Splitting of the homology of the punctured mapping class group

Abstract

Let g,1m be the mapping class group of the orientable surface g,1m of genus g with one parametrised boundary curve and m permutable punctures; when m=0 we omit it from the notation. Let βm(g,1) be the braid group on m strands of the surface g,1. We prove that H*(g,1m;Z2) H*(g,1;H*(βm(g,1);Z2)). The main ingredient is the computation of H*(βm(g,1);Z2) as a symplectic representation of g,1.