Outer space for untwisted automorphisms of right-angled Artin groups
Abstract
For a right-angled Artin group A, the untwisted outer automorphism group U(A) is the subgroup of Out(A) generated by all of the Laurence-Servatius generators except twists (where a twist is an automorphisms of the form v vw with vw=wv). We define a space on which U(A) acts properly and prove that is contractible, providing a geometric model for U(A) and its subgroups. We also propose a geometric model for all of Out(A) defined by allowing more general markings and metrics on points of .
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