An Improved EDAS Method Based on Bipolar Neutrosophic Set and Its Application in Group Decision-Making

Irvanizam, Irvanizam; Syahrini, Intan; Zi, Nawar Nabila; Azzahra, Natasya; Iqbal, Muhd; Marzuki, Marzuki; Subianto, Muhammad

doi:https://doi.org/10.1155/2021/1474629

Applied Computational Intelligence and Soft Computing

On this page

Abstract Introduction Numerical Example Conclusion Data Availability Conflicts of Interest Acknowledgments References Copyright Related Articles

Research Article | Open Access

Volume 2021 | Article ID 1474629 | https://doi.org/10.1155/2021/1474629

An Improved EDAS Method Based on Bipolar Neutrosophic Set and Its Application in Group Decision-Making

Irvanizam Irvanizam,¹Intan Syahrini,²Nawar Nabila Zi,¹Natasya Azzahra,¹Muhd Iqbal,¹Marzuki Marzuki,³and Muhammad Subianto¹

Academic Editor: Aniello Minutolo

Received08 Jun 2021

Revised27 Aug 2021

Accepted11 Sept 2021

Published15 Oct 2021

Abstract

The bipolar neutrosophic set is a suitable instrument to tackle the information with vagueness, complexity, and uncertainty. In this study, we improved the original EDAS (the evaluation based on distance from average solution) with bipolar neutrosophic numbers (BNNs) for a multiple-criteria group decision-making (MCGDM) problem. We calculated the average solution under all the criteria by two existing aggregation operators of BNNs. Then, we computed the positive distance and the negative distance from each alternative to the average ideal solution and determined the appraisal score of alternatives. Based on these scores, we obtained the ranking result. Finally, we demonstrated the practicability, stability, and capability of the improved EDAS method by analyzing the influence parameters and comparing results with an extended VIKOR method.

1. Introduction

Zadeh first defined the theory of fuzzy set (FS) [1] to represent the uncertain information through the membership function. However, there are some situations in which the membership function finds it hard to depict its complete information. So, Pawlak anticipated it by introducing the theory of rough set (RS) [2] as a mathematical model for processing and expressing incomplete information in data sciences with the upper approximation value and the lower approximation value of a set. Molodtsov then described the concept of soft set (SS) [3] to avoid the difficulties of using an adequate parametrization. Later on, Lee extended the FS by introducing bipolar valued fuzzy sets [4] whose range of membership degree is augmented from the previous interval from 0 to 1 to the new one from −1 to 1.

However, the three abovementioned theories cannot differentiate between ignoring and uncertain information that are extensively obtainable in the actual case. For instance, assume that there exist eleven decision makers (DMs), of which 3 DMs agree, 2 DMs disagree, 4 DMs are uncertain, and 2 DMs give up. For this case, those theories cannot precisely express. To tackle this condition, Smarandache [5] first inducted the concept of a neutrosophic set (NS) by accepting a truth-membership function degree, an indeterminacy-membership degree, and a falsity-membership function degree. For the above condition, the NS can express the information by . Due to its difficulty to be applied in practical problems such as in science and engineering, Wang et al. [6] improved the NS to be more convenient by proposing single-valued neutrosophic sets (SVNSs). Sunderraman and Wang [7] also contributed to studying interval neutrosophic sets (INSs). Ye [8] conferred a new idea of simplified neutrosophic sets (SNSs) for MCDM problems. Wang and Li [9] provided an idea of multivalued neutrosophic sets (MVNSs) and attempted to implement MCDM with the TODIM method. Moreover, Peng et al. [10] also explored the approach of MVNSs with qualitative flexibility based on likelihood.

