Centralizers of Lie algebras associated to descending central series of certain poly-free groups

Document Type

Article

Publication Date

5-7-2007

Abstract

Poly-free groups are constructed as iterated semidirect products of free groups. The class of poly-free groups includes the classical pure braid groups, fundamental groups of fiber-type hyperplane arrangements, and certain subgroups of the automorphism groups of free groups. The purpose of this article is to compute centralizers of certain natural Lie subalgebras of the Lie algebra obtained from the descending central series of poly-free groups F including some of the geometrically interesting classes of groups mentioned above. The main results here extend the result in Cohen, F. R., and S. Prassidis: On injective homomorphisms for pure braid groups, and associated Lie algebras, J. Algebra 298 (2006), 363-370 for such groups. These results imply that a homomorphism f : Γ → G is faithful, essentially, if it is faithful when restricted to the level of Lie algebras obtained from the descending central series for the product FT × Z, where FT is the "top" free group in the semidirect products of free groups and Z is the center of Γ. The arguments use a mixture of homological, and Lie algebraic methods applied to certain choices of extensions. The limitations of these methods are illustrated using the "poison groups" of Formanek and Procesi Formanek, E., and C. Procesi: The automorphism group of a free group is not linear, J. Algebra 149 (1992), 494-499, poly-free groups whose Lie algebras do not have certain properties considered here. © 2007 Heldermann Verlag.

Publication Source (Journal or Book title)

Journal of Lie Theory

First Page

379

Last Page

397

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