论文信息 - Generalizing Ham Sandwich Cuts to Equitable Subdivisions

Generalizing Ham Sandwich Cuts to Equitable Subdivisions

We prove a generalization of the famous Ham Sandwich Theorem for the plane. Given gn red points and gm blue points in the plane in general position, there exists an equitable subdivision of the plane into g disjoint convex polygons, each of which contains n red points and m blue points. For g = 2 this problem is equivalent to the Ham Sandwich Theorem in the plane. We also present an efficient algorithm for constructing an equitable subdivision.

[1] William L. Steiger,et al. Algorithms for ham-sandwich cuts , 1994, CCCG.

[2] R. Živaljević,et al. An Extension of the Ham Sandwich Theorem , 1990 .

[3] Raimund Seidel,et al. Constructing Arrangements of Lines and Hyperplanes with Applications , 1986, SIAM J. Comput..

[4] Jan van Leeuwen,et al. Maintenance of Configurations in the Plane , 1981, J. Comput. Syst. Sci..

[5] I. Bárány. Geometric and Combinatorial Applications of Borsuk’s Theorem , 1993 .

[6] Jirí Matousek,et al. Ham-sandwich cuts in Rd , 1992, STOC '92.

[7] Herbert Edelsbrunner,et al. Computing a Ham-Sandwich Cut in Two Dimensions , 1986, J. Symb. Comput..

[8] A. Björner. Topological methods , 1996 .

[9] Tamal K. Dey,et al. Improved Bounds for Planar k -Sets and Related Problems , 1998, Discret. Comput. Geom..

[10] Mitsuo Yokoyama,et al. 2-Dimension Ham Sandwich Theorem for Partitioning into Three Convex Pieces , 1998, JCDCG.

[11] Herbert Edelsbrunner,et al. Constructing Belts in Two-Dimensional Arrangements with Applications , 1986, SIAM J. Comput..

[12] Mikio Kano,et al. Balanced partitions of two sets of points in the plane , 1999, Comput. Geom..