An Upper Bound of the Minimal Dispersion via Delta Covers
Daniel Rudolf ()
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Daniel Rudolf: University of Goettingen, Institut für Mathematische Stochastik
A chapter in Contemporary Computational Mathematics - A Celebration of the 80th Birthday of Ian Sloan, 2018, pp 1099-1108 from Springer
Abstract:
Abstract For a point set of n elements in the d-dimensional unit cube and a class of test sets we are interested in the largest volume of a test set which does not contain any point. For all natural numbers n, d and under the assumption of the existence of a δ-cover with cardinality |Γ δ| we prove that there is a point set, such that the largest volume of such a test set without any point is bounded above by log | Γ δ | n + δ $$\frac {\log \vert \varGamma _\delta \vert }{n} + \delta $$ . For axis-parallel boxes on the unit cube this leads to a volume of at most 4 d n log ( 9 n d ) $$\frac {4d}{n}\log (\frac {9n}{d})$$ and on the torus to 4 d n log ( 2 n ) $$\frac {4d}{n}\log (2n)$$ .
Date: 2018
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Persistent link: https://EconPapers.repec.org/RePEc:spr:sprchp:978-3-319-72456-0_50
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DOI: 10.1007/978-3-319-72456-0_50
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