Teitelbaum's exceptional zero conjecture in the function field case
Number Theory
2007-05-23 v1
Abstract
The exceptional zero conjecture relates the first derivative of the -adic -function of a rational elliptic curve with split multiplicative reduction at to its complex -function. Teitelbaum formulated an analogue of Mazur and Tate's refined (multiplicative) version of this conjecture for elliptic curves over the rational function field with split multiplicative reduction at two places and , avoiding the construction of a -adic -function. This article proves Teitelbaum's conjecture up to roots of unity by developing Darmon's theory of double integrals over arbitrary function fields. A function field version of Darmon's period conjecture is also obtained.
Cite
@article{arxiv.math/0401276,
title = {Teitelbaum's exceptional zero conjecture in the function field case},
author = {Hilmar Hauer and Ignazio Longhi},
journal= {arXiv preprint arXiv:math/0401276},
year = {2007}
}
Comments
31 pages