Hammersley Point Sets and Inverse of Star-Discrepancy
Abstract
We establish the existence of N-point sets in dimension d whose star-discrepancy is bounded above by 2.4631832 dN, where the numerical constant improves upon all previously known bounds. This improvement is obtained by combining a recent result by Gnewuch on bracketing numbers in high dimensions with discrepancy bounds for Hammersley point sets due to Atanassov in dimensions 1 ≤ d ≤ 4.
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