Pythagorean fuzzy preference ranking organization method of enrichment evaluations

Zhang, Zi‐Xuan; Hao, Wenning; Yu, Xiaohan; Chen, Gang; Zhang, Suojuan; Chen, Junyue

doi:10.1002/int.22101

Cited by 22 publications

(24 citation statements)

References 42 publications

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“…Lin et al 37 improved the technique for order preference by similarity to ideal solutions (TOPSIS) by virtue of correlation coefficients and entropy measures for linguistic PF sets. Zhang et al 38 exploited generalized PF preference functions to promote an advanced preference ranking organization method for enrichment evaluations (PROMETHEE) involving PF information. Leveraging the advantages of PF theory, numerous investigations have focused on the exploitation of PF sets in managing the uncertainties associated with the decision‐maker's judgments and manipulating the MCDA problems under conditions of vagueness and impreciseness 4,6,14,23,24 …”

Section: Preliminariesmentioning

confidence: 99%

Pythagorean fuzzy likelihood function based on beta distributions and its based dominance ordering model in an uncertain multiple criteria decision support framework

Tsao

Chen

2021

Int J Intell Syst

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The concept of Pythagorean fuzzy (PF) sets represents a superior tool to model complex uncertainties in an ambiguous and equivocal decision‐making framework. In consideration of the significant capacity for exhibiting the uncertainty of subjective appraisals and estimations under the aegis of the PF theory, this paper presents a simple‐to‐operate decision‐making approach that is grounded in some beneficial concepts of original likelihood functions and measurements of dominating and dominated characters. On the strength of beta distributions, this paper seeks to propound new notions of PF likelihood functions and likelihood‐oriented dominating/dominated characters and to launch an exploitable multiple criteria evaluation method by means of a dominance ordering model for treating decision analysis within PF environments. This paper initiates an efficient beta distribution‐based approach to the construction of novel PF likelihood functions that can quantify the possibility degrees of outranking and outranked relationships between Pythagorean membership grades. The applicable satisfaction and dissatisfaction estimations are established on the likelihood‐oriented dominating and dominated characters, respectively. Furthermore, this paper formulates a straightforward dominance ordering model to obtain the ultimate dominance ranking orders of candidate alternatives and accomplish multiple criteria decision‐making issues involving complicated uncertainty. A financing decision‐making problem concerning working capital requirements is investigated to validate the application results using the advanced methodology. The real‐world application is implemented to examine the reasonableness and efficacy of the established techniques. Moreover, comparative studies through the utility of a sensitivity analysis are performed to demonstrate the efficacy and merits of the dominance ordering model. The comparison results manifest that the initiated methodology is an advantageous and reliable decision‐making technique that can enhance the methodological development regarding the multiple criteria evaluation model under PF uncertainty. Finally, recommendations for future research directions are also presented in the conclusions.

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Section: Preliminariesmentioning

confidence: 99%

Pythagorean fuzzy likelihood function based on beta distributions and its based dominance ordering model in an uncertain multiple criteria decision support framework

Tsao

Chen

2021

Int J Intell Syst

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“…Step 8 Ranking of Alternatives: Solve for the optimal weightw j and the optimalZ k i i . Employ (28) to derive the optimal collective comprehensive closeness measure K k=1 CM k i of each a i for acquiring the ultimate priority ranking of alternatives and the best compromise solution.…”

Section: Proposed Parametric Pf Linmap Modelsmentioning

confidence: 99%

“…Accordingly, PF sets have been widely popular in handling complex uncertainty involved in practical decision-making problems, and they have attracted numerous scholars' research interests in recent years. A series of methodologies have been developed to handle a variety of decision-making problems, such as PF techniques for order preference by similarity to ideal solutions (TOPSIS) [23], [25], [26], PF preference ranking organization methods for enrichment evaluations (PROMETHEE) [27], [28], cubic PF weighted averaging and weighted geometric operations [20], weighted distance based approximation with new score functions [29], and GDM approaches based on PF preference relations [14] and based on order relations for PF numbers [15]. Because PF sets provide a powerful and flexible tool in modeling real-world uncertainty, the extension of the LINMAP structure can create a more promising research subject and capture vagueness and incompleteness in human evaluations.…”

