# Central elements of the Jennings basis and certain Morita invariants

**Authors:** Taro Sakurai (Chiba University)

arXiv: 1701.03799 · 2020-08-11

## TL;DR

This paper investigates Morita invariants related to the intersection of the center and socle layers of finite-dimensional algebras, with a focus on group algebras of p-groups and the Jennings basis.

## Contribution

It proves that the intersection of the center and the nth socle is a Morita invariant and analyzes the structure of this intersection for group algebras of powerful p-groups.

## Key findings

- The intersection of the center and the nth socle is a Morita invariant.
- Certain Jennings basis elements are central in group algebras of powerful p-groups.
- The socle of the group algebra is contained in the center for powerful p-groups.

## Abstract

From Morita theoretic viewpoint, computing Morita invariants is important. We prove that the intersection of the center and the $n$th (right) socle $ZS^n(A) := Z(A) \cap \operatorname{Soc}^n(A)$ of a finite-dimensional algebra $A$ is a Morita invariant; This is a generalization of important Morita invariants --- the center $Z(A)$ and the Reynolds ideal $ZS^1(A)$. As an example, we also studied $ZS^n(FG)$ for the group algebra $FG$ of a finite $p$-group $G$ over a field $F$ of positive characteristic $p$. Such an algebra has a basis along the socle filtration, known as the Jennings basis. We prove certain elements of the Jennings basis are central and hence form a linearly independent set of $ZS^n(FG)$. In fact, such elements form a basis of $ZS^n(FG)$ for every integer $1 \le n \le p$ if $G$ is powerful. As a corollary we have $\operatorname{Soc}^p(FG) \subseteq Z(FG)$ if $G$ is powerful.

## Full text

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## References

18 references — full list in the complete paper: https://tomesphere.com/paper/1701.03799/full.md

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Source: https://tomesphere.com/paper/1701.03799