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Alperin-Brauer-Gorenstein theorem - Wikipedia, the free encyclopedia

Alperin-Brauer-Gorenstein theorem

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In mathematics, the Alperin--Brauer--Gorenstein theorem states that a finite simple group with quasidihedral or wreathed Sylow 2-subgroups is isomorphic with a three-dimensional projective special linear or projective special unitary group over a finite field of odd order, or the Mathieu group $M 11$ .

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Retrieved from "http://en.wikipedia.org../../../a/l/p/Alperin-Brauer-Gorenstein_theorem_d18d.html"

Categories: Finite groups | Mathematical theorems | Algebra stubs

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