Some results on secure domination in zero-divisor graphs

A. Mohamed Ali, S. Rajkumar

Abstract


Let Γ(G) = (V(Γ(G)),E(Γ(G))) be a zero-divisor graph. A dominating set S of V(Γ(G)) is a secure dominating set of Γ(G) if for every vertex x ∈V(Γ(G))−S, there exists y ∈ NΓ(G) (x)∩S such that (S−{y})∪{x} is a domination set. The minimum cardinality of a secure dominating set of Γ(G) is called secure domination number. In this paper, the secure domination number of zero-divisor graphs is obtained and also studied the structure of this parameter in Γ(Zn).

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Published: 2021-06-15

How to Cite this Article:

A. Mohamed Ali, S. Rajkumar, Some results on secure domination in zero-divisor graphs, J. Math. Comput. Sci., 11 (2021), 4799-4809

Copyright © 2021 A. Mohamed Ali, S. Rajkumar. This is an open access article distributed under the Creative Commons Attribution License, which permits unrestricted use, distribution, and reproduction in any medium, provided the original work is properly cited.

 

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