Homological shadows of attracting laminations
Abstract
Given a free group Fn, a fully irreducible automorphism f ∈ , and a generic element x ∈ Fn, the elements fk(x) converge in the appropriate sense to an object called an attracting lamination of f. When the action of f on Fn[Fn, Fn] has finite order, we introduce a homological version of this convergence, in which the attracting object is a convex polytope with rational vertices, together with a measure supported at a point with algebraic coordinates.
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