English

Generalized Jacobians and explicit descents

Number Theory 2019-09-23 v3

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 nn dividing the degree of some reduced effective divisor m\mathfrak{m} on a curve CC, we show that multiplication by nn on the generalized Jacobian JmJ_\frak{m} factors through an isogeny φ:AmJm\varphi:A_{\mathfrak{m}} \rightarrow J_{\mathfrak{m}} whose kernel is naturally the dual of the Galois module (Pic(Ck)/m)[n](\operatorname{Pic}(C_{\overline{k}})/\mathfrak{m})[n]. By geometric class field theory, this corresponds to an abelian covering of Ck:=C×SpeckSpec(k)C_{\overline{k}} := C \times_{\operatorname{Spec}{k}} \operatorname{Spec}(\overline{k}) of exponent nn unramified outside m\mathfrak{m}. The nn-coverings of CC parameterized by explicit descents are the maximal unramified subcoverings of the kk-forms of this ramified covering. We present applications of this to the computation of Mordell-Weil groups of Jacobians.

Keywords

Cite

@article{arxiv.1601.06445,
  title  = {Generalized Jacobians and explicit descents},
  author = {Brendan Creutz},
  journal= {arXiv preprint arXiv:1601.06445},
  year   = {2019}
}

Comments

to appear in Math. Comp

R2 v1 2026-06-22T12:35:43.502Z