Matthew C. B. Zaremsky
Published 2014-03-31, updated 2018-01-31Version 2
We inspect the normal subgroup structure of the braided Thompson groups Vbr and Fbr. We prove that every proper normal subgroup of Vbr lies in the kernel of the natural quotient Vbr \onto V, and we exhibit some families of interesting such normal subgroups. For Fbr, we prove that for any normal subgroup N of Fbr, either N is contained in the kernel of Fbr \onto F, or else N contains [Fbr,Fbr]. We also compute the Bieri-Neumann-Strebel invariant Sigma^1(Fbr), which is a useful tool for understanding normal subgroups containing the commutator subgroup.
Comments: 21 pages, 6 figures. v2: accepted version, to appear in Groups, Geometry & Dynamics
Alexander and Thurston norms, and the Bieri-Neumann-Strebel invariants for free-by-cyclic groups
Elements generating a proper normal subgroup of the Cremona group
On the $Σ$-invariants of wreath products
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