论文信息 - SPLITTING NUMBER is NP-complete

SPLITTING NUMBER is NP-complete

We consider two graph invariants that are used as a measure of nonplanarity: the splitting number of a graph and the size of a maximum planar subgraph. The splitting number of a graph G is the smallest integer k 0, such that a planar graph can be obtained from G by k splitting operations. Such operation replaces a vertex v by two nonadjacent vertices v 1 and v 2 , and attaches the neighbors of v either to v 1 or to v 2. We prove that the splitting number decision problem is NP-complete. We obtain as a consequence that planar subgraph remains NP-complete when restricted to graphs with maximum degree 3, when restricted to graphs with no subdivision of K 5 , or when restricted to cubic graphs, problems that have been open since 1979.

Celina M. H. de Figueiredo | Luérbio Faria | Candido Ferreira Xavier de Mendonça Neto | L. Faria | C. M. Figueiredo

[1] Celina M. H. de Figueiredo,et al. The Splitting Number of the 4-Cube , 1998, LATIN.

[2] Stephen A. Cook,et al. The complexity of theorem-proving procedures , 1971, STOC.

[3] C. Kuratowski. Sur le problème des courbes gauches en Topologie , 1930 .

[4] Nora Hartsfield,et al. The splitting number of the complete graph , 1985, Graphs Comb..

[5] G. Ringel,et al. The splitting number of complete bipartite graphs , 1984 .

[6] N Mendonca,et al. A layout system for information system diagrams , 1994 .

[7] David S. Johnson,et al. Crossing Number is NP-Complete , 1983 .

[8] Peter Eades,et al. Vertex Splitting and Tension-Free Layout , 1995, GD.