Liftable mapping class groups of certain branched covers of torus

Abstract: Let $S_{g,n}$ be a closed oriented hyperbolic surface of genus $g\geq 0$ with $n\geq 0$ marked points, with the understanding that $S_{g,0}=S_g$. Let $\mathrm{Mod}(S_{h,n})$ be the mapping class group of $S_{h,n}$ and $\mathrm{LMod}p(S{h,n})$ be the liftable mapping class group associated to a cover $p:S_g\to S_{h,n}$. For the cover $p_k:S_k\to S_{1,2}$, in his PhD thesis, Ghaswala~\cite{ghaswala_thesis} derived a finite presentation for $\mathrm{LMod}{p_k}(S{1,2})$ when $k=2,3,4$ and a finite generating set when $k=5,6$ using the Reidemeister-Schreier rewriting process. In this paper, we derive a finite generating set for $\mathrm{LMod}{p_k}(S{1,2})$ for all $k\geq 2$. In the process, we also prove that the kernel of the homology representation $\Psi:\mathrm{Mod}(S_{1,2})\to \mathrm{GL}3(\Z)$ is normally generated by a separating Dehn twist and is free with a countable basis. We also provide an explicit countable basis for $\ker\Psi$ consisting of separating Dehn twists. As an application of Birman-Hilden theory, we provide a finite generating set for the normalizer of the Deck group of $p_k$ in $\mathrm{Mod}(S_k)$ when $k=2,3$. We conclude the paper by proving that $\mathrm{LMod}{p_k}(S_{1,2})$ is maximal in $\mathrm{Mod}(S_{1,2})$ if and only if $k$ is prime.