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A 2-basic set of the alternating group

In this note, we construct a 2-basic set of the alternating group \A_n. To do this, we construct a 2-basic set of the symmetric group \sym_n with an additional property, such that its restriction to \A_n is a 2-basic set. We adapt here a method developed in \cite{BrGr} for the case when the characteristic is odd. One of the main tools is the generalized perfect isometries defined by Külshammer, Olsson and Robinson in \cite{KOR}.

preprint2009arXivOpen access

Olivier Brunat Jean-Baptiste Gramain

math.RT math.GR

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Olivier Brunat Jean-Baptiste Gramain

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