Additionally, many people tend to consider positive and negative effects [11] or bipolarity in decision-making. Positive information describes things that are possible, adequate, authorized, wanted, or acceptable. Meanwhile, negative statements state things that are impossible, insufficient, unpermitted, undesired, or rejected. Hence, from this idea and the adoption of bipolar FS [3, 12], Deli et al., in [13], introduced bipolar neutrosophic sets (BNSs). They also addressed some characteristics, theorems, and aggregation operators of the BNS and executed them in an example of buying a car. Later on, the BNS becomes an exciting topic in the theory of neutrosophic. Deli and Subas [14] depicted correlation coefficient similarity for handling MCDM problems with BNS. Similarly, Sahin et al. [15] addressed similarity measures for MCDM using BNSs by proposing the Jaccard vector. Wang et al. [16] introduced Frank operations of BNSs and defined Frank bipolar neutrosophic Choquet Bonferroni mean operators. Fahmi and Amin [17] constructed bipolar neutrosophic fuzzy (BNF) operators and applied them to develop a MCDM technique. Zhao et al. [18] developed an integrated TOPSIS method based on the theory of cumulative prospect for solving MCGDM under interval-valued BNSs information.

Many fabulous researchers have also applied the concept of NS using the MCGDM strategy to deal with uncertainties in decision-making problems. Ye [19] extended a decision-making method based on single-valued neutrosophic interval numbers (SVNINs) for MCGDM problems. Wei et al. [20] improved an original COPRAS for single-valued neutrosophic 2-tuple linguistic sets (SVN2TLSs) and applied them to deal with MCGDM problems. Zhang et al. [21] developed a new MCGDM strategy for SNSs by combining SNSs with their weighted distance measures.

Nevertheless, integrating the concept of NS with a decision-making method will make a useful instrument for determining a more feasible and acceptable solution in the decision-making process. One of many traditional decision-making methods is an evaluation based on the distance from the average solution (EDAS) method. Compared with other methods such as TOPSIS [22], TODIM [23], AHP [24], VIKOR [25], ELECTRE [26, 27], MABAC [28], and MOORA [29], it has particular eminence in selecting optimal solutions. It utilizes the positive and negative distance from the average solution (AVGS) to determine the optimal solution of alternatives. Additionally, it has some valuable features [30, 31]. First, the calculation results by EDAS are well stable and consistent for given different criteria weights. Second, the mathematical formulas for calculating the results are fewer and simple. Third, it can anticipate negative and zero values in the AVGS, and fourth, it provides opportunities to extend this method with many other strategies. These make the EDAS be a suitable auxiliary to yield acceptable decision-making results.

Many prestigious researchers have studied and explored this method. Ghorabaee et al. [32, 33] continued to investigate the EDAS method by integrating the concept of trapezoidal fuzzy numbers to express a linguistic term in a fuzzy environment. Jana and Pal [34] improved EDAS by utilizing bipolar fuzzy numbers to select the best construction company in a road project tender. Karaşan and Kahraman [35] developed an extended EDAS by fusing intuitionistic fuzzy and type-2 fuzzy versions to prioritize the sustainability of development goals in the United Nation. Ghorabaee et al. [36] integrated EDAS with stochastic for tackling problems when the alternative values on each criterion do not form a normal distribution. Yahya et al. [37] extended EDAS with the intuitionistic fuzzy rough Frank to choose a construction company. Li et al. [38] proposed a hybrid operator and applied it in analyzing an MCGDM using the EDAS method. Liang [39] utilized EDAS with the fuzzy concept to evaluate the efficiency of energy projects.

1.1. Research Gap

EDAS based an MCGDM strategy under BNS environment. This manuscript will respond to the two following questions. (1) Is there a possibility to improve EDAS in the BNS environment? (2) Is there a possibility to develop a novel EDAS based on BNS in group decision-making?

1.2. Motivation and Objectives

The abovementioned analysis [5–39] outlines the motivation of this study to propose a novel EDAS approach in the BNS environment for dealing with MCGDM problems. Meanwhile, the objectives of this manuscript are to improve the EDAS approach with BNS and design a new MCGDM based on improved EDAS under the BNS environment.

