Abstract
Linear Diophantine uncertain linguistic set (LDULS) is a modified variety of the fuzzy set (FS) to manage problematic and inconsistent information in actual life troubles. LDULS covers the grade of truth, grade of falsity, and their reference parameters with the uncertain linguistic term (ULT) with a rule 0 ≤ α AMG u AMG x + β ANG v AMG x ≤ 1 , where 0 ≤ α AMG + β ANG ≤ 1 . In this study, the principle of LDULS and their useful laws are elaborated. Additionally, the power Einstein (PE) aggregation operator (AO) is a conventional sort of AO utilized in innovative decision-making troubles, which is effective to aggregate the family of numerical elements. To determine the interrelationship between any numbers of arguments, we elaborate the linear Diophantine uncertain linguistic PE averaging (LDULPEA), linear Diophantine uncertain linguistic PE weighted averaging (LDULPEWA), linear Diophantine uncertain linguistic PE geometric (LDULPEG), and linear Diophantine uncertain linguistic PE weighted geometric (LDULPEWG) operators; then, we discuss their useful results. Conclusively, a decision-making methodology is utilized for the multiattribute decision-making (MADM) dilemma with elaborated information. A sensible illustration is specified to demonstrate the accessibility and rewards of the intended technique by comparison with certain prevailing techniques. The intended AOs are additional comprehensive than the prevailing ones to exploit the ambiguous and inaccurate knowledge. Numerous remaining operators are chosen as individual incidents of the suggested one. Ultimately, the supremacy and advantages of the elaborated operators are also discussed with the help of the geometrical form to show the validity and consistency of explored operators.
Highlights
multiattribute decision-making (MADM) is a technique to discover the ideal option between a family of possibilities and a family of certain opinions. e perception of MADM has extensively been utilized in numerous disciplines
Beg and Rashid [10] initiated the intuitionistic hesitant fuzzy sets, Atanassov [11] explored the intervalvalued intuitionistic fuzzy sets, Kumari and Mishra [12] investigated the parametric measures for intuitionistic FS (IFS), Jana and Pal [13] explored bipolar intuitionistic fuzzy soft sets, Joshi and Kumar [14] developed the fuzzy time series model based on intuitionistic fuzzy sets, Fu et al [15] proposed the correlation measures by using the interval-valued intuitionistic fuzzy sets, and Meng and He [16] elaborated the geometric interaction aggregation operators by using the intuitionistic fuzzy sets
We introduce the novel concept of the linear Diophantine uncertain linguistic set (LDULS) with the addition of reference parameters and uncertain linguistic terms. e proposed model of Linear Diophantine uncertain linguistic set (LDULS) is more efficient and flexible rather than other approaches due to the use of reference parameters and uncertain LV (ULV)
Summary
MADM is a technique to discover the ideal option between a family of possibilities and a family of certain opinions. e perception of MADM has extensively been utilized in numerous disciplines. In certain situations, the principle of FS cannot be working effectively; for instance, when an individual face such sorts of information, which contains the truth and falsity grades, FS failed To survive with such circumstances, Atanassov [9] elaborated the theory of intuitionistic FS (IFS), which covers the grade of truth and falsity grades with the rule 0 ≤ uAMG(x) + vANG(x) ≤ 1. In certain situations, the principle of PFS cannot be working effectively; for instance, when an individual face such sorts of information which contains the truth and falsity grades with the rule 0 ≤ uqAMG(x) + vqANG(x) ≤ 1, PFS failed To survive with such circumstances, Yager [25] elaborated the theory of q-rung orthopair FS (q-ROFS), which covers the grade of truth and falsity grades with the rule 0 ≤ uqAMG(x) + vqANG(x) ≤ 1.
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