Split and Non-Split Domination on Anti Fuzzy Graph

Abdul Muneera and Dr.T. Nageswara Rao

The resolution of this article is to discuss the importance of Anti Fuzzy Graphs. The intense exertions of scientists are perceivable in the applicable creation of the theme participating understandable practicality and certainty. Fuzzy logic is announced to study the ambiguity of the incident by assigning a system of membership principles to the elements of the universal set ranging from 0 to 1. In this article we familiarized the thought of Split and Non-Split Domination on Anti Fuzzy Graph. Dominating sets have a vital function regarding the scheme of fuzzy graphs. A dominating set S of an Anti-fuzzy graph be a “Split dominating set” whether encouraged Anti fuzzy sub graph H = ( , , ) is detached. The minimum fuzzy cardinality of a split dominating set of Anti fuzzy graph is signified by ( ) We explored about Strong domination and weak domination in Anti fuzzy graphs and total dominations in Anti fuzzy graphs. Some results are derived to various dominations in Anti fuzzy graphs. Fuzzy graphs initiate an increasing amount of submissions in existing science wherever the evidence central in the system diverges with dissimilar stages of correctness.

Volume 12 | Issue 4

Pages: 86-92

DOI: 10.5373/JARDCS/V12I4/20201421