Section: Introductionmentioning

confidence: 99%

Multiple Criteria Group Decision Making Using a Parametric Linear Programming Technique for Multidimensional Analysis of Preference Under Uncertainty of Pythagorean Fuzziness

Chen

2019

IEEE Access

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This paper aims to utilize the core structure of linear programming technique for multidimensional analysis of preference (LINMAP) to propose a parametric LINMAP methodology for addressing multiple criteria group decision-making problems based on Pythagorean fuzzy sets. To compare Pythagorean membership grades, this paper presents a Hamming distance-based approach for identifying closeness-based order relations based on Pythagorean fuzzy closeness indices. The concept of comprehensive closeness measures is introduced to measure individual order consistency and inconsistency between subjective preference relations and objective order relations. In the spirit of LINMAP, this paper determines individual goodness of fit and poorness of fit and further constructs a novel parametric LINMAP model. The applicability of the developed approach is explored by a practical application of railway project investment. Some comparative analyses are conducted to demonstrate the usefulness and advantages of the proposed methodology.INDEX TERMS Multiple criteria group decision making, Pythagorean fuzzy set, Pythagorean membership grade, closeness-based order relation.

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“…Further, if we consider the sum of the squares of both the degrees, i.e., 0.8 2 +0.5 2 , that gives 0.89 <1, hence this information can be represented in the form of PFS, not in IFS. In a short span, the PFS theory has become an efficient tool to solve various real-life problems [37][38][39][40][41][42][43][44][45][46].…”

Section: Introductionmentioning

confidence: 99%

Fermatean fuzzy linguistic weighted averaging/geometric operators based on modified operational laws and their application in multiple attribute group decision-making

Verma¹

2021

Preprint

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Fermatean fuzzy linguistic (FFL) set theory provides an efficient tool for modeling a higher level of uncertain and imprecise information, which cannot be represented using intuitionistic fuzzy linguistic (IFL)/Pythagorean fuzzy linguistic (PFL) sets. On the other hand, the linguistic scale function is the better way to consider the semantics of the linguistic terms during the evaluation process. In the present paper, we first define some new modified operational laws for Fermatean fuzzy linguistic numbers (FFLNs) based on linguistic scale function (LSF) to overcome the shortcomings of the existing operational laws and prove some important mathematical properties of them. Based on it, the work defines several new aggregation operators (AOs), namely, the FFL-weighted averaging (FFLWA) operator, the FFL-weighted geometric (FFLWG) operator, the FFL-ordered weighted averaging (FFLOWA) operator, the FFL-ordered weighted geometric (FFLOWG) operator, the FFL-hybrid averaging (FFLHA) operator and the FFL-hybrid geometric (FFLHG) operator under FFL environment. Several properties of these AOs are investigated in detail. Further, based on these operators, a multiple attribute group decision-making (MAGDM) approach with FFL information is developed. Finally, to illustrate the effectiveness of the present approach, a real-life supplier selection problem is presented where the evaluation information of the alternatives is given in terms of FFLNs.

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Pythagorean fuzzy preference ranking organization method of enrichment evaluations

Cited by 22 publications

References 42 publications

Pythagorean fuzzy likelihood function based on beta distributions and its based dominance ordering model in an uncertain multiple criteria decision support framework

Pythagorean fuzzy likelihood function based on beta distributions and its based dominance ordering model in an uncertain multiple criteria decision support framework

Multiple Criteria Group Decision Making Using a Parametric Linear Programming Technique for Multidimensional Analysis of Preference Under Uncertainty of Pythagorean Fuzziness

Fermatean fuzzy linguistic weighted averaging/geometric operators based on modified operational laws and their application in multiple attribute group decision-making

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