论文信息 - Spiral hexagonal circle packings in the plane

Spiral hexagonal circle packings in the plane

We discuss an intriguing geometric algorithm which generates infinite spiral patterns of packed circles in the plane. Using Kleinian group and covering theory, we construct a complex parametrization of all such patterns and characterize those whose circles have mutually disjoint interiors. We prove that these ‘coherent’ spirals, along with the regular hexagonal packing, give all possible hexagonal circle packings in the plane. Several examples are illustrated.

[1] B. Maskit,et al. On Poincaré's theorem for fundamental polygons , 1971 .

[2] A. Beardon. The Geometry of Discrete Groups , 1995 .

[3] B. Rodin,et al. The convergence of circle packings to the Riemann mapping , 1987 .

[4] E. H. Lockwood,et al. A Book of Curves , 1963, The Mathematical Gazette.

[5] F. Rothen,et al. Phyllotaxis or the properties of spiral lattices. - II. Packing of circles along logarithmic spirals , 1989 .

[6] Oded Schramm,et al. Rigidity of Infinite (Circle) Packings , 1991 .