Einstein Operators of Bipolar Neutrosophic Soft Matrix and its Application
DOI:
https://doi.org/10.64060/ANMI1V1i3Keywords:
Bipolar neutrosophic soft matrix (BNSM), Einstein sum, Einstein product, Value matrix, Score matrix, Total scoreAbstract
Bipolar neutrosophic soft matrices (BNSMs) are currently a robust area in several industries. Moreover, bipolar neutrosophic soft matrices are a highly regarded topic in many fields of psychology, qualitative reasoning, multiple criteria decision-making, etc.; issues to be solved in a society can be both negative for membership and non-membership and positive for membership and non-membership. In this manuscript, we define Einstein operators on bipolar neutrosophic soft matrices (BNSMs). Certain properties are investigated, like commutative, associative, identities, etc. Finally, we construct commutative monoid designs on BNSM. Moreover, investigate one example that provides us a new way to propose MCDM issues using the Einstein sum operator over BNSM.
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Copyright (c) 2026 P. Punitha Elizabeth (Author)
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