Groups of Lie type as products of SL2 subgroups

Groups of Lie type as products of SL2 subgroups

We prove that apart from the Suzuki groups, every finite simple group of Lie type of rank r over a field of q elements can be written as a product of C(r) subgroups isomorphic to SL2(q) or PSL2(q), where C(r) is a quadratic function. This has an application to the theory of expander graphs. © 2009 E...

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Detalles Bibliográficos
Main Authors:	Liebeck, M, Nikolov, N, Shalev, A
Formato:	Journal article
Publicado:	2011

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