Generating the mapping class group of a nonorientable surface by three torsions

Abstract

We prove that the mapping class group M(Ng) of a closed nonorientable surface of genus g different than 4 is generated by three torsion elements. Moreover, for every even integer k 12 and g of the form g=pk+2q(k-1) or g=pk+2q(k-1)+1, where p,q are non-negative integers and p is odd, M(Ng) is generated by three conjugate elements of order k. Analogous results are proved for the subgroup of M(Ng) generated by Dehn twists.