Abstract
In this chapter we start proving upper bounds for the discrepancy for objects other than the axis-parallel boxes. We will encounter a substantially different behavior of the discrepancy function, already mentioned in Section 1.2. For axis-parallel boxes, the discrepancy is at most of a power of log n, and similar results can be shown, for example, for homothets of a fixed convex polygon. The common feature is that the directions of the edges are fixed. It turns out that if we allow arbitrary rotation of the objects, or if we consider objects with a curved boundary, discrepancy grows as some fractional power of n. The simplest such class of objects is the set H 2 of all (closed) halfplanes, for which the discrepancy function D(n,H 2) is of the order n 1/4. For halfspaces in higher dimensions, the discrepancy is of the order n 1/2−1/2d; so the exponent approaches 1/2 as the dimension grows. Other classes of “reasonable” geometric objects, such as all balls in R d, all cubes (with rotation allowed), all ellipsoids, etc., exhibit a similar behavior. The discrepancy is again roughly n 1/2−4/2d although there are certain subtle differences.
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© 1999 Springer-Verlag Berlin Heidelberg
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Matoušek, J. (1999). Upper Bounds in the Lebesgue-Measure Setting. In: Geometric Discrepancy. Algorithms and Combinatorics, vol 18. Springer, Berlin, Heidelberg. https://doi.org/10.1007/978-3-642-03942-3_3
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DOI: https://doi.org/10.1007/978-3-642-03942-3_3
Publisher Name: Springer, Berlin, Heidelberg
Print ISBN: 978-3-642-03941-6
Online ISBN: 978-3-642-03942-3
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