The mapping class group of a nonorientable surface is quasi-isometrically embedded in the mapping class group of the orientation double cover
Abstract
Let N be a connected nonorientable surface with or without boundary and punctures, and j S→ N be the orientation double covering. It has previously been proved that the orientation double covering j induces an embedding (N) Mod(S) with one exception. In this paper, we prove that this injective homomorphism is a quasi-isometric embedding. The proof is based on the semihyperbolicity of Mod(S), which has already been established. We also prove that the embedding Mod(F') Mod(F) induced by an inclusion of a pair of possibly nonorientable surfaces F' ⊂ F is a quasi-isometric embedding.
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