Embedding mapping-class groups of orientable surfaces with one boundary component
Abstract
Let Sg,1,p be an orientable surface of genus g with one boundary component and p punctures. Let Mg,1,p be the mapping-class group of Sg,1,p relative to the boundary. We construct homomorphisms Mg,1,p Mg',1,(b-1), where g' ≥ 0 and b≥ 1. We proof that the constructed homomorphisms g,1,p g',1,(b-1) are injective. One of these embeddings for g = 0 is classic.
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