Construction of Fullerenes and Pogorelov Polytopes with 5-, 6- and one 7-Gonal Face
A Pogorelov polytope is a combinatorial simple 3-polytope realizable in the Lobachevsky (hyperbolic) space as a bounded right-angled polytope. These polytopes are exactly simple 3-polytopes with cyclically 5-edge connected graphs. A Pogorelov polytope has no 3- and 4-gons and may have any prescribed...
Main Author: | Nikolai Erokhovets |
---|---|
Format: | Article |
Language: | English |
Published: |
MDPI AG
2018-03-01
|
Series: | Symmetry |
Subjects: | |
Online Access: | http://www.mdpi.com/2073-8994/10/3/67 |
Similar Items
-
New Expansion for Certain Isomers of Various Classes of Fullerenes
by: Morteza Faghani, et al.
Published: (2017-06-01) -
The Structural Properties of (2, 6)-Fullerenes
by: Rui Yang, et al.
Published: (2023-11-01) -
Polytopes, graphs and optimisation /
by: Yemelichev, V. A. (Vladimir Alekseevich), et al.
Published: (1981) -
Sufficient Conditions for Maximally Edge-Connected and Super-Edge-Connected Graphs Depending on The Clique Number
by: Volkmann Lutz
Published: (2019-05-01) -
Ehrhart Polynomials of a Cyclic Polytopes
by: Shatha Assaad Salman, et al.
Published: (2009-10-01)