English

On the discrepancy between best and uniform approximation

Number Theory 2019-06-03 v2

Abstract

For ζ\zeta a transcendental real number, we consider the classical Diophantine exponents wn(ζ)w_{n}(\zeta) and w^n(ζ)\widehat{w}_{n}(\zeta). They measure how small P(ζ)| P(\zeta)| can be for an integer polynomial PP of degree at most nn and naive height bounded by XX, for arbitrarily large and all large XX, respectively. The discrepancy between the exponents wn(ζ)w_{n}(\zeta) and w^n(ζ)\widehat{w}_{n}(\zeta) has attracted interest recently. Studying parametric geometry of numbers, W. Schmidt and L. Summerer were the first to refine the trivial inequality wn(ζ)w^n(ζ)w_{n}(\zeta)\geq \widehat{w}_{n}(\zeta). Y. Bugeaud and the author found another estimation provided that the condition wn(ζ)>wn1(ζ)w_{n}(\zeta)>w_{n-1}(\zeta) holds. In this paper we establish an unconditioned version of the latter result, which can be regarded as a proper extension. Unfortunately, the new contribution involves an additional exponent and is of interest only in certain cases.

Cite

@article{arxiv.1701.01108,
  title  = {On the discrepancy between best and uniform approximation},
  author = {Johannes Schleischitz},
  journal= {arXiv preprint arXiv:1701.01108},
  year   = {2019}
}

Comments

8 pages

R2 v1 2026-06-22T17:41:17.081Z