JOURNAL ARTICLE
On Hamilton cycles in certain planar graphs
Year: 1996 Journal: Journal of Graph Theory Vol: 21 (1)Pages: 43-50 Publisher: Wiley
Abstract
Let G be a 2-connected plane graph with outer cycle XG such that for every minimal vertex cut S of G with |S| ≤ 3, every component of G\S contains a vertex of XG. A sufficient condition for G to be Hamiltonian is presented. This theorem generalizes both Tutte's theorem that every 4-connected planar graph is Hamiltonian, as well as a recent theorem of Dillencourt about NST-triangulations. A linear algorithm to find a Hamilton cycle can be extracted from the proof. One corollary is that a 4-connected planar graph with the vertices of a triangle deleted is Hamiltonian. © 1996 John Wiley & Sons, Inc.
Keywords:
Mathematics Combinatorics Planar graph Planar Outerplanar graph 1-planar graph Discrete mathematics Chordal graph Pathwidth Graph Computer science Line graph
Metrics
25
Cited By
1.46
FWCI (Field Weighted Citation Impact)
0
Refs
0.84
Citation Normalized Percentile
Is in top 1%
Is in top 10%
Citation History
Topics
Advanced Graph Theory Research
Physical Sciences → Computer Science → Computational Theory and Mathematics
Graph theory and applications
Physical Sciences → Mathematics → Geometry and Topology
graph theory and CDMA systems
Physical Sciences → Engineering → Electrical and Electronic Engineering
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