On the set chromatic number of the join and comb product of graphs
A vertex coloring c : V(G) → of a non-trivial connected graph G is called a set coloring if NC(u) ≠ NC(v) for any pair of adjacent vertices u and v. Here, NC(x) denotes the set of colors assigned to vertices adjacent to x. The set chromatic number of G, denoted by χs (G), is defined as the fewest n...
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Archīum Ateneo
2020
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ph-ateneo-arc.mathematics-faculty-pubs-11232020-07-10T06:34:29Z On the set chromatic number of the join and comb product of graphs Felipe, Bryan Ceasar L Garciano, Agnes Tolentino, Mark Anthony C A vertex coloring c : V(G) → of a non-trivial connected graph G is called a set coloring if NC(u) ≠ NC(v) for any pair of adjacent vertices u and v. Here, NC(x) denotes the set of colors assigned to vertices adjacent to x. The set chromatic number of G, denoted by χs (G), is defined as the fewest number of colors needed to construct a set coloring of G. In this paper, we study the set chromatic number in relation to two graph operations: join and comb prdocut. We determine the set chromatic number of wheels and the join of a bipartite graph and a cycle, the join of two cycles, the join of a complete graph and a bipartite graph, and the join of two bipartite graphs. Moreover, we determine the set chromatic number of the comb product of a complete graph with paths, cycles, and large star graphs. 2020-01-01T08:00:00Z text application/pdf https://archium.ateneo.edu/mathematics-faculty-pubs/124 https://archium.ateneo.edu/cgi/viewcontent.cgi?article=1123&context=mathematics-faculty-pubs Mathematics Faculty Publications Archīum Ateneo Mathematics |
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Mathematics Felipe, Bryan Ceasar L Garciano, Agnes Tolentino, Mark Anthony C On the set chromatic number of the join and comb product of graphs |
| description |
A vertex coloring c : V(G) → of a non-trivial connected graph G is called a set coloring if NC(u) ≠ NC(v) for any pair of adjacent vertices u and v. Here, NC(x) denotes the set of colors assigned to vertices adjacent to x. The set chromatic number of G, denoted by χs (G), is defined as the fewest number of colors needed to construct a set coloring of G. In this paper, we study the set chromatic number in relation to two graph operations: join and comb prdocut. We determine the set chromatic number of wheels and the join of a bipartite graph and a cycle, the join of two cycles, the join of a complete graph and a bipartite graph, and the join of two bipartite graphs. Moreover, we determine the set chromatic number of the comb product of a complete graph with paths, cycles, and large star graphs. |
| format |
text |
| author |
Felipe, Bryan Ceasar L Garciano, Agnes Tolentino, Mark Anthony C |
| author_facet |
Felipe, Bryan Ceasar L Garciano, Agnes Tolentino, Mark Anthony C |
| author_sort |
Felipe, Bryan Ceasar L |
| title |
On the set chromatic number of the join and comb product of graphs |
| title_short |
On the set chromatic number of the join and comb product of graphs |
| title_full |
On the set chromatic number of the join and comb product of graphs |
| title_fullStr |
On the set chromatic number of the join and comb product of graphs |
| title_full_unstemmed |
On the set chromatic number of the join and comb product of graphs |
| title_sort |
on the set chromatic number of the join and comb product of graphs |
| publisher |
Archīum Ateneo |
| publishDate |
2020 |
| url |
https://archium.ateneo.edu/mathematics-faculty-pubs/124 https://archium.ateneo.edu/cgi/viewcontent.cgi?article=1123&context=mathematics-faculty-pubs |
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