1.3. Main Contributions

Therefore, we summarize the main contributions of this manuscript as below. Firstly, we improve an EDAS method to tackle an MCGDM problem in which the decision makers (DMs) evaluate the information under the BNS environment. Secondly, we extend some calculation steps of the positive distance and negative distance in the improved EDAS algorithm and allow the DMs to give assessments based on their opinions in computing all alternative evaluations. Thirdly, we developed an enlarged EDAS based on BNS for tackling MCGDM problems. Finally, we demonstrate an illustrative example in this manuscript to prove the practicability, stability, and capability of our proposed EDAS to conquer an MCGDM problem.

The manuscript is neatly written as follows. Section 2 acquaints the basic concepts of NS and BNS and reviews some characteristics, operations, and weighted aggregation operators of BNS. In Section 3, the improved EDAS method with BNS for the MCGDM problem is introduced. In Section 4, the analysis of comparison results using the improved EDAS algorithm and some other approaches are performed through a numerical example of social welfare assistance recipients to illustrate the practicability and effectiveness of the improved EDAS method. Lastly, some valuable conclusions and preferable future works are addressed in Section 5.

2. Basic Concepts and Definitions

This section brings back some theoretical concepts of an NS and a BNS and some aggregation operators of the BNS.

2.1. Neutrosophic Set

Definition 1 (see [5]). Let be a universal set with a general element in denoted by ; then, a neutrosophic set (NS) in is characterized by a truth-membership function , an indeterminacy-membership function , and a falsity-membership function . Neutrosophic set can be expressed aswhere , and .
Later on, Wang et al. [6] put forward the theory of SVNSs so that it can be easy to apply it in real applications of science and engineering.

Definition 2 (see [6]). Let be a universal set with a general element in ; then, a single-valued neutrosophic set (SVNS) in is characterized by a truth-membership function , an indeterminacy-membership function , and a falsity-membership function . The single-valued neutrosophic set can be defined aswhere and .

2.2. Bipolar Neutrosophic Set

Definition 3 (see [13]). Let be a universal set with a general element in denoted by ; then, a bipolar neutrosophic set in is characterized by the positive-membership degree , where is a truth-membership function, is an indeterminacy-membership function, and is a falsity-membership function, and the negative-membership degree, where is a truth-membership function, is an indeterminacy-membership function, and is a falsity-membership function. The bipolar neutrosophic set can be expressed as an object of the form:where and .

Definition 4 (see [13]). Let and be two BNSs; then, the following conditions are satisfied:(1)(2)(3)where is the complement of , for all For more convenience, a bipolar neutrosophic number (BNN) is denoted as .

Definition 5 (see [13]). Let and be two bipolar neutrosophic numbers (BNNs); then, the following operators of BNNs are depicted as below:(1)(2)(3)(4) where

Definition 6 (see [13]). Let be a BNN; then, the functions of score , accuracy , and certainty can be calculated as follows:(1)(2)(3).

Definition 7 (see [13]). Let and be two BNNs; then, the relation methods of the three BNN functions are the following:(1)If , then is greater than , that is, is superior to , notated by (2)If and , then is greater than , that is, is superior to , notated by (3)If , , and , then is greater than , that is, is superior to , notated by (4)If , , and , then is equal to , that is, is indifferent to , notated by In decision-making conditions, benefit-type criterion and cost-type criterion will sure exist concurrently. Based on [40], we adjust a normalization procedure of a BNN for benefit-type and cost-type criterion.

Definition 8. Let be a BNN; then, the normalized BNN is expressed as

2.3. Some Weighted Aggregation Operators of BNSs

Definition 9 (see [13]). Let be the set of BNNs and be the set of corresponding weights of BNNs, where and . Then, the bipolar neutrosophic number weighted average (BNNWA) operator is expressed as

Definition 10 (see [13]). Let be the set of BNNs and be the set of corresponding weights of BNNs, where and . Then, the bipolar neutrosophic number weighted geometric (BNNWG) operator is expressed as

3. The Improved EDAS Method with BNNs

This section depicts an MCGDM methodology by integrating the original EDAS with BNNs. Suppose there is a commission of decision-makers with the weight matrix of decision makers that satisfies and . This is responsible for assessing alternatives with criteria , where the weight matrix of criterion is that satisfies and . The algorithm of the improved EDAS method is constructed as below and showed in Figure 1.

