Carlos Florentino, Azizeh Nozad, Jaime Silva, Alfonso Zamora
Published 2020-06-25Version 1
Let $\mathcal{X}_{\Gamma}G:=\mathrm{Hom}(\Gamma,G)/\!/G$ be the $G$-character variety of $\Gamma$, where $G$ is a complex reductive group and $\Gamma$ a finitely presented group. We introduce new techniques for computing Hodge-Deligne and Serre polynomials of $\mathcal{X}_{\Gamma}G$, and present some applications, focusing on the cases when $\Gamma$ is a free or free abelian group. Detailed constructions and proofs of the main results will appear elsewhere.
Comments: To appear in the Proceedings of the Special Session on Complex Geometry of the ISAAC conference, Aveiro, Portugal (2019)
Arithmetic of singular character varieties and their $E$-polynomials
$E$-polynomials of $SL_n$- and $PGL_n$-character varieties of free groups
Intersection cohomology of rank two character varieties of surface groups
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