Constructing $G$-algebras

Kevin De Laet

arXiv:1605.09265·math.RA·May 31, 2016

Constructing $G$-algebras

Kevin De Laet

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TL;DR

This paper introduces $G$-algebras, a class of graded algebras with a reductive group action, and constructs associated projective varieties, applying the theory specifically to permutation representations of symmetric groups.

Contribution

It defines $G$-algebras and develops a method to construct projective varieties parametrizing their structures, especially for permutation representations of symmetric groups.

Findings

01

Construction of projective varieties $ extbf{V}_k$ for $G$-algebras.

02

Application to permutation representations of $S_{n+1}$.

03

Framework for classifying graded algebras with group actions.

Abstract

In this article we define $G$ -algebras, that is, graded algebras on which a reductive group $G$ acts as gradation preserving automorphisms. Starting from a finite dimensional $G$ -module $V$ and the polynomial ring $C [V]$ , it is shown how one constructs a sequence of projective varieties $V_{k}$ such that each point of $V_{k}$ corresponds to a graded algebra with the same decomposition up to degree $k$ as a $G$ -module. After some general theory, we apply this to the case that $V$ is the $n + 1$ -dimensional permutation representation of $S_{n + 1}$ , the permutation group on $n + 1$ letters.

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Taxonomy

TopicsAdvanced Topics in Algebra · Algebraic structures and combinatorial models · Finite Group Theory Research