Endotrivial modules for finite groups via homotopy theory

Grodal, Jesper

doi:10.1090/jams/994

Cited by 7 publications

(4 citation statements)

References 102 publications

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“…, but this is not the general case and although recent work of Grodal [38] using homotopy theory brought many answers towards the structure of T tors k (G) its structure is still an open question in general. (c) If P is neither cyclic, nor generalised quaternion, nor semi-dihedral, then…”

Section: Endo-trivial Modules Over Arbitrary Finite Groupsmentioning

confidence: 99%

A Tour of $p$-Permutation Modules and Related Classes of Modules

Lassueur¹

2023

Jahresber. Dtsch. Math. Ver.

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This survey provides an overview of numerous results on $p$ p -permutation modules and the closely related classes of endo-trivial, endo-permutation and endo-$p$ p -permutation modules. These classes of modules play an important role in the representation theory of finite groups. For example, they are important building blocks used to understand and parametrise several kinds of categorical equivalences between blocks of finite group algebras. For this reason, there has been, since the late 1990’s, much interest in classifying such modules. The aim of this manuscript is to review classical results as well as all the major recent advances in the area. The first part of this survey serves as an introduction to the topic for non-experts in modular representation theory of finite groups, outlining proof ideas of the most important results at the foundations of the theory. Simultaneously, the connections between the aforementioned classes of modules are emphasised. In this respect, results, which are dispersed in the literature, are brought together, and emphasis is put on common properties and the role played by the $p$ p -permutation modules throughout the theory. Finally, in the last part of the manuscript, lifting results from positive characteristic to characteristic zero are collected and their proofs sketched.

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Section: Endo-trivial Modules Over Arbitrary Finite Groupsmentioning

confidence: 99%

A Tour of $p$-Permutation Modules and Related Classes of Modules

Lassueur¹

2023

Jahresber. Dtsch. Math. Ver.

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“…We first recall some definitions on categories with a group action. We follow the terminology and notation introduced by Grodal in [13] and [14]. Let G be a discrete group.…”

Section: G-categoriesmentioning

confidence: 99%

Higher limits over the fusion orbit category

Yalcin

2022

Advances in Mathematics

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“…This complex was first studied by Brown in [Bro74], [Bro76]. That the quotient space |S p (G)|/G is contractible was first proven by Symonds [Sym98] and an alternative proof was given later by Grodal in [Gro23].…”

Section: Introductionmentioning

confidence: 99%

Factors affecting Green Purchase Intention, Case of Lebanon

Dennaoui¹,

Vrontis²,

Nemar³

et al. 2024

IJBG

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Recently, Steinberg used discrete Morse theory to give a new proof of a theorem of Symonds that the orbit space of the poset of nontrivial p-subgroups of a finite group is contractible. We extend Steinberg's argument in two ways, covering more general versions of the theorem that were already known. In particular, following a strategy of Libman, we give a discrete Morse theoretic argument for the contractibility of the orbit space of a saturated fusion system.

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Endotrivial modules for finite groups via homotopy theory

Cited by 7 publications

References 102 publications

A Tour of $p$-Permutation Modules and Related Classes of Modules

A Tour of $p$-Permutation Modules and Related Classes of Modules

Higher limits over the fusion orbit category

Factors affecting Green Purchase Intention, Case of Lebanon

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