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Rainbow Connection on Amal(Fn,xz,m) Graphs and Amal(On,xz,m) Graphs
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Coloring graph is giving a color to a set of vertices and a set of edges on a graph. The condition for coloring a graph is that each color is different for each neighboring member graph. Coloring graph can be done by mapping a different color to each vertex or edge. Rainbow coloring is a type of rainbow connected with coloring edge. It ensures that every graph G has a rainbow path. A rainbow path is a path in a graph where no two vertices have the same color. The minimum number of colors in a rainbow connected graph is called the rainbow connection number denoted by rc(G). The graphs used in this study are the Amal(Fn,xz,m) graph and the Amal(On,xz,m) graph.
Title: Rainbow Connection on Amal(Fn,xz,m) Graphs and Amal(On,xz,m) Graphs
Description:
Coloring graph is giving a color to a set of vertices and a set of edges on a graph.
The condition for coloring a graph is that each color is different for each neighboring member graph.
Coloring graph can be done by mapping a different color to each vertex or edge.
Rainbow coloring is a type of rainbow connected with coloring edge.
It ensures that every graph G has a rainbow path.
A rainbow path is a path in a graph where no two vertices have the same color.
The minimum number of colors in a rainbow connected graph is called the rainbow connection number denoted by rc(G).
The graphs used in this study are the Amal(Fn,xz,m) graph and the Amal(On,xz,m) graph.
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