On uniform approximation to successive powers of a real number

Abstract

We establish new inequalities involving classical exponents of Diophantine approximation. This allows for improving on the work of Davenport, Schmidt and Laurent concerning the maximum value of the exponent λn(ζ) among all real transcendental ζ. In particular we refine the estimation λn(ζ)≤ n/2-1 due to M. Laurent by λn(ζ)≤ w n/2(ζ)-1 for all n≥ 1, and for even n we replace the bound 2/n for λn(ζ) first found by Davenport and Schmidt by roughly 2n-12n3, which provides the currently best known bounds when n≥ 6.