Cohomology of the pure symmetric automorphisms of right-angled Artin groups
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Abstract
We compute the cohomology groups of the pure symmetric outer automorphism group $\Sigma$POut$(A_\Gamma)$ and the pure symmetric automorphism group $\Sigma$PAut$(A_\Gamma)$ of a right-angled Artin group $A_\Gamma$.
Using the equivariant spectral sequence arising from the action of $\Sigma$POut$(A_\Gamma)$ on the generalized McCullough-Miller complex MM$_\Gamma$, we show that $H^q(\Sigma$POut$(A_\Gamma))$ is free abelian and we compute its rank in terms of the combinatorics of certain poset.
Applying the Lyndon-Hochschild-Serre spectral sequence and the Leray-Hirsch theorem we do the same for $H^q(\Sigma$PAut$(A_\Gamma))$.
In both cases the cohomology ring is generated in degree 1.
Finally, we introduce the Generalized Brownstein-Lee Conjecture, proposing a presentation of $H^*(\Sigma$PAut$(A_\Gamma))$, and prove that it holds in dimension $2$.