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2007

Distance Measures for Well-Distributed Sets

14 years 16 days ago
Distance Measures for Well-Distributed Sets
In this paper we investigate the Erd¨os/Falconer distance conjecture for a natural class of sets statistically, though not necessarily arithmetically, similar to a lattice. We prove a good upper bound for spherical means that have been classically used to study this problem. We conjecture that a majorant for the spherical means suffices to prove the distance conjecture(s) in this setting. For a class of non-Euclidean distances, we show that this generally cannot be achieved, at least in dimension two, by considering integer point distributions on convex curves and surfaces. In higher dimensions, we link this problem to the question about the existence of smooth well-curved hypersurfaces that support many integer points.
Alex Iosevich, Michael Rudnev
Added 13 Dec 2010
Updated 13 Dec 2010
Type Journal
Year 2007
Where DCG
Authors Alex Iosevich, Michael Rudnev
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