Convexity, geodetic, and hull numbers of the join of graphs
In this paper, we characterize the convex sets in the join of two graphs in a more general setting and determine its convexity number. We also show that a result in [1] concerning the geodetic number of the join of graphs does not always hold. In particular, we show that the geodetic number of the j...
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2006
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oai:animorepository.dlsu.edu.ph:faculty_research-54372022-01-28T07:44:33Z Convexity, geodetic, and hull numbers of the join of graphs Canoy, Sergio R. Cagaanan, Gilbert B. Gervacio, Severino V. In this paper, we characterize the convex sets in the join of two graphs in a more general setting and determine its convexity number. We also show that a result in [1] concerning the geodetic number of the join of graphs does not always hold. In particular, we show that the geodetic number of the join of any two connected non-complete graphs is either 2, 3 or 4. Further, we characterize those joins which yield geodetic number equal to 2 and those with geodetic number equal to 3. Finally, we define and use the concept of 2-path closure absorbing set in a graph to characterize the hull sets in G + Km. We improve and correct a result in [5] by obtaining a more elegant expression for the hull number of the join G + Km̈, where G is a connected non-complete graph. 2006-11-01T08:00:00Z text https://animorepository.dlsu.edu.ph/faculty_research/4606 Faculty Research Work Animo Repository Convex sets Convex domains Mathematics |
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Convex sets Convex domains Mathematics |
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Convex sets Convex domains Mathematics Canoy, Sergio R. Cagaanan, Gilbert B. Gervacio, Severino V. Convexity, geodetic, and hull numbers of the join of graphs |
| description |
In this paper, we characterize the convex sets in the join of two graphs in a more general setting and determine its convexity number. We also show that a result in [1] concerning the geodetic number of the join of graphs does not always hold. In particular, we show that the geodetic number of the join of any two connected non-complete graphs is either 2, 3 or 4. Further, we characterize those joins which yield geodetic number equal to 2 and those with geodetic number equal to 3. Finally, we define and use the concept of 2-path closure absorbing set in a graph to characterize the hull sets in G + Km. We improve and correct a result in [5] by obtaining a more elegant expression for the hull number of the join G + Km̈, where G is a connected non-complete graph. |
| format |
text |
| author |
Canoy, Sergio R. Cagaanan, Gilbert B. Gervacio, Severino V. |
| author_facet |
Canoy, Sergio R. Cagaanan, Gilbert B. Gervacio, Severino V. |
| author_sort |
Canoy, Sergio R. |
| title |
Convexity, geodetic, and hull numbers of the join of graphs |
| title_short |
Convexity, geodetic, and hull numbers of the join of graphs |
| title_full |
Convexity, geodetic, and hull numbers of the join of graphs |
| title_fullStr |
Convexity, geodetic, and hull numbers of the join of graphs |
| title_full_unstemmed |
Convexity, geodetic, and hull numbers of the join of graphs |
| title_sort |
convexity, geodetic, and hull numbers of the join of graphs |
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Animo Repository |
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2006 |
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https://animorepository.dlsu.edu.ph/faculty_research/4606 |
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1767196130434613248 |