We calculate the first homology group of the mapping class group with coefficients in the first rational homology group of the universal abelian Z/L-cover of the surface. If the surface has one marked point, then the answer is Q(tau(L)), where tau(L) is the number of positive divisors of L. If the surface instead has one boundary component, then the answer is Q. We also perform the same calculation for the level L subgroup of the mapping class group. Set H-L = H-1(Sigma(g); Z/L). If the surface has one marked point, then the answer is Q[H-L], the rational group ring of H-L. If the surface instead has one boundary component, then the answer is Q.

• 出版日期2011-9