THE RAINBOW TOTAL-CONNECTION NUMBER OF AMALGAMATION OF SOME GRAPHS

THE RAINBOW TOTAL-CONNECTION NUMBER OF AMALGAMATION OF SOME GRAPHS

All graph considered in this thesis are finite, simple, and undirected. Let G = (V (G);E(G)) be a nontrivial connected graph and k be a natural number. A mapping c : V (G) U E(G) ->f(1; 2; .... ; k) is called a rainbow total-k-coloring if any two vertices x and y in V (G) there exists a x-y p...

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Main Author: Arbain
Format: Theses
Language:Indonesia
Subjects:
Matematika
Online Access:https://digilib.itb.ac.id/gdl/view/34768
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Institution: Institut Teknologi Bandung
Language: Indonesia
id id-itb.:34768
spelling id-itb.:347682019-02-14T15:02:22ZTHE RAINBOW TOTAL-CONNECTION NUMBER OF AMALGAMATION OF SOME GRAPHS Arbain Matematika Indonesia Theses amalgamation of graphs, rainbow total-connected. INSTITUT TEKNOLOGI BANDUNG https://digilib.itb.ac.id/gdl/view/34768 All graph considered in this thesis are finite, simple, and undirected. Let G = (V (G);E(G)) be a nontrivial connected graph and k be a natural number. A mapping c : V (G) U E(G) ->f(1; 2; .... ; k) is called a rainbow total-k-coloring if any two vertices x and y in V (G) there exists a x-y path with all edges and internal vertices have distinct colors. The path like that is called a rainbow total-path. Graph G is called rainbow total-connected if any two vertices x and y in V (G) there exist a rainbow total-path x - y. The rainbow total- connection number of G, denoted by trc(G), is the smallest number of colors needed to make G rainbow total-connected. Let t be a natural number with t - 2. Let fGiji 2 [1; t]g be a finite collection of graphs and each Gi has a fixed vertex v0i called a terminal. The amalgamation Amal(Gi; v0i; t) is a graph formed by taking all the Gi 's and identifying their terminals. In this thesis is determined lower and upper bounds for the total-rainbow connection number of an amalgamation graph. Additionally, we determine the total- rainbow connection number of amalgamation of trees, ladders, helms, and complete graphs. text
institution Institut Teknologi Bandung
building Institut Teknologi Bandung Library
continent Asia
country Indonesia
Indonesia
content_provider Institut Teknologi Bandung
collection Digital ITB
language Indonesia
topic Matematika
spellingShingle Matematika
Arbain
THE RAINBOW TOTAL-CONNECTION NUMBER OF AMALGAMATION OF SOME GRAPHS
description All graph considered in this thesis are finite, simple, and undirected. Let G = (V (G);E(G)) be a nontrivial connected graph and k be a natural number. A mapping c : V (G) U E(G) ->f(1; 2; .... ; k) is called a rainbow total-k-coloring if any two vertices x and y in V (G) there exists a x-y path with all edges and internal vertices have distinct colors. The path like that is called a rainbow total-path. Graph G is called rainbow total-connected if any two vertices x and y in V (G) there exist a rainbow total-path x - y. The rainbow total- connection number of G, denoted by trc(G), is the smallest number of colors needed to make G rainbow total-connected. Let t be a natural number with t - 2. Let fGiji 2 [1; t]g be a finite collection of graphs and each Gi has a fixed vertex v0i called a terminal. The amalgamation Amal(Gi; v0i; t) is a graph formed by taking all the Gi 's and identifying their terminals. In this thesis is determined lower and upper bounds for the total-rainbow connection number of an amalgamation graph. Additionally, we determine the total- rainbow connection number of amalgamation of trees, ladders, helms, and complete graphs.
format Theses
author Arbain
author_facet Arbain
author_sort Arbain
title THE RAINBOW TOTAL-CONNECTION NUMBER OF AMALGAMATION OF SOME GRAPHS
title_short THE RAINBOW TOTAL-CONNECTION NUMBER OF AMALGAMATION OF SOME GRAPHS
title_full THE RAINBOW TOTAL-CONNECTION NUMBER OF AMALGAMATION OF SOME GRAPHS
title_fullStr THE RAINBOW TOTAL-CONNECTION NUMBER OF AMALGAMATION OF SOME GRAPHS
title_full_unstemmed THE RAINBOW TOTAL-CONNECTION NUMBER OF AMALGAMATION OF SOME GRAPHS
title_sort rainbow total-connection number of amalgamation of some graphs
url https://digilib.itb.ac.id/gdl/view/34768
_version_ 1821996803176792064

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