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Finite Groups and Lie Rings with an Automorphism of Order 2n
Part of:
Representation theory of groups
Special aspects of infinite or finite groups
Lie algebras and Lie superalgebras
Published online by Cambridge University Press: 15 June 2016
Abstract
Suppose that a finite group G admits an automorphism of order 2n such that the fixed-point subgroup of the involution is nilpotent of class c. Let m = ) be the number of fixed points of . It is proved that G has a characteristic soluble subgroup of derived length bounded in terms of n, c whose index is bounded in terms of m, n, c. A similar result is also proved for Lie rings.
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- Copyright © Edinburgh Mathematical Society 2017