Abstract
Pythagorean fuzzy soft set (PFSS) is the most influential and operative extension of the Pythagorean fuzzy set (PFS), which contracts with the parametrized standards of the substitutes. It is also a generalized form of the intuitionistic fuzzy soft set (IFSS) and delivers a well and accurate estimation in the decision-making (DM) procedure. The primary purpose is to prolong and propose ideas related to Einstein’s ordered weighted aggregation operator from fuzzy to PFSS, comforting the condition that the sum of the degrees of membership function and nonmembership function is less than one and the sum of the squares of the degree of membership function and nonmembership function is less than one. We present a novel Pythagorean fuzzy soft Einstein ordered weighted averaging (PFSEOWA) operator based on operational laws for Pythagorean fuzzy soft numbers. Furthermore, some essential properties such as idempotency, boundedness, and homogeneity for the proposed operator have been presented in detail. The choice of a sustainable supplier is also examined as an essential part of sustainable supply chain management (SSCM) and is considered a crucial multiattribute group decision-making (MAGDM) issue. In some MAGDM problems, the relationship between alternatives and uncertain environments will be the main reason for deficient consequences. We have presented a novel aggregation operator for PFSS information to choose sustainable suppliers to cope with those complex issues. The Pythagorean fuzzy soft number (PFSN) helps to represent the obscure information in such real-world perspectives. The priority relationship of PFSS details is beneficial in coping with SSCM. The proposed method’s effectiveness is proved by comparing advantages, effectiveness, and flexibility among the existing studies.
Highlights
Decision-making is a preconceived strategy of picking a logical choice between many objects
We present a novel Pythagorean fuzzy soft Einstein ordered weighted averaging (PFSEOWA) operator based on operational laws for Pythagorean fuzzy soft numbers
Some essential properties such as idempotency, boundedness, and homogeneity for the proposed operator have been presented in detail. e choice of a sustainable supplier is examined as an essential part of sustainable supply chain management (SSCM) and is considered a crucial multiattribute group decisionmaking (MAGDM) issue
Summary
Decision-making is a preconceived strategy of picking a logical choice between many objects. Let X be a universal set and N be set of attributes, a pair (Ω, N) is called a PFSS over X where Ω: N ⟶ ℘KX is a mapping and ℘KX is known as the collection of all PFS subsets of universal set X. where aA(t), bA(t): A ⟶ [0, 1] represent the membership grade and nonmembership functions, respectively, with 0 ≤ aA(t)2 + bA(t)2 ≤ 1, degree of I 1 − aA(t)2 − bA(t), and A ⊂ N. 3. Pythagorean Fuzzy Soft Einstein Ordered Weighted Average Operator e following section will develop the Einstein ordered weighted average operator for PFSS with some fundamental properties.
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