Daniel Matei, Alexander I. Suciu
Published 2004-05-07, updated 2005-01-23Version 3
We present a method for computing the number of epimorphisms from a finitely-presented group G to a finite solvable group \Gamma, which generalizes a formula of G\"aschutz. Key to this approach are the degree 1 and 2 cohomology groups of G, with certain twisted coefficients. As an application, we count low-index subgroups of G. We also investigate the finite solvable quotients of the Baumslag-Solitar groups, the Baumslag parafree groups, and the Artin braid groups.
Comments: 30 pages; accepted for publication in the Journal of Algebra
Journal: Journal of Algebra 286 (2005), 161-186
A Gathering Process in Artin Braid Groups
Hall invariants, homology of subgroups, and characteristic varieties
Fitting height and lengths of laws in finite solvable groups
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