论文信息 - Every Simple Arrangement of n Lines Contains an Inducing Simple n-gon

Every Simple Arrangement of n Lines Contains an Inducing Simple n-gon

Abstract We show that for any arrangement A of n ≥ 3 lines in general position in the plane there exists a simple closed polygon with n edges having the property that every edge of the polygon lies on a distinct line of A.

Rom Pinchasi | Ludmila Scharf | Eyal Ackerman | Marc Scherfenberg

[1] B. Grünbaum. Arrangements and Spreads , 1972 .

[2] Leon W. Cohen,et al. Conference Board of the Mathematical Sciences , 1963 .

[3] Stefan Felsner,et al. Geometric Graphs and Arrangements - Some Chapters from Combinatorial Geometry , 2004, Advanced lectures in mathematics.

[4] Ludmila Scharf,et al. Inducing Polygons of Line Arrangements , 2008, Int. J. Comput. Geom. Appl..

[5] Stefan Felsner,et al. Geometric Graphs and Arrangements , 2004 .

[6] P.,et al. Properties of Arrangement Graphs , 2007 .

[7] Rom Pinchasi,et al. On inducing polygons and related problems , 2009, Comput. Geom..