Type VF for outer automorphism groups of large-type Artin groups
Abstract
Given a connected large-type Artin group A, we introduce a deformation space D. If is triangle-free, or has all labels at least 6, we show that this space is canonical, in that it depends only on the isomorphism type of A, and admits an (A)-action. Using this action we conclude that (A) is of type VF, which implies (A) finitely presentable. We emphasise that our proof can handle cases where has separating vertices, which were previously problematic. In fact, our proof works for all connected large-type Artin groups satisfying the technical condition of having rigid chunks. We conjecture that all connected large-type Artin groups have rigid chunks, and therefore outer automorphism groups of type VF.
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