English

Singularity, weighted uniform approximation, intersections and rates

Number Theory 2026-01-14 v4 Dynamical Systems

Abstract

A classical argument was introduced by Khintchine in 1926 in order to exhibit the existence of totally irrational singular linear forms in two variables. This argument was subsequently revisited and extended by many authors. For instance, in 1959 Jarnik used it to show that for n2n \geq 2 and for any non-increasing positive ff there are totally irrational matrices AMm,n(R)A \in M_{m,n}({\mathbb R}) such that for all large enough tt there are pZm,qZn{0}\mathbf{p} \in {\mathbb Z}^m, \mathbf{q} \in {\mathbb Z}^n \smallsetminus \{0\} with qt  and  Aqpf(t).\|\mathbf{q}\| \leq t \ \text{ and } \ \|A \mathbf{q} - \mathbf{p}\| \leq f(t). We denote the collection of such matrices by UAm,n(f)\mathrm{UA}^*_{m,n}(f). We adapt Khintchine's argument to show that the sets UAm,n(f)\mathrm{UA}^*_{m,n}(f), and their weighted analogues UAm,n(f,w)\mathrm{UA}^*_{m,n}(f, \mathbf{w}), intersect many manifolds and fractals, and have strong intersection properties. For example, we show that: When n2n \geq 2, the set wUA(f,w)\bigcap_{\mathbf{w}} \mathrm{UA}^*(f, \mathbf{w}) , where the intersection is over all weights w\mathbf{w}, is nonempty, and moreover intesects many manifolds and fractals; For n2n \geq 2, there are vectors in Rn{\mathbb R}^n which are simultaneously kk-singular for every kk, in the sense of Yu; when n3n \geq 3, UA1,n(f)+UA1,n(f)=Rn\mathrm{UA}^*_{1,n}(f) + \mathrm{UA}^*_{1,n}(f) = {\mathbb R}^n. We also obtain new bounds on the rate of singularity which can be attained by column vectors in analytic submanifolds of dimension at least 2 in Rn{\mathbb R}^n.

Keywords

Cite

@article{arxiv.2409.15607,
  title  = {Singularity, weighted uniform approximation, intersections and rates},
  author = {Dmitry Kleinbock and Nikolay Moshchevitin and Jacqueline Warren and Barak Weiss},
  journal= {arXiv preprint arXiv:2409.15607},
  year   = {2026}
}

Comments

27 pages; several minor changes compared with the previous version

R2 v1 2026-06-28T18:54:36.374Z