3.1. Algorithm

Step 1: establish the evaluated linguistic matrix of decision maker and transform it as , and , where is a BNN and represents the bipolar neutrosophic information of alternative corresponding to criterion by decision maker . Step 2: normalize the evaluated BNN matrix into , where for benefit criterion or for cost criterion . Step 3: based on the normalized BNN decision-making matrix and the weight matrix of decision makers , we will determine overall into by using equation (7) for the BNNWA operator or equation (8) for BNNWG operator. Thus, the aggregated decision-making matrix , where is also a BNN: Step 4: enumerate the values of the average solution , where . According to Definition 5, we will obtain as Step 5: calculate the positive and negative distance from average solution and by using equation (10), respectively: Step 6: determine the values of the weighted sums of PDA and NDA that notated as and using Step 7: normalize the values and to get and using Step 8: compute the appraisal score of for each alternative by using where the DMs can customize the value of based on their judgment for positive and negative distances. Especially, when the DM’s judgment is neutral and gives , equation (13) can be simplified to Step 9: create a list of alternatives ranking taking from the sorted values of . The highest value of is the best or the selected alternative.

4. Numerical Example

4.1. An Example for BNNS MCGDM Problem

In this section, we show a case study to distribute poor business groups in distributing a Productive Economic Endeavours (PEE) Program. The Ministry of Social Affairs of the Republic of Indonesia provides this program to aid the micro, small, and medium enterprises (MSMEs). The program aims to enhance the income of these business groups through productive economic endeavours and build social relationships harmony among residents.

Assume the Ministry of Social Affairs wants to select small and medium joint business groups to give them venture capital assistance. The Minister of Social Affairs appointed a committee of the PEE program consisting of three decision makers to assess five potential small and medium joint business groups . Due to the three decision makers (DMs) have different assessment skills, the minister provided assessment weight to them , respectively.

Afterward, all decision makers decided on four criteria which are the eligibility of business , quality of management team , income households , and business plan as requirements in this selection program. Besides, they agreed to give a criteria weight , determine the criteria , , and as a benefit-type criterion, and as a cost-type criterion.

They used the linguistic variables set to evaluate all alternatives over the cross criteria with their BNN values of the linguistic values, as presented in Table 1.

Tables 2–4 show evaluated values of the three DMs with BNNs for the five alternatives and the four criteria.

To obtain a list of venture capital assistance recipients, we apply the improved EDAS method to evaluate the five joint business groups. The technical calculation steps of the improved EDAS method are as follows: Step 1: after building the linguistic values matrices of decision makers, we transform them into the BNN decision-making matrices. Step 2: normalize the BNN decision-making matrices based on the benefit-type and cost-type criteria. We receive the normalized BNN matrices, as shown in Table 5. Step 3: aggregate the normalized BNN matrices. Based on the given decision makers’ weight matrix , we will get the aggregated BNN matrix, as presented in Table 6, using BNNWA operator or Table 7, using BNNWG operator. Step 4: calculate the values of the average solution using equation (9), and obtain the average solution matrix, as provided in Table 8. Step 5: by utilizing the average solution matrix and the aggregated BNN matrix (in this step, we use BNNWA operator) and the score function values of alternatives, as shown in Table 9, we calculate all elements of the matrix of and , and the results are provided in Table 10. Step 6: determine the weighted matrix of which is the multiplication of the matrix of and the matrix of criteria weight . Similarly, we perform to the weighted matrix of . According to and equation (11), we obtain Step 7: after normalizing the values of and using equation (12), we then obtain the values of and : Step 8: when is given in equation (13), the appraisal score can be obtained as below. The value is a final value for the alternative : Step 9: according to the matrix value of , the result of alternatives ranking is . Obviously, the best alternative is and the worst alternative is .

