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On Multiplicatively Badly Approximable Vectors

Number Theory 2025-04-07 v4

Abstract

Let x\langle x\rangle denote the distance from xRx\in\mathbb{R} to the set of integers Z\mathbb{Z}. The Littlewood Conjecture states that for all pairs (α,β)R2(\alpha,\beta)\in\mathbb{R}^{2} the product qqαqβq\langle q\alpha\rangle\langle q\beta\rangle attains values arbitrarily close to 00 as qNq\in\mathbb{N} tends to infinity. Badziahin showed that if a factor logqloglogq\log q\cdot \log\log q is added to the product, the same statement becomes false. In this paper, we generalise Badziahin's result to vectors αRd\boldsymbol{\alpha}\in\mathbb{R}^{d}, replacing the function logqloglogq\log q\cdot \log\log q by (logq)d1loglogq(\log q)^{d-1}\cdot\log\log q for any d2d\geq 2, and thereby obtaining a new proof in the case d=2d=2. Our approach is based on a new version of the well-known Dani Correspondence between Diophantine approximation and dynamics on the space of lattices, especially adapted to the study of products of rational approximations. We believe that this correspondence is of independent interest.

Keywords

Cite

@article{arxiv.2211.04523,
  title  = {On Multiplicatively Badly Approximable Vectors},
  author = {Reynold Fregoli and Dmitry Kleinbock},
  journal= {arXiv preprint arXiv:2211.04523},
  year   = {2025}
}

Comments

Version 4: notation changed and some lemmas added/modified in Section 4

R2 v1 2026-06-28T05:27:20.210Z