Pelabelan Total Super ($a,d$) - Face Antimagic dari Graf Shackle ($C_5,e,n$)
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Date
2016-02-18Author
Siska Binastuti., Dafik., Arif Fatahillah
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Let $G$ be a simple graph of order $p$, size $q$ and face $r$. The
graph $G$ is called a super ($a,d$) - face antimagic total labeling
, if there exist a bijection $f:V(G)\cup E(G)\cup F(G)$ $\rightarrow
\{1,2,...,p+q+r\}$ such that the set of $s$-sided face weights,
$W_{s} = \{a_{s},a_{s}+d,a_{s}+2d,...,a_{s}+(r_{s}-1)d\}$ form an
arithmetic sequence with first term $a$,common difference $d$, where
$a$ and $d$ are positive integers $s$ and $r_{s}$ is the number of
$s$-sided faces. Such a graph is called super if the smallest
possible labels appear on the vertices. The type of Face Antimagic
Labeling is (1,1,1). In this paper we will study a Super $(a,d)$ -
Face Antimagic of Shackle ($C_5,e,n$) Graph and we will use it to
develop a polyalphabetic chyptosystem.
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- LSP-Jurnal Ilmiah Dosen [7301]