On the 2-Betti numbers and algebraic fibring of the (outer) automorphism group of a right-angled Artin group
Abstract
We compute the first 2-Betti number of the automorphism and outer automorphism groups of arbitrary right-angled Artin groups (RAAGs), providing a complete characterization of when it is non-zero. We also analyse the algebraic fibring of the pure symmetric automorphism groups PSA(A) and PSO(A) and the virtual algebraic fibring of Out(A) in the case when A admits no non-inner partial conjugation. In the transvection-free case, we show that β1(2)(Out(A)) = 0 if and only if Out(A) virtually fibres.
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