Contemporary Mathematics and Applications (ConMathA)
Vol. 6 No. 2 (2024)

Rainbow Connection on Amal(Fn,xz,m) Graphs and Amal(On,xz,m) Graphs

Muhammad Usaid Hudloir (Unknown)
Dafik (Unknown)
Adawiyah, Robiatul (Unknown)
Rafiantika Megahnia Prihandini (Unknown)
Arika Indah Kristiana (Unknown)

Article Info

Publish Date
06 Oct 2024

Abstract

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.

Copyrights © 2024




Citation Download
RIS
EndNote, Reference Manager, ProCite
BibTex
Latex, Jabref
Original Source
Download Original
Google Scholar
Check in Google Scholar
Journal Info
Contemporary Mathematics and Applications (ConMathA)
Website

Abbrev

CONMATHA

Publisher

Universitas Airlangga

Subject

Materials Science & Nanotechnology Mathematics

Description

Contemporary Mathematics and Applications welcome research articles in the area of mathematical analysis, algebra, optimization, mathematical modeling and its applications include but are not limited to the following topics: general mathematics, mathematical physics, numerical analysis, ...