Generalized Jacobians and explicit descents

Abstract

We develop a cohomological description of various explicit descents in terms of generalized Jacobians, generalizing the known description for hyperelliptic curves. Specifically, given an integer n dividing the degree of some reduced effective divisor m on a curve C, we show that multiplication by n on the generalized Jacobian Jm factors through an isogeny :Am → Jm whose kernel is naturally the dual of the Galois module (Pic(Ck)/m)[n]. By geometric class field theory, this corresponds to an abelian covering of Ck := C ×Speck Spec(k) of exponent n unramified outside m. The n-coverings of C parameterized by explicit descents are the maximal unramified subcoverings of the k-forms of this ramified covering. We present applications of this to the computation of Mordell-Weil groups of Jacobians.