Mathematics – Geometric Topology
Scientific paper
2007-12-18
Mathematics
Geometric Topology
51 pages with 42 figures
Scientific paper
Given a smooth, oriented, closed surface $\Sigma$ of genus zero, possibly with boundary, let $\tilde{\Sigma} \longrightarrow \Sigma$ be a given $G$-cover of $\Sigma$, where $G$ is a given finite group. Let $S_{n}$ denote the standard sphere with $n$ holes. There are many ways of gluing together several $G$-cover of $S_{n}$ to construct the $G$-cover $\ts \longrightarrow \Sigma$, of $\Sigma$. We let $M(\tilde{\Sigma} ,\Sigma)$ be the set of all ways to construct the given $G$-cover, $\tilde{\Sigma} \longrightarrow \Sigma$, of $\Sigma$ from gluing of several $G$-covers of $S_{n}$, here $n$ may vary. In this paper, we define some simple moves and relation which will turn $M(\tilde{\Sigma} ,\Sigma)$ into a connected and simply-connected complex. This will be used in the future paper to construct $G$-equivariant Modular Functor. This $G$-equivariant Modular Functor will be an extension of the usual Modular Functor.
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