Automorphisms of the mapping class group of a nonorientable surface

Abstract

Let S be a nonorientable surface of genus g 5 with n 0 punctures, and (S) its mapping class group. We define the complexity of S to be the maximum rank of a free abelian subgroup of (S). Suppose that S1 and S2 are two such surfaces of the same complexity. We prove that every isomorphism (S1)(S2) is induced by a diffeomorphism S1 S2. This is an analogue of Ivanov's theorem on automorphisms of the mapping class groups of an orientable surface, and also an extension and improvement of the first author's previous result.