標題: Cubic 1-fault-tolerant hamiltonian graphs, Globally 3*-connected graphs, and Super 3-spanning connected graphs
作者: Kao, Shin-Shin
Huang, Hua-Min
Hsu, Kung-Ming
Hsu, Lih-Hsing
資訊工程學系
Department of Computer Science
關鍵字: hamiltonian;connectivity;Menger Theorem
公開日期: 1-七月-2013
摘要: A k-container C(u,v) in a graph G is a set of k internal vertex-disjoint paths between vertices u and v. A k*-container C(u,v) of G is a k-container such that C(u, v) contains all vertices of G. A graph is globally k*-connected if there exists a k*-container C(u, v) between any two distinct vertices u and v. A k-regular graph G is super k-spanning connected if G is i*-connected for 1 <= i <= k. A graph G is 1-fault-tolerant hamiltonian if G F is hamiltonian for any F subset of V boolean OR E and vertical bar F vertical bar = 1. In this paper, we prove that for cubic graphs, every super 3-spanning connected graph is globally 3*-connected and every globally 3*-connected graph is 1-faulttolerant hamiltonian. We present some examples of super 3-spanning connected graphs, some examples of globally 3*-connected graphs that are not super 3-spanning connected graphs, some examples of 1-fault-tolerant hamiltonian graphs that are globally 1*-connected but not globally 3*-connected, and some examples of 1-fault-tolerant hamiltonian that are neither globally 1*-connected nor globally 3*-connected. Furthermore, we prove that there are infinitely many graphs in each such family.
URI: http://hdl.handle.net/11536/22218
ISSN: 0381-7032
期刊: ARS COMBINATORIA
Volume: 110
Issue: 
起始頁: 301
結束頁: 322
顯示於類別:期刊論文