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Distinct Distances from Three Points

Published online by Cambridge University Press:  30 September 2015

MICHA SHARIR
Affiliation:
School of Computer Science, Tel Aviv University, Tel Aviv 69978, Israel (e-mail: [email protected])
JÓZSEF SOLYMOSI
Affiliation:
Department of Mathematics, University of British Columbia, Vancouver BC, V6T 1Z4, Canada (e-mail: [email protected])

Abstract

Let p1, p2, p3 be three noncollinear points in the plane, and let P be a set of n other points in the plane. We show that the number of distinct distances between p1, p2, p3 and the points of P is Ω(n6/11), improving the lower bound Ω(n0.502) of Elekes and Szabó [4] (and considerably simplifying the analysis).

Type
Paper
Copyright
Copyright © Cambridge University Press 2015 

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References

[1] Elekes, G. (2002) Sums versus products in number theory, algebra and Erdős geometry: A survey. In Paul Erdős and his Mathematics II, Vol. 11 of Bolyai Mathematical Society Studies, Budapest, pp. 241–290.Google Scholar
[2] Elekes, G. and Rónyai, L. (2000) A combinatorial problem on polynomials and rational functions, J. Combin. Theory Ser. A 89 120.Google Scholar
[3] Elekes, G., Simonovits, M. and Szabó, E. (2009) A combinatorial distinction between unit circles and straight lines: How many coincidences can they have? Combin. Probab. Comput. 18 691705.Google Scholar
[4] Elekes, G. and Szabó, E. (2012) How to find groups? (and how to use them in Erdős geometry?) Combinatorica 32 537571.Google Scholar
[5] Erdős, P., Lovász, L. and Vesztergombi, K. (1989) On the graph of large distance. Discrete Comput. Geom. 4 541549.Google Scholar
[6] Pach, J. and Sharir, M. (1998) On the number of incidences between points and curves. Combin. Probab. Comput. 7 121127.Google Scholar
[7] Pach, J. and de Zeeuw, F. (2014) Distinct distances on algebraic curves in the plane. In Proc. 30th Symposium on Computational Geometry, pp. 549–557. Also in arXiv:1308.0177.Google Scholar
[8] Sharir, M., Sheffer, A. and Solymosi, J. (2013) Distinct distances on two lines. J. Combin. Theory Ser. A 20 17321736.Google Scholar
[9] Székely, L. (1997) Crossing numbers and hard Erdős problems in discrete geometry. Combin. Probab. Comput. 6 353358.Google Scholar