论文信息 - Regular Polytopes of Full Rank

Regular Polytopes of Full Rank

Abstract The dimension of a faithful realization of a finite abstract regular polytope in some euclidean space is no smaller than its rank. Similarly, that of a discrete faithful realization of a regular apeirotope is at least one fewer than the rank. Realizations which attain the minimum are said to be of full rank. The regular polytopes and apeirotopes of full rank in two and three dimensions were classified in an earlier paper. In this paper these polytopes and apeirotopes are classified in all dimensions. Moreover, it is also shown that there are no chiral polytopes of full rank.

Peter McMullen | P. McMullen

[1] Andreas W. M. Dress,et al. A combinatorial theory of Grünbaum's new regular polyhedra, Part II: Complete enumeration , 1985 .

[2] Peter McMullen,et al. Regular Polytopes in Ordinary Space , 1997, Discret. Comput. Geom..

[3] Andreas W. M. Dress,et al. A combinatorial theory of Grünbaum's new regular polyhedra, part I: Grünbaum's new regular polyhedra and their automorphism group , 1981 .

[4] Egon Schulte,et al. Chiral Polyhedra in Ordinary Space, I , 2004, Discret. Comput. Geom..

[5] P. McMullen,et al. Abstract Regular Polytopes , 2003, Geometric Regular Polytopes.

[6] Branko Grünbaum. Regular Polyhedra—Old and New , 1977 .