Inverse fractional function setting sine trigonometric neutrosophic set approach to interaction aggregating operators

Abstract

In this paper we present novel techniques for the interacting aggregating operator of the inverse fractional function sine trigonometric neutrosophic set. Swapping the input and output variables and solving for the original input variable in terms of the original output variable are the steps involved in determining the inverse of a function. The innovative averaging and geometric operations of inverse fractional function sine trigonometric neutrosophic numbers are studied using the universal aggregation function. The inverse fractional function sine trigonometric neutrosophic set is idempotent, boundedness compatible, associative and commutative. Four new aggregating operators are introduced: inverse fractional function sine trigonometric neutrosophic weighted averaging, inverse fractional function sine trigonometric neutrosophic weighted geometric, generalized inverse fractional function sine trigonometric neutrosophic weighted averaging, and generalized inverse fractional function sine trigonometric neutrosophic weighted geometric. The aggregation functions are frequently thought to be represented by the Euclidean distance, Hamming distance and score values. © 2025, University of New Mexico. All rights reserved.