论文信息 - Computer solution to the 17-point Erdős-Szekeres problem

Computer solution to the 17-point Erdős-Szekeres problem

We describe a computer proof of the 17-point version of a conjecture originally made by Klein-Szekeres in 1932 (now commonly known as the "Happy End Problem") that a planar configuration of 17 points, no 3 points collinear, always contains a convex 6-subset. The proof makes use of a combinatorial model of planar configurations, expressed in terms of signature functions satisfying certain simple necessary conditions. The proof is more general than the original conjecture as the signature functions examined represent a larger set of configurations than those which are realisable. Three independent implementations of the computer proof have been developed, establishing that the result is readily reproducible.

George Szekeres | G. Szekeres | G. Szekeres | L. A. Peters | Lindsay Andrew Peters

[1] V. Soltan,et al. The Erdos-Szekeres problem on points in convex position – a survey , 2000 .

[2] Richard M. Wilson,et al. A course in combinatorics , 1992 .

[3] Esther E. Klein,et al. On some extremum problems in elementary geometry , 2006 .

[4] Fan Chung Graham,et al. Forced Convex n -Gons in the Plane , 1998, Discret. Comput. Geom..

[5] Donald E. Knuth,et al. Axioms and Hulls , 1992, Lecture Notes in Computer Science.

[6] The Erdős – Szekeres Theorem : Upper Bounds and Related Results , 2004 .

[7] W. Bonnice,et al. On Convex Polygons Determined by a Finite Planar Set , 1974 .