Generating the mapping class group of a non-orientable punctured surface by involutions
Abstract
Let Ng,n denote the closed non-orientable surface of genus g with n punctures and let Ng,n denote the mapping class group of Ng,n. Szepietowski showed that Ng,n is generated by finitely many involutions. The number of elements in his generating set depends linearly on g and n. In the case of n=0, Szepietowski found an involution generating set in such a way that the number of its elements does not depend on g, showing that Ng,0 is generated by four involutions. In this thesis, for n ≥ 0, we prove that Ng,n is generated by eight involutions if g ≥ 13 is odd and by eleven involutions if g ≥ 14 is even.
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