On uniform polynomial approximation

Abstract

Let n be a positive integer and a transcendental real number. We are interested in bounding from above the uniform exponent of polynomial approximation ωn(). Davenport and Schmidt's original 1969 inequality ωn()≤ 2n-1 was improved recently, and the best upper bound known to date is 2n-2 for each n≥ 10. In this paper, we develop new techniques leading us to the improved upper bound 2n-13n1/3+O(1).

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