Julian Lawrence Demeio
Published 2021-12-01, updated 2022-02-08Version 2
We investigate the "ramified descent problem": which adelic points of a smooth geometrically connected variety $X$ defined over a number field $K$ can be approximated by points that lift to a (twist of a) given ramified cover? We show that the natural descent set corresponding to the problem defines an obstruction to Hasse Principle and weak approximation. Furthermore, we introduce a Brauer-Manin obstruction to the problem. This obstruction can be purely transcendental (and non-trivial) even for abelian covers, which answers in the negative a question posed by Harari at a 2019 workshop. Moreover, the counterexample we produce is also an explicit example of transcendental obstruction to weak approximation for a quotient $SL_n/G$, with $G$ constant metabelian.
Comments: 30 pages. Comments welcomed!
Point counting for foliations over number fields
Arithmetic of 0-cycles on varieties defined over number fields
Weak approximation and rationally connected varieties over function fields of curves
![QR code for arXiv:2112.00843 [math.AG]](http://oss.arxitics.com/images/favicon.svg)