A lower bound for the dispersion on the torus
Abstract
We consider the volume of the largest axis-parallel box in the d-dimensional torus that contains no point of a given point set Pn with n elements. We prove that, for all natural numbers d, n and every point set Pn, this volume is bounded from below by \1,d/n\. This implies the same lower bound for the discrepancy on the torus.
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