The equisymmetric stratification of the moduli space and the Krull dimension of mapping class groups

In a previous experiment, Moscovici and Lkcuyer (1972) have shown that the spatial disposition of subjects influences the polarization of attitudes within a group. They employed two arrangements, one termed 'square', in which the four subjects were seated in pairs, each pair facing the other from op

We prove that the word problem in the mapping class group of the once-punctured surface of genus g has complexity O(|w| 2 g) for |w| log(g) where |w| is the length of the word in a (standard) set of generators. The corresponding bound in the case of the closed surface is O(|w| 2 g 2 ). We also carry

In (Masur and Wolf, 1995), Masur and Wolf proved that the Teichmüller space of genus g > 1 surfaces with the Teichmüller metric is not a Gromov hyperbolic space. In this paper, we provide an alternative proof based upon a study of the action of the mapping class group on Teichmüller space.