Suppose that $G$ is a finite group such that $\operatorname{SL}(n,q)\subseteq
G \subseteq \operatorname{GL}(n,q)$, and that $Z$ is a central subgroup of $G$.
Let $T(G/Z)$ be the abelian group of equivalence classes of endotrivial
$k(G/Z)$-modules, where $k$ is an algebraically closed field of
characteristic~$p$ not dividing $q$. We show that the torsion free rank of
$T(G/Z)$ is at most one, and we determine $T(G/Z)$ in the case that the Sylow
$p$-subgroup of $G$ is abelian and nontrivial. The proofs for the torsion
subgroup of $T(G/Z)$ use the theory of Young modules for
$\operatorname{GL}(n,q)$ and a new method due to Balmer for computing the
kernel of restrictions in the group of endotrivial modules

Carlson, Jon F.

Mazza, Nadia

Nakano, Daniel K.

English

arXiv

Jon F. Carlson

Nadia Mazza

Daniel K. Nakano

Crossref

Mathematische Zeitschrift

Endotrivial modules for the general linear group in a nondefining characteristic

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ENDOTRIVIAL MODULES FOR THE GENERAL LINEAR  Group In   A Nondefining Characteristic

Suppose that $G$ is a finite group such that $\SL(n,q)\subseteq G \subseteq \GL(n,q)$, and that $Z$ is a central subgroup of $G$. Let $T(G/Z)$ be the abelian group of equivalence classes of endotrivial $k(G/Z)$-modules, where $k$ is an algebraically closed field of characteristic~$p$ not dividing $q$. We show that the torsion free rank of $T(G/Z)$ is at most one, and we determine $T(G/Z)$ in the case that the Sylow $p$-subgroup of $G$ is abelian and nontrivial. The proofs for the torsion subgroup of $T(G/Z)$ use the theory of Young modules for $\GL(n,q)$ and a new method due to Balmer for computing the kernel of restrictions in the group of endotrivial modules

Carlson, Jon

Nakano, Daniel

Lancaster E-Prints

Endotrivial Modules for the General Linear Group in a Nondefining
  Characteristic

Endotrivial Modules for the General Linear Group in a Nondefining Characteristic

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CiteSeerX

Lancaster E-Prints