Asymptotic Bounds for the Size of Hom(A,GL_n(q))

Abstract

Fix an arbitrary finite group A of order a, and let X(n,q) denote the set of homomorphisms from A to the finite general linear group GL_n(q). The size of X(n,q) is a polynomial in q. In this note it is shown that generically this polynomial has degree n^{2(1-a^{-1}) - \epsilon_r} and leading coefficient m_r, where \epsilon_r and m_r are constants depending only on r := n \mod a. We also present an algorithm for explicitly determining these constants.

Metadata

Item Type:	Article
Authors/Creators:	Bate, Michael https://orcid.org/0000-0002-6513-2405 Gullon, Alec
Copyright, Publisher and Additional Information:	© Glasgow Mathematical Journal Trust 2017. This is an author-produced version of the published paper. Uploaded in accordance with the publisher’s self-archiving policy. Further copying may not be permitted; contact the publisher for details.
Keywords:	Finite Groups,Counting Homomorphisms,Representation Varieties
Dates:	Published: 1 January 2018 Published (online): 14 March 2017 Accepted: 12 July 2016
Institution:	The University of York
Academic Units:	The University of York > Faculty of Sciences (York) > Mathematics (York)
Depositing User:	Pure (York)
Date Deposited:	20 Mar 2017 14:20
Last Modified:	16 Oct 2024 12:25
Published Version:	https://doi.org/10.1017/S0017089516000562
Status:	Published
Refereed:	Yes
Identification Number:	10.1017/S0017089516000562
Related URLs:	http://www.scopus.com/inward/record.url?...
Open Archives Initiative ID (OAI ID):	oai:eprints.whiterose.ac.uk:113941

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Asymptotic Bounds for the Size of Hom(A,GL_n(q))

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