In Step 8 of the improved EDAS algorithm, DMs can customize the value of with their different opinions for both positive and negative distances. In order to look at the influence of different preference values on ranking results, we give various values of to determine the results in terms of the ranking of the alternatives, which are listed in Table 11.

Table 11 shows that the results of alternative rankings are consistent for and . On the contrary, the ranking for is slightly different from that for . When , the best alternative is and the worst alternative is . Whereas when , the best alternative is and the worst alternative is . The best alternative is or , and it depends on the value of . Meanwhile, the worst case always for all values. So, the results are stable even though the value of is different.

When we compare with the original EDAS in [35] that assigned the constant value of to 0.5, the improved EDAS method allows DMs to adjust parameter in an interval 0 to 1. It takes the preference of DMs into account for loss and gains to the average ideal solution by adjusting the values of . The DMs can freely change the value of according to their judgments to obtain an acceptable solution in the genuine decision-making problem.

4.2. Comparative Analysis

4.2.1. Comparison with the BNNWA and BNNWG Operators

In this section, we attempt to compare results based on either in term ranking order or final score values with other approaches. We perform two comparative analyses. First, we compare the results between the improved EDAS using BNNWA and BNNWG operators. Second, the results provided by BNN-EDAS were also compared with the score function values of BNN that aggregated by BNNWA and BNNWG operators.

In the previous section, we utilize the BNNWA operator to fuse the evaluated linguistic values of DMs, and in this section, we attempt to reaggregate them by using another operator (BNNWG operator). Due to Steps 1 and 2 are the steps to transforming and normalizing the information from linguistic terms into BNNs, we skip these steps and continue to perform the selection process from Step 3 to Step 9. Similar to the previous section, we can acquire the appraisal score and a list of alternatives ranking order using the BNNWG operator, as demonstrated in Table 12.

Table 12 shows that the values of the appraisal score between using BNNWA and BNNWG operators are very slightly different, but the list of alternatives ranking order is a bit different. With the BNNWA operator, the alternative and are the third and the fourth position, respectively. Meanwhile, the EDAS with the BNNWG operator yields the two alternatives in swapped order.

Furthermore, we analyze the results obtained by the improved EDAS with the score function values of aggregated BNN. Based on Step 3 in Section 4.1, we utilize equation (7) for the BNNWA operator and equation (8) for the BNNWG operator to aggregate the evaluated BNN values of DMs. Afterward, we determine the weighted BNN matrix based on the aggregated BNN matrix and the weight matrix of criteria and then convert them into crisp values by calculating their score function values using Definition 6. Table 13 demonstrates the matrices of weighted BNN using BNNWA and BNNWG operators and their score function values, and Table 14 shows their comparison results.

Again, the results show that the ranking order of alternatives provided by BNNWA and BNNWG operators are the same as the results evaluated by the improved EDAS with the BNNWG operator. It indicates that the improved EDAS is applicable, effective, and practical for the MCGDM problem. The comparison results in terms of alternatives ranking order for these four approaches can be seen in Figure 2.

4.2.2. Comparison with the VIKOR Method for BNNs

In this section, we compared our improved EDAS method with the VIKOR [40] method for bipolar neutrosophic information. Pramanik et al. [40] designed an extended VIKOR method with MCGDM strategy for tackling bipolar neutrosophic information. We use the same data as in Table 5 to perform the comparative analysis.

In Step 6 of the VIKOR [40] algorithm, we adjusted the value of with the same values given to the value of in our proposed EDAS method. The results are shown in Table 15.

