Indecomposable summands of Foulkes modules

Eugenio Giannelli; Mark Wildon

doi:10.1016/j.jpaa.2016.01.013

Indecomposable summands of Foulkes modules

Eugenio Giannelli, Mark Wildon

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Abstract

In this paper we study the modular structure of the permutation module H(2n) of the symmetric group S2n acting on set partitions of a set of size 2n into n sets each of size 2, defined over a field of odd characteristic p. In particular we characterise the vertices of the indecomposable summands of H(2n) and fully describe all of its indecomposable summands that lie in blocks of p-weight at most two. When 2n<3p we show that there is a unique summand of H(2n) in the principal block of S2n and that this summand exhibits many of the extensions between simple modules in its block.

Original language	English
Pages (from-to)	2969–2984
Number of pages	16
Journal	Journal of Pure and Applied Algebra
Volume	220
Issue number	8
Early online date	15 Feb 2016
DOIs	https://doi.org/10.1016/j.jpaa.2016.01.013
Publication status	Published - Aug 2016

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10.1016/j.jpaa.2016.01.013

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http://www.sciencedirect.com/science/article/pii/S0022404916000220

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abstract = "In this paper we study the modular structure of the permutation module H(2n) of the symmetric group S2n acting on set partitions of a set of size 2n into n sets each of size 2, defined over a field of odd characteristic p. In particular we characterise the vertices of the indecomposable summands of H(2n) and fully describe all of its indecomposable summands that lie in blocks of p-weight at most two. When 2n<3p we show that there is a unique summand of H(2n) in the principal block of S2n and that this summand exhibits many of the extensions between simple modules in its block.",

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AU - Wildon, Mark

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AB - In this paper we study the modular structure of the permutation module H(2n) of the symmetric group S2n acting on set partitions of a set of size 2n into n sets each of size 2, defined over a field of odd characteristic p. In particular we characterise the vertices of the indecomposable summands of H(2n) and fully describe all of its indecomposable summands that lie in blocks of p-weight at most two. When 2n<3p we show that there is a unique summand of H(2n) in the principal block of S2n and that this summand exhibits many of the extensions between simple modules in its block.

UR - http://arxiv.org/abs/1508.05498

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DO - 10.1016/j.jpaa.2016.01.013

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JF - Journal of Pure and Applied Algebra

IS - 8

ER -

Indecomposable summands of Foulkes modules

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