English

Diophantine approximation on curves

Number Theory 2022-05-17 v3

Abstract

Let gg be a dimension function. The Generalised Baker-Schmidt Problem (1970) concerns the gg-dimensional Hausdorff measure (\HHg\HH^g-measure) of the set of Ψ\Psi-approximable points on nondegenerate manifolds. The problem relates the `size' of the set of Ψ\Psi-approximable points with the convergence or divergence of a certain series. In the dual approximation setting, the divergence case has been established by Beresnevich-Dickinson-Velani (2006) for any nondegenerate manifold. The convergence case, however, represents a major challenging open problem and progress thus far has been effectuated in limited cases only. In this paper, we discuss and prove several results on the \HHg\HH^g-measure on Veronese curves in any dimension nn. As a consequence of one of our results, we generalize recent results of Pezzoni [Acta Arith. 193 (2020), no. 3, 269-281] regarding n=3n=3. This improvement evolves from a deeper investigation on general irreducibility considerations applicable in arbitrary dimensions. We further investigate the \HHg\HH^g-measure for convergence on planar curves. We show that the monotonicity assumption on a multivariable approximating function cannot be removed for planar curves.

Keywords

Cite

@article{arxiv.1902.02094,
  title  = {Diophantine approximation on curves},
  author = {Mumtaz Hussain and Johannes Schleischitz and David Simmons},
  journal= {arXiv preprint arXiv:1902.02094},
  year   = {2022}
}

Comments

20 pages, the paper is restructured, some typos removed and some proofs are refined. Theorem 2.7 is shortened (Theorem 2.8 in the previous version) and Theorem 5.2 removed

R2 v1 2026-06-23T07:33:23.583Z