On the radii of Voronoi cells of rings of integers
Abstract
Since the time of Minkowski a basic problem in number theory has been to find lower bounds for the absolute value (K) of the discriminant of a number field K in terms of the degree n(K) of K. In this paper we study another measure of the size of K given by the covering radius μ(K) of the ring of integers OK of K. Here μ(K) is the L2 radius ||V2(K)||2 of the L2 Voronoi cell V2(K) of OK, where V2(K) is the set of points in R Q K that are at least as close to the origin as they are to any non-zero element of OK. To put a limit on what lower bounds one can prove for μ(K) in terms of n(K), we study infinite families of K of increasing degree for which μ(K) can be bounded above by an explicit power of n(K). We also study analogous questions when the L2 norm is replaced by the L∞ norm.
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