Please use this identifier to cite or link to this item: http://13.232.72.61:8080/jspui/handle/123456789/914
Title: Hamiltonian Laceability in Line Graphs.
Authors: Manjunatha, G.
Murali, R.
Girisha, A.
Keywords: Mathematics
Connected graph
Sun let graph
Helm graph
Issue Date: Jul-2014
Publisher: International Journal of Computer Applications
Citation: Manjunatha, G., Murali, R., & Girisha, (2014). A hamiltonian laceability in line graphs. International Journal of Computer Applications, 98(12), 17-25.
Abstract: A Connected graph G is a Hamiltonian laceable if there exists in G a Hamiltonian path between every pair of vertices in G at an odd distance. G is a Hamiltonian-t-Laceable (Hamiltoniant*- Laceable) if there exists in G a Hamiltonian path between every pair (at least one pair) of vertices at distance‘t’ in G. 1≤ t ≤ diamG. In this paper we explore the Hamiltonian-t*- laceability number ( * ) t  of graph L (G) i.e., Line Graph of G and also explore Hamiltonian-t*-Laceable of Line Graphs of Sunlet graph, Helm graph and Gear graph for t=1,2 and 3.
URI: http://13.232.72.61:8080/jspui/handle/123456789/914
ISSN: 0975 – 8887
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