论文信息 - Reducing an arbitrary fullerene to the dodecahedron

Reducing an arbitrary fullerene to the dodecahedron

Abstract Viewing fullerenes as plane graphs with facial cycles being pentagonal and hexagonal only, it is shown how to reduce an arbitrary fullerene to the (graph of the) dodecahedron. This can be achieved by a sequence of eight reduction steps, seven of which are local operations and the remaining reduction step acts globally. In any case, the resulting algorithm has polynomial running time.

Herbert Fleischner

[1] Brendan D. McKay,et al. The Generation of Fullerenes , 2012, J. Chem. Inf. Model..

[2] Tomislav Došlić,et al. Cyclical Edge-Connectivity of Fullerene Graphs and (k, 6)-Cages , 2003 .

[3] Brendan D. McKay,et al. Recursive generation of IPR fullerenes , 2015, Journal of Mathematical Chemistry.

[4] Branko Grünbaum,et al. The Number of Hexagons and the Simplicity of Geodesics on Certain Polyhedra , 1963, Canadian Journal of Mathematics.

[5] Brendan D. McKay,et al. A universal set of growth operations for fullerenes , 2008 .