Probabilistic Star Discrepancy Bounds for Lacunary Point Sets

Abstract

By a result of Heinrich, Novak, Wasilkowski and Wo\'zniakowski the inverse of the star discrepancy n(d,) satisfies n(d,)≤ cd-2. Equivalently for any N and d there exists a set of N points in [0,1)d with star discrepacny bounded by c· d/N. They actually proved that a set of independent uniformly distributed random points satisfies this upper bound with positive probability. Although Aistleitner and Hofer later refined this result by proving a precise value of c depending on the probability with which the inequality holds, so far there is no general construction for such a set of points known. In this paper we consider the sequence (xn)n≥ 1=( 2n-1x1)n≥ 1 for a uniformly distributed point x1∈ [0,1)d and prove that the star discrepancy is bounded by Cd2d/N. The precise value of C depends on the probability with which this upper bound holds.