Timothy Susse
Published 2013-10-08, updated 2014-05-12Version 3
We show that stable commutator length is rational on free products of free Abelian groups amalgamated over $\mathbb{Z}^k$, a class of groups containing the fundamental groups of all torus knot complements. We consider a geometric model for these groups and parameterize all surfaces with specified boundary mapping to this space. Using this work we provide a topological algorithm to compute stable commutator length in these groups. Further, we use the methods developed to show that in free products of cyclic groups the stable commutator length of a fixed varies quasirationally in the orders of the free factors.
Comments: 28 pages, 5 figures. Corrected typographical errors, changed exposition, added new results on quasirationality
Isometric endomorphisms of free groups
Stable commutator length in Baumslag-Solitar groups and quasimorphisms for tree actions
C$^*$-simple groups: amalgamated free products, HNN extensions, and fundamental groups of 3-manifolds
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