Arithmetics of homogeneous spaces over $p$-adic function fields
Abstract
Let be the function field of a smooth projective geometrically integral curve over a finite extension of . Following the works of Harari, Scheiderer, Szamuely, Izquierdo, and Tian, we study the local-global and weak approximation problems for homogeneous spaces of with geometric stabilizers extension of a group of multiplicative type by a unipotent group. The tools used are arithmetic (local and global) duality theorems in Galois cohomology, in combination with techniques similar to those used by Harari, Szamuely, Colliot-Th\'el\`ene, Sansuc, and Skorobogatov. As a consequence, we show that any finite abelian group is a Galois group over , rediscovering the positive answer to the abelian case of the inverse Galois problem over . In the case where the curve is defined over a higher-dimensional local field instead of a finite extension of , coarser results are also given.
Cite
@article{arxiv.2211.08986,
title = {Arithmetics of homogeneous spaces over $p$-adic function fields},
author = {Nguyen Manh Linh},
journal= {arXiv preprint arXiv:2211.08986},
year = {2024}
}
Comments
55 pages, major improvements from the previous version