Let $S$ be a closed oriented surface and $G$ a finite group of orientation preserving automorphisms of $S$ whose orbit space has genus at least $2$. There is a natural group homomorphism from the $G$-centralizer in $Diff^+(S)$ to the $G$-centralizer in $Sp(H_1(S))$. We give a sufficient condition for its image to be a subgroup of finite index.
Presentations of mapping class groups and an application to cluster algebras from surfaces
Homomorphisms between mapping class groups
A note on acylindrical hyperbolicity of Mapping Class Groups
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