Finite rigid sets and homologically non-trivial spheres in the curve complex of a surface

Abstract

Aramayona and Leininger have provided a "finite rigid subset" X() of the curve complex C() of a surface = ng, characterized by the fact that any simplicial injection X() C() is induced by a unique element of the mapping class group Mod(). In this paper we prove that, in the case of the sphere with n≥ 5 marked points, the reduced homology class of the finite rigid set of Aramayona and Leininger is a Mod()-module generator for the reduced homology of the curve complex C(), answering in the affirmative a question posed by Aramayona and Leininger. For the surface = gn with g≥ 3 and n∈ \0,1\ we find that the finite rigid set X() of Aramayona and Leininger contains a proper subcomplex X() whose reduced homology class is a Mod()-module generator for the reduced homology of C() but which is not itself rigid.