Upper bounds for the uniform simultaneous Diophantine exponents

Abstract

We give several upper bounds for the uniform simultaneous Diophantine exponent λn() of a transcendental number ∈R. The most important one relates λn() and the ordinary simultaneous exponent ωk() in the case when k is substantially smaller than n. In particular, in the generic case ωk()=k with a properly chosen k, the upper bound for λn() becomes as small as 32n + O(n-2) which is substantially better than the best currently known unconditional bound of 2n + O(n-2). We also improve an unconditional upper bound on λn() for even values of n.