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On the ordinary quiver of the symmetric group over a field of characteristic 2

Published online by Cambridge University Press:  01 November 1997

STUART MARTIN
Affiliation:
Magdalene College, Cambridge, CB3 0AG
LEE RUSSELL
Affiliation:
Pembroke College, Cambridge CB2 1RF

Abstract

Let [Sfr ]n and [Afr ]n denote the symmetric and alternating groups of degree n∈ℕ respectively. Let p be a prime number and let F be an arbitrary field of characteristic p. We say that a partition of n is p-regular if no p (non-zero) parts of it are equal; otherwise we call it p-singular. Let SλF denote the Specht module corresponding to λ. For λ a p-regular partition of n let DλF denote the unique irreducible top factor of SλF. Denote by ΔλF=DλF[Afr ]n its restriction to [Afr ]n. Recall also that, over F, the ordinary quiver of the modular group algebra FG is a finite directed graph defined as follows: the vertices are labelled by the set of all simple FG-modules, L1, ..., Lr, and the number of arrows from Li to Lj equals dimFExtFG(Li, Lj). The quiver gives important information about the block structure of G.

Type
Research Article
Copyright
Cambridge Philosophical Society 1997

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