Perfect Isometry Groups for Cyclic Groups of Prime Order

TL;DR

This paper characterizes the structure of the perfect isometry group for blocks of cyclic groups of prime order, showing it is generated by automorphisms and linear characters.

Contribution

It provides a complete description of the perfect isometry group for cyclic groups of prime order, revealing its generators and structure.

Findings

The perfect isometry group for $C_p$ is generated by automorphisms and linear characters.

Any self perfect isometry of $C_p$ is a composition of automorphism-induced and character multiplication.

The structure of the perfect isometry group varies from simple to complex depending on the block.

Abstract

A perfect isometry is an important relation between blocks of finite groups as many information about blocks are preserved by it. If we consider the group of all perfect isometries between a block to itself then this gives another information about the block that is also preserved by a perfect isometry. The structure of this group depends on the block and can be fairly simple or extremely complicated. In this paper we study the perfect isometry group for the block of $C_p$, the cyclic group of prime order, and completely describe the structure of this group. The result shows that any self perfect isometry for $C_p$ is essentially either induced by an element in $\mbox{Aut}(C_p)$, or obtained by multiplication by one of its linear characters, or a composition of both.