Abstract
We prove that for any setS ofn points in the plane andn 3−α triangles spanned by the points inS there exists a point (not necessarily inS) contained in at leastn 3−3α/(c log5 n) of the triangles. This implies that any set ofn points in three-dimensional space defines at most\(\sqrt[3]{{(c/2)}}n^{8/3} \log ^{5/3} n\) halving planes.
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Work on this paper by Boris Aronov and Rephael Wenger has been supported by DIMACS under NSF Grant STC-88-09648. Work on this paper by Bernard Chazelle has been supported by NSF Grant CCR-87-00917. Work by Herbert Edelsbrunner has been supported by NSF Grant CCR-87-14565. Micha Sharir has been supported by ONR Grant N00014-87-K-0129, by NSF Grant CCR-89-01484, and by grants from the U.S.-Israeli Binational Science Foundation, the Israeli National Council for Research and Development, and the Fund for Basic Research administered by the Israeli Academy of Sciences.
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Aronov, B., Chazelle, B., Edelsbrunner, H. et al. Points and triangles in the plane and halving planes in space. Discrete Comput Geom 6, 435–442 (1991). https://doi.org/10.1007/BF02574700
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DOI: https://doi.org/10.1007/BF02574700