Boundary of the Relative Outer Space
Abstract
Let A = A1, ..., Ak be a system of free factors of Fn. The group of relative automorphisms Aut(Fn; A) is the group given by the automorphisms of Fn that restricted to each Ai are conjugations by elements in Fn. The group of relative outer automorphisms is defined as Out(Fn; A) = Aut(Fn; A) / Inn(Fn), where Inn (Fn) is the normal subgroup of Aut(Fn) given by all the inner automorphisms. This group acts on the relative outer space CVn(A). We prove that the dimension of the boundary of the relative outer space is dim(CVn(A))-1.
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