CGANT JOURNAL OF MATHEMATICS AND APPLICATIONS
Vol 1, No 1 (2020): CGANT JOURNAL OF MATHEMATICS AND APPLICATIONS

Analysis Super (a; d)-S3 Antimagic Total Dekomposition of Helm Graph Connektive for Developing Ciphertext

Kholifatur Rosyidah (Unknown)
Dafik Dafik (Unknown)
Susi Setiawani (Unknown)

Article Info

Publish Date
02 Jun 2020

Abstract

Covering of G is H = fH1; H2; H3; :::; Hkg subgraph family from G with every edges on G admit on at least one graph Hi for a i 2 f1; 2; :::; kg. If every i 2 f1; 2; :::; k g, Hi isomorphic with a subgraph H, then H said cover-H of G. Furthermore, if cover-H of G have a properties is every edges G contained on exactly one graph Hi for a i 2 f1; 2; :::; kg, then cover-H is called decomposition-H. In this case, G is said to contain decomposition-H. A graph G(V; E) is called (a; d)-H total decomposition if every edges E is sub graph of G isomorphic of H. In this research will be analysis of super (a; d)-S3 total decomposition of connective helm graph to developing ciphertext.Key Word : Super (a; d)-S3, Dekomposisi, Graf helm, dan Ciphertext 

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Journal Info
CGANT JOURNAL OF MATHEMATICS AND APPLICATIONS
Website

Abbrev

cgant

Publisher

Universitas Jember

Subject

Computer Science & IT Other

Description

Subjects suitable for publication include, the following fields of: Degree Diameter Problem in Graph Theory Large Graphs in Computer Science Mathematical Computation of Graph Theory Graph Coloring in Atomic and Molecular Graph Labeling in Coding Theory and Cryptography Dimensions of graphs on ...