Some Geometric Aggregation Operators Under q-Rung Orthopair Fuzzy Soft Information With Their Applications in Multi-Criteria Decision Making

Some Geometric Aggregation Operators Under q-Rung Orthopair Fuzzy Soft Information With Their Applications in Multi-Criteria Decision Making

Blog Article

The pioneer paradigm of soft set ( $S_{ft} ext{S}$ ) was investigated by Molodtsov in 1999 YOUTH WETSUITS by affixing parameterization tools in ordinary sets.$S_{ft} ext{S}$ theory is free from inherit complexity and a nice mathematical tool for handle uncertainties and vagueness.The aim of this paper is to initiate the combine study of $S_{ft} ext{S}$ and q-rung orthopair fuzzy set (q-ROFS) to get the new notion called q-rung orthopair fuzzy soft set (q-ROF $S_{ft} ext{S}$ ).The notion of q-ROF $S_{ft} ext{S}$ is free from those complexities which suffering the contemporary theories because parameterization tool is the most significant character of q-ROF $S_{ft} ext{S}$.In this manuscript our main contribution to originate the concept of q-ROF soft weighted geometric (q-ROF $S_{ft}$ WG), q-ROF soft ordered weighted geometric (q-ROF $S_{ft}$ OWG) and q-ROF soft hybrid geometric (q-ROF $S_{ft}$ HG) operators in q-ROF $S_{ft} ext{S}$ environment.

Moreover, some dominant properties of these developed operators are studied in detail.Based on these proposed approaches, a model is build up for multi-criteria decision making (MCDM) and their step wise algorithm is being presented.Finally, utilizing the developed approach an illustrative example is solved under q-ROF $S_{ft}$ environment.Further a comparative analysis of the investigated models with some existing methods are presented in detail which shows the DAILY FACE MOISTURIZER superiority, competence and ability of the developed model.