From Table 15, we can observe that the worst alternative is and the best one is for , the worst alterative is and the best is for , the worst alterative is and the best is for , and the worst alterative is and the best is for . The results of alternative rankings are inconsistent.

The two methods have different ways to tackle the MCGDM with BNNs. The improved EDAS method calculates the distance of each alternative from the average ideal solution, which is used to rank alternatives in descending order. The VIKOR method in [40] used the value of the VIKOR index to determine the best alternative according to the result of alternative ranking in ascending order. On the contrary, the VIKOR method is not suitable for dealing with our MCGDM problem with bipolar neutrosophic information, while the improved EDAS method is stable and useful to handle the MCGDM problem.

5. Conclusion and Future Studies

The concept of BNNs is a suitable instrument in expressing the cases with vagueness, inconsistent, incomplete, and indeterminate information, which now widely prevail in various decision-making problems. In this manuscript, based on the original EDAS [35], we develop an improved EDAS for MCGDM problems described by BNNs. This method calculates the average alternative by aggregating the BNNs for each criterion using the BNNWA and BNNWG operators. Next, it calculates the positive and negative distances between each evaluated alternative and the average solution separately. After adjusting the parameter values of according to the DM preference, the improved EDAS method calculates the appraisal score and ranks alternatives. A case study to determine the best MSME in distributing the PEE program is analyzed. This case study is applied to demonstrate that the proposed EDAS method is stable to yield ranking results of alternatives for different parameter values and is reasonable and feasible for handling MCGDM problems with BNNs by comparing with some aggregation BNN methods.

From the comparative analysis and the results of algorithm analysis presented in the previous section, it is clear that the proposed EDAS method requires less information preprocessing and less computation and is suitable to resolve the MCGDM problem with many conflicting criteria and alternatives. It can also be widely applied for the information described by IFSs, bipolar fuzzy sets, SVNSs, or MVNSs, which have similar forms with BNNs. Moreover, the improved EDAS method considers the DMs’ preference for the loss or gain of an alternative, to get the most desired solution.

However, this approach only holds the case of given DMs’ weight matrix and criteria’ weight matrix; it does not address the unknown weight matrix. So, it will be a challenge in the future to establish some novel strategies to gain a more realistic weight matrix and more rational decision results. Additionally, it is also important to develop the EDAS method based on some other neutrosophic sets and fuzzy sets, such as bipolar trapezoidal neutrosophic sets [41], complex intuitionistic uncertain linguistic Heronian mean [42], and triangular fuzzy neutrosophic set [43].

Data Availability

The data that support the findings of this study are available within the article.

Conflicts of Interest

The authors declare that there are no conflicts of interest regarding the publication of this manuscript.

Acknowledgments

This research was financially supported by the Institute for Research and Community Services of Universitas Syiah Kuala, under the Lektor Research Grant 2021 (Contract no. 194/UN11.2.1/PT.01.03/PNBP/2021).

