Weak Approximation over Function Fields of Curves over Large or Finite Fields
Abstract
Let be the function field of a curve over a field and let be a smooth, projective, separably rationally connected -variety with . Under the assumption that admits a smooth projective model , we prove the following weak approximation results: (1) if is a large field, then is Zariski dense; (2) if is an infinite algebraic extension of a finite field, then satisfies weak approximation at places of good reduction; (3) if is a nonarchimedean local field and -equivalence is trivial on one of the fibers over points of good reduction, then there is a Zariski dense subset such that satisfies weak approximation at places in . As applications of the methods, we also obtain the following results over a finite field : (4) if , then for a smooth cubic hypersurface , the specialization map at finitely many points of good reduction is surjective; (5) if and , then a smooth cubic surface over satisfies weak approximation at any given place of good reduction.
Cite
@article{arxiv.0907.2529,
title = {Weak Approximation over Function Fields of Curves over Large or Finite Fields},
author = {Yong Hu},
journal= {arXiv preprint arXiv:0907.2529},
year = {2010}
}
Comments
numbering style changed; Theorem 2 in Section 1 strengthens its early version; many subsequent changes in Section 5