomorphic to $R_{n,k}$ and $S_{n,k}$.
DOI :
10.37236/8109
Classification :
05E05
Mots-clés : ordered set partition, coinvariant algebra, symmetric function
Mots-clés : ordered set partition, coinvariant algebra, symmetric function
Affiliations des auteurs :
Daniël Kroes 1
@article{10_37236_8109,
author = {Dani\"el Kroes},
title = {Generalized coinvariant algebras for {\(G(r,1,n)\)} in the {Stanley-Reisner} setting},
journal = {The electronic journal of combinatorics},
year = {2019},
volume = {26},
number = {3},
doi = {10.37236/8109},
zbl = {1416.05288},
url = {http://geodesic.mathdoc.fr/articles/10.37236/8109/}
}
Daniël Kroes. Generalized coinvariant algebras for \(G(r,1,n)\) in the Stanley-Reisner setting. The electronic journal of combinatorics, Tome 26 (2019) no. 3. doi: 10.37236/8109
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