References

L. A. Zadeh, “Fuzzy sets,” Information and Control, vol. 8, no. 3, pp. 338–353, 1965.
View at: Publisher Site | Google Scholar
Z. a. Pawlak, “Rough sets,” International Journal of Computer & Information Sciences, vol. 11, no. 5, pp. 341–356, 1982.
View at: Publisher Site | Google Scholar
D. Molodtsov, “Soft set theory—first results,” Computers & Mathematics with Applications, vol. 37, no. 4-5, pp. 19–31, 1999.
View at: Publisher Site | Google Scholar
K. M. Lee, “Bipolar-valued fuzzy sets and their operations,” in Proceedings of the 2000 International Conference on Intelligent Technologies, pp. 307–312, Bangkok, Thailand, 2000.
View at: Google Scholar
F. Smarandache, “A unifying field in logics: neutrosophic logic. Neutrosophy, neutrosophic set, neutrosophic probability and statistics,” Multiple-Valued Logic, vol. 95, pp. 5–21, 2001.
View at: Google Scholar
H. Wang, F. Smarandache, Y. Q. Zhang, and R. Sunderraman, “Single valued neutrosophic sets,” Review of the Air Force Academy, vol. 10, pp. 410–413, 2010.
View at: Google Scholar
R. Sunderraman and H. Wang, “Interval neutrosophic sets and logic: theory and applications in computing,” 2005, https://arxiv.org/abs/cs/0505014.
View at: Google Scholar
J. Ye, “Cosine similarity measures for intuitionistic fuzzy sets and their applications,” Mathematical and Computer Modelling, vol. 53, no. 1-2, pp. 91–97, 2011.
View at: Publisher Site | Google Scholar
J. Q. Wang and X. E. Li, “TODIM method with multi-valued neutrosophic sets,” Control and Decision, vol. 30, pp. 1139–1142, 2015.
View at: Google Scholar
J.-J. Peng, J.-Q. Wang, and W.-E. Yang, “A multi-valued neutrosophic qualitative flexible approach based on likelihood for multi-criteria decision-making problems,” International Journal of Systems Science, vol. 48, no. 2, pp. 425–435, 2017.
View at: Publisher Site | Google Scholar
P. Bosc and O. Pivert, “On a fuzzy bipolar relational algebra,” Information Sciences, vol. 219, pp. 1–16, 2013.
View at: Publisher Site | Google Scholar
K. J. Lee, “Bipolar fuzzy subalgebras and bipolar fuzzy ideals of BCK/BCI-algebras,” The Bulletin of the Malaysian Mathematical Society Series, vol. 32, no. 3, pp. 361–373, 2009.
View at: Google Scholar
I. Deli, M. Ali, and F. Smarandache, “Bipolar neutrosophic sets and their application based on multi-criteria decision making problems,” in Proceedings of the 2015 International Conference on Advanced Mechatronic Systems (ICAMechS), Beijing, China, 2015.
View at: Google Scholar
I. Deli and Y. A. Subas, “Multiple criteria decision making method on single valued bipolar neutrosophic set based on correlation coefficient similarity measure,” in Proceedings of the 2016 International Conference on Mathematics and Mathematics Education (ICMME2016), Elazığ, Turkey, 2016.
View at: Google Scholar
M. Sahin, I. Deli, and V. Ulucay, “Jaccard vector similarity measure of bipolar neutrosophic set based on multi-criteria decision making,” in Proceedings of the 2016 International Conference on Natural Science and Engineering (ICNASE’16), Kilis, Turkey, 2016.
View at: Google Scholar
L. Wang, H.-y. Zhang, and J.-q. Wang, “Frank Choquet Bonferroni mean operators of bipolar neutrosophic sets and their application to multi-criteria decision-making problems,” International Journal of Fuzzy Systems, vol. 20, no. 1, pp. 13–28, 2018.
View at: Publisher Site | Google Scholar
A. Fahmi and N. U. Amin, “Group decision-making based on bipolar neutrosophic fuzzy prioritized muirhead mean weighted averaging operator,” Soft Computing, vol. 25, no. 15, pp. 10019–10036, 2021.
View at: Publisher Site | Google Scholar
M. Zhao, G. Wei, Y. Guo, and X. Chen, “CPT-TODIM method for interval-valued bipolar fuzzy multiple attribute group decision making and application to industrial control security service provider selection,” Technological and Economic Development of Economy, vol. 27, no. 5, pp. 1186–1206, 2021.
View at: Publisher Site | Google Scholar
