On the discrepancy between best and uniform approximation
Abstract
For a transcendental real number, we consider the classical Diophantine exponents and . They measure how small can be for an integer polynomial of degree at most and naive height bounded by , for arbitrarily large and all large , respectively. The discrepancy between the exponents and has attracted interest recently. Studying parametric geometry of numbers, W. Schmidt and L. Summerer were the first to refine the trivial inequality . Y. Bugeaud and the author found another estimation provided that the condition 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