English

Polynomial estimates, exponential curves and Diophantine approximation

Complex Variables 2010-09-23 v1

Abstract

Let α(0,1)Q\alpha\in(0,1)\setminus{\Bbb Q} and K={(ez,eαz):z1}C2K=\{(e^z,e^{\alpha z}):\,|z|\leq1\}\subset{\Bbb C}^2. If PP is a polynomial of degree nn in C2{\Bbb C}^2, normalized by PK=1\|P\|_K=1, we obtain sharp estimates for PΔ2\|P\|_{\Delta^2} in terms of nn, where Δ2\Delta^2 is the closed unit bidisk. For most α\alpha, we show that supPPΔ2exp(Cn2logn)\sup_P\|P\|_{\Delta^2}\leq\exp(Cn^2\log n). However, for α\alpha in a subset S{\mathcal S} of the Liouville numbers, supPPΔ2\sup_P\|P\|_{\Delta^2} has bigger order of growth. We give a precise characterization of the set S{\mathcal S} and study its properties.

Keywords

Cite

@article{arxiv.1009.4408,
  title  = {Polynomial estimates, exponential curves and Diophantine approximation},
  author = {Dan Coman and Evgeny A. Poletsky},
  journal= {arXiv preprint arXiv:1009.4408},
  year   = {2010}
}

Comments

12 pages. To appear in Mathematical Research Letters

R2 v1 2026-06-21T16:17:41.050Z