Relative Free Splitting Complexes III: Stable Translation Lengths and Filling Paths
Abstract
This is the last of a three part work about relative free splitting complexes FS(,A) and their actions by relative outer automorphism groups Out(;A). We obtain quantitative relations between the stable translation length τφ and the relative train track dynamics of~φ ∈ (;). First, if φ has an orbit with diameter bounded below by a certain constant (;A) 1 then φ has a filling attracting lamination. Also, there is a positive lower bound τφ A(;A) > 0 amongst all φ which have a filling attracting lamination. Both proofs rely on a study of filling paths in a free splitting. These results are all new even for Out(Fn).
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