# Relative $B$-groups

**Authors:** Serge Bouc

arXiv: 1903.07151 · 2019-03-19

## TL;DR

This paper generalizes the concept of B-groups to a relative setting, describing the structure of ideals in a shifted Burnside functor and analyzing their simple subquotients, especially over p-groups.

## Contribution

It introduces the notion of B_K-groups, characterizes the largest quotient B_K-group for any finite group over K, and fully describes the ideal lattice of the associated Green functor, particularly for p-groups.

## Key findings

- The lattice of ideals of the shifted Burnside functor is described in terms of B_K-groups.
- Every finite group over K admits a largest quotient B_K-group.
- The ideal lattice of the functor restricted to p-groups is finite and explicitly characterized.

## Abstract

This paper extends the notion of $B$-group to a relative context. For a finite group $K$ and a field $\mathbb{F}$ of characteristic 0, the lattice of ideals of the Green biset functor $\mathbb{F}B_K$ obtained by shifting the Burnside functor $\mathbb{F}B$ by $K$ is described in terms of {\em $B_K$-groups}. It is shown that any finite group $(L,\varphi)$ over $K$ admits a {\em largest quotient $B_K$-group} $\beta_K(L,\varphi)$. The simple subquotients of $\mathbb{F}B_K$ are parametrized by $B_K$-groups, and their evaluations can be precisely determined. Finally, when $p$ is a prime, the restriction $\mathbb{F}B_K^{(p)}$ of $\mathbb{F}B_K$ to finite $p$-groups is considered, and the structure of the lattice of ideals of the Green functor $\mathbb{F}B_K^{(p)}$ is described in full detail. In particular, it is shown that this lattice is always finite.

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Source: https://tomesphere.com/paper/1903.07151