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Let be a finite collection of simple, nontrivial and undirected graphs. A graph is as antimagic total covering if there is bijectif function for every subgraph in which isomorfic to and the total weight, form arithmetic sequence , in which a,b are integers and n is a number of graph cover of which the result of total comb product operation. A antimagic total covering is as "super" if smallest label is used for vertex labelling. The way for labelling a graph this time, using a knight move partition techniques application. The graph use total comb product operation . Take a copy of and a number of , then put the copy of -sequence in graph vertex to -sequence vertex of and put the copy of -sequence in graft edge to -sequence edge of is definition of total comb product. In this article, will be investigated about Knight Move Partition Techniques Application in Labelling Super Antimagic Total Covering for Any Two Graphs and Its Application (in Constructing Ciphertext). |
