THE STRONG 3-RAINBOW INDEX OF SOME GRAPHS AND CERTAIN GRAPHS FORMED BY GRAPH OPERATIONS
Let G be a simple connected graph of order n with an h-edge coloring c : E(G) ! f1; 2; : : : ; hg, h 2 N, where adjacent edges may be colored the same. Let k be an integer with k 2 f2; 3; : : : ; ng. A tree T in G is a rainbow tree if no two edges of T have the same color. Let S V (G) with jSj =...
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id-itb.:519642021-01-05T09:18:28ZTHE STRONG 3-RAINBOW INDEX OF SOME GRAPHS AND CERTAIN GRAPHS FORMED BY GRAPH OPERATIONS Yumni Awanis, Zata Indonesia Dissertations graph operation, rainbow coloring, rainbow tree, strong 3-rainbow index. INSTITUT TEKNOLOGI BANDUNG https://digilib.itb.ac.id/gdl/view/51964 Let G be a simple connected graph of order n with an h-edge coloring c : E(G) ! f1; 2; : : : ; hg, h 2 N, where adjacent edges may be colored the same. Let k be an integer with k 2 f2; 3; : : : ; ng. A tree T in G is a rainbow tree if no two edges of T have the same color. Let S V (G) with jSj = k. An h-edge coloring c of G is called a strong k-rainbow h-edge coloring of G if for every set S of G, there exists a rainbow tree with minimum size containing S. The strong k-rainbow index of G, denoted by srxk(G), is the minimum h such that G admits a strong k-rainbow h-edge coloring. The strong k-rainbow index has an interesting application in the security of information exchange in a communication network. For example, if it is desired to exchange information between k people safely, then each line which connects them must be assigned by some passwords so that no password is repeated. The minimum number of passwords needed in a communication network so that every k people is connected by a secure and short line is represented by the strong k-rainbow index of a graph. Determining the strong k-rainbow index of any graph is NP-Complete. Hence, this dissertation is focused on strong 3-rainbow index. We characterize certain graphs having strong 3-rainbow index which is equal to 2. We also determine the strong 3-rainbow index of some graphs and certain graphs formed by graph operations, such as such as edge-amalgamation, vertex-comb product, edge-comb product, and corona product. Graph operations have an important role in forming a larger and complex communication network. text |
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Let G be a simple connected graph of order n with an h-edge coloring c : E(G) !
f1; 2; : : : ; hg, h 2 N, where adjacent edges may be colored the same. Let k be an
integer with k 2 f2; 3; : : : ; ng. A tree T in G is a rainbow tree if no two edges
of T have the same color. Let S V (G) with jSj = k. An h-edge coloring c of
G is called a strong k-rainbow h-edge coloring of G if for every set S of G, there
exists a rainbow tree with minimum size containing S. The strong k-rainbow index
of G, denoted by srxk(G), is the minimum h such that G admits a strong k-rainbow
h-edge coloring.
The strong k-rainbow index has an interesting application in the security of information
exchange in a communication network. For example, if it is desired to
exchange information between k people safely, then each line which connects them
must be assigned by some passwords so that no password is repeated. The minimum
number of passwords needed in a communication network so that every k people is
connected by a secure and short line is represented by the strong k-rainbow index
of a graph.
Determining the strong k-rainbow index of any graph is NP-Complete. Hence, this
dissertation is focused on strong 3-rainbow index. We characterize certain graphs
having strong 3-rainbow index which is equal to 2. We also determine the strong
3-rainbow index of some graphs and certain graphs formed by graph operations,
such as such as edge-amalgamation, vertex-comb product, edge-comb product, and
corona product. Graph operations have an important role in forming a larger and
complex communication network. |
| format |
Dissertations |
| author |
Yumni Awanis, Zata |
| spellingShingle |
Yumni Awanis, Zata THE STRONG 3-RAINBOW INDEX OF SOME GRAPHS AND CERTAIN GRAPHS FORMED BY GRAPH OPERATIONS |
| author_facet |
Yumni Awanis, Zata |
| author_sort |
Yumni Awanis, Zata |
| title |
THE STRONG 3-RAINBOW INDEX OF SOME GRAPHS AND CERTAIN GRAPHS FORMED BY GRAPH OPERATIONS |
| title_short |
THE STRONG 3-RAINBOW INDEX OF SOME GRAPHS AND CERTAIN GRAPHS FORMED BY GRAPH OPERATIONS |
| title_full |
THE STRONG 3-RAINBOW INDEX OF SOME GRAPHS AND CERTAIN GRAPHS FORMED BY GRAPH OPERATIONS |
| title_fullStr |
THE STRONG 3-RAINBOW INDEX OF SOME GRAPHS AND CERTAIN GRAPHS FORMED BY GRAPH OPERATIONS |
| title_full_unstemmed |
THE STRONG 3-RAINBOW INDEX OF SOME GRAPHS AND CERTAIN GRAPHS FORMED BY GRAPH OPERATIONS |
| title_sort |
strong 3-rainbow index of some graphs and certain graphs formed by graph operations |
| url |
https://digilib.itb.ac.id/gdl/view/51964 |
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