The braidings in the mapping class groups of surfaces

Abstract

The disjoint union of mapping class groups of surfaces forms a braided monoidal category M, as the disjoint union of the braid groups B does. We give a concrete, and geometric meaning of the braiding βr,s in . Moreover, we find a set of elements in the mapping class groups which correspond to the standard generators of the braid groups. Using this, we obtain an obvious map φ:Bgg,1. We show that this map φ is injective and nongeometric in the sense of Wajnryb. Since this map extends to a braided monoidal functor : B → M, the integral homology homomorphism induced by φ is trivial in the stable range.