on annihilator graph of a finite commutative ring
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abstract
the annihilator graph $ag(r)$ of a commutative ring $r$ is a simple undirected graph with the vertex set $z(r)^*$ and two distinct vertices are adjacent if and only if $ann(x) cup ann(y)$ $ neq $ $ann(xy)$. in this paper we give the sufficient condition for a graph $ag(r)$ to be complete. we characterize rings for which $ag(r)$ is a regular graph, we show that $gamma (ag(r))in {1,2}$ and we also characterize the rings for which $ag(r)$ has a cut vertex. finally we find the clique number of a finite reduced ring and characterize the rings for which $ag(r)$ is a planar graph.
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Journal title:
transactions on combinatoricsجلد ۶، شماره ۱، صفحات ۱-۱۱
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