English

Uniform Diophantine approximation and run-length function in continued fractions

Number Theory 2025-03-12 v1

Abstract

We study the multifractal properties of the uniform approximation exponent and asymptotic approximation exponent in continued fractions. As a corollary, %given a nonnegative reals ν^,\hat{\nu}, we calculate the Hausdorff dimension of the uniform Diophantine set U(y,ν^)={x[0,1) ⁣:N1, n[1,N], such that Tn(x)y<IN(y)ν^}\mathcal{U}(y,\hat{\nu})=\Big\{x\in[0,1)\colon \forall N\gg1, \exists~ n\in[1,N], \text{ such that } |T^{n}(x)-y|<|I_{N}(y)|^{\hat{\nu}}\Big\} for algebraic irrational points y[0,1)y\in[0,1). These results contribute to the study of the uniform Diophantine approximation, and apply to investigating the multifractal properties of run-length function in continued fractions.

Keywords

Cite

@article{arxiv.2301.05855,
  title  = {Uniform Diophantine approximation and run-length function in continued fractions},
  author = {Bo Tan and Qing-Long Zhou},
  journal= {arXiv preprint arXiv:2301.05855},
  year   = {2025}
}

Comments

33 pages, any comments for improvements are appreciated

R2 v1 2026-06-28T08:11:36.957Z