Generating the homology of covers of surfaces

Abstract

Putman and Wieland conjectured that if → is a finite branched cover between closed oriented surfaces of sufficiently high genus, then the orbits of all nonzero elements of H1(;Q) under the action of lifts to of mapping classes on are infinite. We prove that this holds if H1(;Q) is generated by the homology classes of lifts of simple closed curves on . We also prove that the subspace of H1(;Q) spanned by such lifts is a symplectic subspace. Finally, simple closed curves lie on subsurfaces homeomorphic to 2-holed spheres, and we prove that H1(;Q) is generated by the homology classes of lifts of loops on lying on subsurfaces homeomorphic to 3-holed spheres.