Super (a,d)-$H$- antimagic total covering of connected amalgamation of fan graph
Abstract
Graph $G=(V,E)$ is a finite, simple and undirected.
Graph $G$ have $H'$ covering, if every edge in $E(G)$ belongs to at least
one subgraph of $G$ isomorphic to a given graph $H$. A graph $G$ is
said to be an $(a, d)$-$H$-antimagic total covering if there exist a
bijective function $f: V(G) \cup E(G) \rightarrow \{1, 2,\dots ,|V
(G)| + |E(G)|\}$ such that for all subgraphs $H'$ isomorphic to $H$,
the total $H$-weights $w(H)= \sum_{v\in V(H')}f(v)+\sum_{e\in
E(H')}f(v)$ form an arithmetic sequence $\{a, a + d, a +2d,...,a+(s
- 1)d\}$, where $a$ and $d$ are positive integers and $s$ is the
number of all subgraphs $H'$ isomorphic to $H$. Such a covering is
called super if $f: V(G) \rightarrow \{1, 2,\dots ,|V (G)|\}$. This paper will study the existence of super $(a, d)-H$- antimagic total covering of connected amalgamation of fan graph for feasible $d$.
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- LSP-Jurnal Ilmiah Dosen [7302]