Shimura curves and explicit descent obstructions via level structure
Abstract
We give large families of Shimura curves defined by congruence conditions, all of whose twists lack -adic points for some . For each such curve we give analytically large families of counterexamples to the Hasse principle via the descent (or equivalently \'etale Brauer-Manin) obstruction to rational points applied to \'etale coverings coming from the level structure. More precisely, we find infinitely many quadratic fields defined using congruence conditions such that a twist of a related Shimura curve by each of those fields violates the Hasse principle. As a minimal example, we find the twist of the genus 11 Shimura curve by and its bi-elliptic involution to violate the Hasse principle.
Cite
@article{arxiv.1408.1642,
title = {Shimura curves and explicit descent obstructions via level structure},
author = {James Stankewicz},
journal= {arXiv preprint arXiv:1408.1642},
year = {2015}
}
Comments
The minimal example is incorrect. There is an error in the discussion about etale covers of twists, but this error has informed further progress, to appear in a new manuscript