Right-angled Artin groups and curve graphs of nonorientable surfaces

Abstract

Let N be a closed nonorientable surface with or without marked points. In this paper we prove that, for every finite full subgraph of Ctwo(N), the right-angled Artin group on can be embedded in the mapping class group of N. Here, Ctwo(N) is the subgraph, induced by essential two-sided simple closed curves in N, of the ordinal curve graph C(N). In addition, we show that there exists a finite graph which is not a full subgraph of Ctwo(N) for some N, but the right-angled Artin group on can be embedded in the mapping class group of N.