{"scopus_import":"1","quality_controlled":"1","title":"Points and triangles in the plane and halving planes in space","main_file_link":[{"url":"https://link.springer.com/article/10.1007/BF02574700","open_access":"1"}],"oa_version":"Published Version","issue":"1","publist_id":"2063","language":[{"iso":"eng"}],"intvolume":" 6","day":"01","publisher":"Springer","article_type":"original","year":"1991","date_published":"1991-12-01T00:00:00Z","_id":"4062","author":[{"last_name":"Aronov","first_name":"Boris","full_name":"Aronov, Boris"},{"full_name":"Chazelle, Bernard","first_name":"Bernard","last_name":"Chazelle"},{"orcid":"0000-0002-9823-6833","full_name":"Edelsbrunner, Herbert","first_name":"Herbert","id":"3FB178DA-F248-11E8-B48F-1D18A9856A87","last_name":"Edelsbrunner"},{"full_name":"Guibas, Leonidas","first_name":"Leonidas","last_name":"Guibas"},{"last_name":"Sharir","full_name":"Sharir, Micha","first_name":"Micha"},{"last_name":"Wenger","full_name":"Wenger, Rephael","first_name":"Rephael"}],"doi":"10.1007/BF02574700","abstract":[{"text":"We prove that for any set S of n points in the plane and n3-α triangles spanned by the points in S there exists a point (not necessarily in S) contained in at least n3-3α/(c log5 n) of the triangles. This implies that any set of n points in three-dimensional space defines at most {Mathematical expression} halving planes.","lang":"eng"}],"publication":"Discrete & Computational Geometry","publication_status":"published","extern":"1","type":"journal_article","date_updated":"2022-02-24T15:39:25Z","volume":6,"publication_identifier":{"eissn":["1432-0444"],"issn":["0179-5376"]},"status":"public","page":"435 - 442","oa":1,"user_id":"ea97e931-d5af-11eb-85d4-e6957dddbf17","acknowledgement":"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\r\nAcademy of Sciences","article_processing_charge":"No","month":"12","date_created":"2018-12-11T12:06:43Z","citation":{"short":"B. Aronov, B. Chazelle, H. Edelsbrunner, L. Guibas, M. Sharir, R. Wenger, Discrete & Computational Geometry 6 (1991) 435–442.","mla":"Aronov, Boris, et al. “Points and Triangles in the Plane and Halving Planes in Space.” Discrete & Computational Geometry, vol. 6, no. 1, Springer, 1991, pp. 435–42, doi:10.1007/BF02574700.","ama":"Aronov B, Chazelle B, Edelsbrunner H, Guibas L, Sharir M, Wenger R. Points and triangles in the plane and halving planes in space. Discrete & Computational Geometry. 1991;6(1):435-442. doi:10.1007/BF02574700","ieee":"B. Aronov, B. Chazelle, H. Edelsbrunner, L. Guibas, M. Sharir, and R. Wenger, “Points and triangles in the plane and halving planes in space,” Discrete & Computational Geometry, vol. 6, no. 1. Springer, pp. 435–442, 1991.","chicago":"Aronov, Boris, Bernard Chazelle, Herbert Edelsbrunner, Leonidas Guibas, Micha Sharir, and Rephael Wenger. “Points and Triangles in the Plane and Halving Planes in Space.” Discrete & Computational Geometry. Springer, 1991. https://doi.org/10.1007/BF02574700.","ista":"Aronov B, Chazelle B, Edelsbrunner H, Guibas L, Sharir M, Wenger R. 1991. Points and triangles in the plane and halving planes in space. Discrete & Computational Geometry. 6(1), 435–442.","apa":"Aronov, B., Chazelle, B., Edelsbrunner, H., Guibas, L., Sharir, M., & Wenger, R. (1991). Points and triangles in the plane and halving planes in space. Discrete & Computational Geometry. Springer. https://doi.org/10.1007/BF02574700"}}