Block fusion systems of the alternating groups
classification
🧮 math.GR
math.RT
keywords
groupalternatingfusionblockconditionelementringsystem
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We describe a purely group-theoretic condition on an element g of a finite group G which implies that g has coefficient zero in every central idempotent element of the group ring RG, provided that R is a ring of prime characteristic. We use this condition to prove that the fusion system associated to a block of an alternating group is always isomorphic to the group fusion system of an alternating group.
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