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ON $p$-GROUPS WITH AUTOMORPHISM GROUPS RELATED TO THE CHEVALLEY GROUP $G_{2}(p)$

Part of: Representation theory of groups Linear algebraic groups and related topics

Published online by Cambridge University Press:  08 January 2020

JOHN BAMBERG Open the ORCID record for JOHN BAMBERG [Opens in a new window] ,
SAUL D. FREEDMAN Open the ORCID record for SAUL D. FREEDMAN [Opens in a new window]  and
LUKE MORGAN
JOHN BAMBERG
Affiliation:
Centre for the Mathematics of Symmetry and Computation, The University of Western Australia, 35 Stirling Highway, Crawley, WA6009, Australia email [email protected]
SAUL D. FREEDMAN*
Affiliation:
Centre for the Mathematics of Symmetry and Computation, The University of Western Australia, 35 Stirling Highway, Crawley, WA6009, Australia email [email protected]
LUKE MORGAN
Affiliation:
Centre for the Mathematics of Symmetry and Computation, The University of Western Australia, 35 Stirling Highway, Crawley, WA6009, Australia email [email protected]
*
email [email protected]
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Abstract

Let $p$ be an odd prime. We construct a $p$-group $P$ of nilpotency class two, rank seven and exponent $p$, such that $\text{Aut}(P)$ induces $N_{\text{GL}(7,p)}(G_{2}(p))=Z(\text{GL}(7,p))G_{2}(p)$ on the Frattini quotient $P/\unicode[STIX]{x1D6F7}(P)$. The constructed group $P$ is the smallest $p$-group with these properties, having order $p^{14}$, and when $p=3$ our construction gives two nonisomorphic $p$-groups. To show that $P$ satisfies the specified properties, we study the action of $G_{2}(q)$ on the octonion algebra over $\mathbb{F}_{q}$, for each power $q$ of $p$, and explore the reducibility of the exterior square of each irreducible seven-dimensional $\mathbb{F}_{q}[G_{2}(q)]$-module.

Keywords

p-groupexterior squareG2(q)

MSC classification

Primary: 20C33: Representations of finite groups of Lie type
Secondary: 20G15: Linear algebraic groups over arbitrary fields 20D15: Nilpotent groups, $p$-groups
Type
Research Article
Information
Journal of the Australian Mathematical Society , Volume 108 , Issue 3 , June 2020 , pp. 321 - 331
Copyright
© 2020 Australian Mathematical Publishing Association Inc.

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Footnotes

The first author acknowledges the support of the Australian Research Council Future Fellowship FT120100036. The second author was supported by a Hackett Foundation Alumni Honours Scholarship, a Hackett Postgraduate Research Scholarship, and an Australian Government Research Training Program Scholarship at The University of Western Australia. The third author was supported by the Australian Research Council grant DE160100081.

Current address: School of Mathematics and Statistics, University of St Andrews, St Andrews KY16 9SS, UK.

Current address: UP FAMNIT, University of Primorska, Glagoljaška 8, 6000 Koper, Slovenia. Also affiliated with: UP IAM, University of Primorska, Muzejski trg 2, 6000 Koper, Slovenia.

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