Chevalley-Weil formula for hypersurfaces in Pn-bundles over curves and Mordell-Weil ranks in function field towers

Abstract

Let X be a complex hypersurface in a Pn-bundle over a curve C. Let C' C be a Galois cover with group G. In this paper we describe the C[G]-structure of Hp,q(X×C C') provided that X×C C' is either smooth or n=3 and X×C C' has at most ADE singularities.% and the C[G]-structure of the cohomology of its resolution of singularities. As an application we obtain a geometric proof for an upper bound by Pal for the Mordell-Weil rank of an elliptic surface obtained by a Galois base change of another elliptic surface. If the Galois group of the base field acts trivially on the Galois group of the cover C' C then we show that the bound of Pal is weaker than the bound coming from the Shioda-Tate formula.