An upper bound for the representation dimension of group algebras with an elementary abelian Sylow p-subgroup
Abstract
Linckelmann showed in 2011 that a group algebra is separably equivalent to the group algebra of its Sylow p-subgroups. In this article we use this relationship, together with Mackey decomposition, to demonstrate that a group algebra of a group with an elementary abelian Sylow p-subgroup P, has representation dimension at most |P|.
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