论文信息 - Closed 2-cell embeddings of graphs with no V8-minors

Closed 2-cell embeddings of graphs with no V8-minors

Abstract A closed 2-cell embedding of a graph embedded in some surface is an embedding such that each face is bounded by a cycle in the graph. The strong embedding conjecture says that every 2-connected graph has a closed 2-cell embedding in some surface. In this paper, we prove that any 2-connected graph without V 8 (the Mobius 4-ladder) as a minor has a closed 2-cell embedding in some surface. As a corollary, such a graph has a cycle double cover. The proof uses a classification of internally-4-connected graphs with no V 8 -minor (due to Kelmans and independently Robertson), and the proof depends heavily on such a characterization.

Neil Robertson | Xiaoya Zha

[1] Xiaoya Zha. The closed 2-cell embeddings of 2-connected doubly toroidal graphs , 1995, Discret. Math..

[2] Seiya Negami. Re-embedding of projective-planar graphs , 1988, J. Comb. Theory, Ser. B.

[3] Cun-Quan Zhang,et al. Cycle covers of cubic multigraphs , 1993, Discret. Math..

[4] C. Godsil,et al. Cycles in graphs , 1985 .

[5] Cun-Quan Zhang. On embeddings of graphs containing no K5-minor , 1996, J. Graph Theory.

[6] Paul D. Seymour,et al. Circular embeddings of planar graphs in nonspherical surfaces , 1994, Discret. Math..

[7] Cun-Quan Zhang. On embeddings of graphs containing no K 5 -minor , 1996 .