Volume 26 , Issue 1 , PP: 234-242, 2025 | Cite this article as | XML | Html | PDF | Full Length Article
D. Mahendar 1 , R. Balaji 2 , Nasreen kausar 3 , Tonguc Cagin 4 *
Doi: https://doi.org/10.54216/IJNS.260120
In this work, we present novel techniques for the reciprocal fractional floor function applied neutrosophic set (RFFFNS) via interaction aggregating operator. The neutrosophic set combined with the reciprocal fractional floor operator. The geometric interaction operations of neutrosophic numbers and their new averaging are studied using the universal aggregation function. The RFFFNS are idempotent, boundedness compatible, commutative, and associative. Four new interaction aggregating operators are introduced: RFFFNS interaction weighted averaging, RFFFNS interaction weighted geometric, generalized RFFFNS interaction weighted averaging, and generalized RFFFNS interaction weighted geometric. The aggregation functions are commonly assumed to be represented by the Euclidean distance, Hamming distance, and score values.
Aggregating operator , RFFFNSIWA , RFFFNSIWG , GRFFFNSIWA , GRFFFNSIWG
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