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In geometry an arrangement of lines is the partition of the plane formed by a collection of lines. Bounds on the complexity of arrangements have been studied in discrete geometry, and computational geometers have found algorithms for the efficient construction of arrangements.
The Sylvester–Gallai theorem in geometry states that every finite set of points in the Euclidean plane has a line that passes through exactly two of the points or a line that passes through all of them. It is named after James Joseph Sylvester, who posed it as a problem in 1893, and Tibor Gallai, who published one of the first proofs of this theorem in 1944.
In combinatorial mathematics, a Levi graph or incidence graph is a bipartite graph associated with an incidence structure. From a collection of points and lines in an incidence geometry or a projective configuration, we form a graph with one vertex per point, one vertex per line, and an edge for every incidence between a point and a line. They are named for Friedrich Wilhelm Levi, who wrote about them in 1942.
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In mathematics, the Reye configuration, introduced by Theodor Reye (1882), is a configuration of 12 points and 16 lines. Each point of the configuration belongs to four lines, and each line contains three points. Therefore, in the notation of configurations, the Reye configuration is written as 124163.
In mathematics, the Cremona–Richmond configuration is a configuration of 15 lines and 15 points, having 3 points on each line and 3 lines through each point, and containing no triangles. It was studied by Cremona (1877) and Richmond (1900). It is a generalized quadrangle with parameters (2,2). Its Levi graph is the Tutte–Coxeter graph.
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In geometry, the Grünbaum–Rigby configuration is a symmetric configuration consisting of 21 points and 21 lines, with four points on each line and four lines through each point. Originally studied by Felix Klein in the complex projective plane in connection with the Klein quartic, it was first realized in the Euclidean plane by Branko Grünbaum and John F. Rigby.
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In geometry, the Miquel configuration is a configuration of eight points and six circles in the Euclidean plane, with four points per circle and three circles through each point. Its Levi graph is the Rhombic dodecahedral graph. The configuration is related to Miquel's theorem.
References
- ↑ Interim Dean, College of Natural Science & Mathematics – Leah Berman, University of Alaska Fairbanks, July 17, 2018, retrieved 2019-08-17CS1 maint: discouraged parameter (link)
- ↑ Grünbaum, Branko (2009), Configurations of points and lines, Graduate Studies in Mathematics, 103, American Mathematical Society, Providence, RI, pp. 351–352, doi:10.1090/gsm/103, ISBN 978-0-8218-4308-6, MR 2510707 CS1 maint: discouraged parameter (link)
- ↑ "Two mathematics professors team up", Positively Charged: News from the College of Natural Science & Mathematics, University of Alaska Fairbanks, p. 5, July 17, 2018, retrieved 2019-08-19CS1 maint: discouraged parameter (link)
- 1 2 3 4 Associate Partners: Leah Wrenn Berman, GReGAS, EuroGIGA Collaborative Research Project, retrieved 2019-08-17CS1 maint: discouraged parameter (link)
- ↑ Harry J. Berman, Ph.D., Interim Chancellor (PDF), University of Illinois at Springfield , retrieved 2019-08-19CS1 maint: discouraged parameter (link)
- ↑ Banas, Casey (May 10, 1993), "Quincy High School Wins Scholastic Bowl", Chicago Tribune
- ↑ Pamplin Society of Fellows, Lewis & Clark College, retrieved 2019-08-19CS1 maint: discouraged parameter (link)
- ↑ Leah Berman at the Mathematics Genealogy Project
- ↑ Williams, Gordon (2018), "Branko Grünbaum, Geometer", Ars Mathematica Contemporanea, 15 (1)
- ↑ McGroarty, Erin (October 2, 2018), "Three women fill open seats on Fairbanks North Star Borough Assembly", Fairbanks Daily News-Miner
- ↑ "Assembly votes for gender-neutral pronouns in ordinance code", Toronto Star, Associated Press, March 2, 2019
