Uniform Diophantine approximation and best approximation polynomials

Abstract

Let ζ be a real transcendental number. We introduce a new method to find upper bounds for the classical exponent wn(ζ) concerning uniform polynomial approximation. Our method is based on the parametric geometry of numbers introduced by Schmidt and Summerer, and transference of the original approximation problem in dimension n to suitable higher dimensions. For large n, we can provide an unconditional bound of order wn(ζ)≤ 2n-2+o(1). While this improves the bound of order 2n-32+o(1) due to Bugeaud and the author, it is unfortunately slightly weaker than what can be obtained when incorporating a recently proved conjecture of Schmidt and Summerer. However, the method also enables us to establish significantly stronger conditional bound upon a certain presumably weak assumption on the structure of the best approximation polynomials. Thereby we provide serious evidence that the exponent should be reasonably smaller than the known upper bounds.