The number of different distances determined by n points in the plane (1984)

by F. R. K. Chung
Venue:J. Combin. Theory Ser. A
Citations:22 - 0 self

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6 Erdős on Unit Distances and the Szemeredi-Trotter Theorems – László A. Székely
For any n points in the plane: (a) There are n^0.66 distinct distances (b) There are n^0.8 distinct distances – William Gasarch
Computational Geometric Aspects of Rhythm, Melody, and Voice-Leading – Godfried Toussaint
printed in Belgium Some Extremal Problems in Geometry – George Purdy - 1969
SOME UNSOLVED PROBLEMS – unknown authors
On distinct distances among points in general position and . . . – Adrian Dumitrescu - 2008
For any n points in the plane: (a) There are n 0.66 distinct distances (b) There are n 0.8 distinct distances – William Gasarch
The Exact Fitting . . . – Leonidas J. Guibas, Jean-marc Robert, Mark H. Overmars - 1992
On Distinct Distances and Incidences: Elekes’s Transformation and the New Algebraic Developments ∗ – Micha Sharir - 2010
3 Lattices with Few Distances – J. H. Conway, N. J. A. Sloane - 1991
34 Erdős distance problem in vector spaces over finite fields – A. Iosevich, M. Rudnev
13 On Distinct Sums and Distinct Distances – Gábor Tardos - 2001
16 Distinct Distances in the Plane – J. Solymosi, Cs. D. Toth - 2001
4 On Distinct Distances from a Vertex of a Convex Polygon – Adrian Dumitrescu
5 Distance sets of well-distributed planar point sets, Discrete Comput – A. Iosevich
3 On distance measures for well-distributed sets – A. Iosevich, M. Rudnev - 2007
10 Incidences in Three Dimensions and Distinct Distances in the Plane (Extended Abstract) – György Elekes, Micha Sharir - 2010
line, no four on a – Tobias Kreisel, Sascha Kurz - 2006