English

Writing representations over minimal fields

Representation Theory 2016-08-18 v1

Abstract

The chief aim of this paper is to describe a procedure which, given a dd-dimensional absolutely irreducible matrix representation of a finite group over a finite field E\mathbb{E}, produces an equivalent representation such that all matrix entries lie in a subfield F\mathbb{F} of E\mathbb{E} which is as small as possible. The algorithm relies on a matrix version of Hilbert's Theorem 90, and is probabilistic with expected running time O(E:Fd3){\rm O}(|\mathbb{E}:\mathbb{F}|d^3) when F|\mathbb{F}| is bounded. Using similar methods we then describe an algorithm which takes as input a prime number and a power-conjugate presentation for a finite soluble group, and as output produces a full set of absolutely irreducible representations of the group over fields whose characteristic is the specified prime, each representation being written over its minimal field.

Keywords

Cite

@article{arxiv.1405.7236,
  title  = {Writing representations over minimal fields},
  author = {S. P. Glasby and R. B. Howlett},
  journal= {arXiv preprint arXiv:1405.7236},
  year   = {2016}
}

Comments

9 pages

R2 v1 2026-06-22T04:25:08.733Z