On the Zero-divisor Cayley Graph of a Finite Commutative Ring
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Abstract:
Let R be a fnite commutative ring and N(R) be the set of non unit elements of R. The non unit graph of R, denoted by Gamma(R), is the graph obtained by setting all the elements of N(R) to be the vertices and defning distinct vertices x and y to be adjacent if and only if x - yin N(R). In this paper, the basic properties of Gamma(R) are investigated and some characterization results regarding connectedness, girth and planarity of Gamma(R) are given.
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Journal title
volume 12 issue None
pages 95- 106
publication date 2017-04
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