On the geometry of the free factor graph for Aut(FN)
Abstract
Let be a pseudo-Anosov diffeomorphism of a compact (possibly non-orientable) surface with one boundary component. We show that if b ∈ π1() is the boundary word, φ ∈ Aut(π1()) is a representative of fixing b, and adb denotes conjugation by b, then the orbits of φ, adb 2 in the graph of free factors of π1() are quasi-isometrically embedded. It follows that for N ≥ 2 the free factor graph for Aut(FN) is not hyperbolic, in contrast to the Out(FN) case.
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