Relative Free Splitting Complexes II: Stable Translation Lengths and the Two Over All Theorem

Abstract

This is the second of a three part study of relative free splitting complexes FS(; A), known from Part~I to be Gromov hyperbolic. Here and in~Part III we focus on stable translation lengths τφ 0 of the simplicial isometries of FS(; A) induced by relative outer automorphisms φ ∈ Out(; A), stating and proving quantitative generalizations of earlier theorems for Out(Fn). The main technical result proved here in Part~II is the Two Over All Theorem, which expresses a uniform exponential flaring property along arbitrary Stallings fold paths in FS(; A), a new result even for Out(Fn). We give two applications of this theorem. First, the natural map from the relative outer space O(; A) to the relative free splitting complex FS(; A) is coarsely Lipschitz, with respect to the log-Lipschitz semimetric on~ O(; A). Second, if φ ∈ Out(; A) has a filling attracting lamination with expansion factor λ>1 then the stable translation length of φ acting on FS(; A) has an upper bound of the form~B (λ).

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