An elementary proof of a lower bound for the inverse of the star discrepancy

Abstract

A central problem in discrepancy theory is the challenge of evenly distributing points \x1, …, xn \ in [0,1]d. Suppose a set is so regular that for some > 0 and all y ∈ [0,1]d the sub-region [0,y] = [0,y1] × … × [0,yd] contains a number of points nearly proportional to its volume and ∀~y ∈ [0,1]d | 1n \# \1 ≤ i ≤ n: xi ∈ [0,y] \ - vol([0,y]) | ≤ , how large does n have to be depending on d and ? We give an elementary proof of the currently best known result, due to Hinrichs, showing that n d · -1.

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