Poincaré's theorem for the modular group of real Riemann surfaces
arXiv:math/0602413
Abstract
Let $Mod_{g}$ be the modular group of surfaces of genus $g$. Each element $[h]\in Mod_{g}$ induces in the integer homology of a surface of genus $g$ a symplectic automorphism $H([h])$ and Poincaré shown that $H:Mod_{g}\to Sp(2g,\mathbb{Z})$ is an epimorphism. The theory of real algebraic curves justify the definition of real Riemann surface as a Riemann surface $S$ with an anticonformal involution $Ï$. Let $(S,Ï)$ be a real Riemann surface, the subgroup $Mod_{g}^Ï$ of $Mod_{g}$ that consists of the elements $[h]\in Mod_{g}$ that have a representant $h$ such that $h\circÏ=Ï\circ h$, plays the rôle of the modular group in the theory of real Riemann surfaces. In this work we describe the image by $H$ of $Mod_{g}^Ï$. Such image depends on the topological type of the involution $Ï$.
17 pages, LaTex