J. Ye, “Multiple attribute group decision-making method with single-valued neutrosophic interval number information,” International Journal of Systems Science, vol. 50, no. 1, pp. 152–162, 2019.
View at: Publisher Site | Google Scholar
G. Wei, J. Wu, Y. Guo, J. Wang, and C. Wei, “An extended COPRAS model for multiple attribute group decision making based on single-valued neutrosophic 2-tuple linguistic environment,” Technological and Economic Development of Economy, vol. 27, no. 2, pp. 353–368, 2021.
View at: Publisher Site | Google Scholar
H. Zhang, Z. Mu, and S. Zeng, “Multiple attribute group decision making based on simplified neutrosophic integrated weighted distance measure and entropy method,” Mathematical Problems in Engineering, vol. 2020, Article ID 9075845, 10 pages, 2020.
View at: Publisher Site | Google Scholar
C. L. Hwang and K. P. Yoon, Multiple Attribute Decision Making, Springer, Berlin, Germany, 1981.
L. Gomes and M. Lima, “TODIM: basics and application to multicriteria ranking of projects with environmental impacts,” Foundations of Computing and Decision Sciences, vol. 16, pp. 113–127, 1992.
View at: Google Scholar
T. L. Saaty, Decision Making for Leaders: The Analytical Hierarchy Process for Decisions in a Complex World, Wadsworth, Belmont, CA, USA, 1982.
S. Opricovic, “Multicriteria optimization of civil engineering systems,” Faculty of Civil Engineering Belgrade, Belgrade, Serbia, 1998, Ph.D. thesis.
View at: Google Scholar
B. Roy, “Classement et choix en présence de points de vue multiples,” La Revue d’Informatique et de Recherche Opérationelle (RIRO), vol. 2, no. 8, pp. 57–75, 1968.
View at: Publisher Site | Google Scholar
K. Govindan and M. B. Jepsen, “ELECTRE: a comprehensive literature review on methodologies and applications,” European Journal of Operational Research, vol. 250, no. 1, pp. 1–29, 2016.
View at: Publisher Site | Google Scholar
D. Pamucar and G. Cirovic, “The selection of transport and handling resources in logistics centers using multi-attributive border approximation area comparison (MABAC),” Expert System Application, vol. 42, pp. 3016–3028, 2015.
View at: Google Scholar
W. K. Brauers and E. K. Zavadskas, “Te MOORA method and its application to privatization in a transition economy,” Control and Cybernetics, vol. 35, no. 2, pp. 445–469, 2006.
View at: Google Scholar
I. Irvanizam, T. Usman, M. Iqbal, T. Iskandar, and M. Marzuki, “An extended fuzzy TODIM approach for multiple-attribute decision-making with dual-connection numbers,” Advances in Fuzzy Systems, vol. 2020, Article ID 6190149, 10 pages, 2020.
View at: Publisher Site | Google Scholar
I. Irvanizam, N. Nazaruddin, and I. Syahrini, “Solving decent home distribution problem using ELECTRE method with triangular fuzzy number,” in Proceedings of the 2018 International Conference on Applied Information Technology and Innovation (ICAITI), Padang, Indonesia, 2018.
View at: Google Scholar
M. K. Ghorabaee, E. K. Zavadskas, L. Olfat, and Z. Turskis, “Multi-criteria inventory classification using a new method of evaluation based on distance from average solution (EDAS),” Informatica, vol. 26, no. 3, pp. 435–451, 2015.
View at: Publisher Site | Google Scholar
M. K. Ghorabaee, E. K. Zavadskas, M. Amiri, and Z. Turskis, “Extended EDAS method for fuzzy multi-criteria decision-making: an application to supplier selection,” International Journal of Computers, Communications & Control, vol. 11, no. 3, pp. 358–371, 2016.
View at: Publisher Site | Google Scholar
C. Jana and M. Pal, “Extended bipolar fuzzy EDAS approach for multi-criteria group decision-making process,” Computational and Applied Mathematics, vol. 40, no. 9, 2021.
View at: Publisher Site | Google Scholar
A. Karaşan and C. Kahraman, “A novel interval-valued neutrosophic EDAS method: prioritization of the United Nations national sustainable development goals,” Soft Computing, vol. 22, pp. 4891–4906, 2018.
View at: Google Scholar
M. K. Ghorabaee, M. Amiri, E. K. Zavadskas, Z. Turskis, and J. Antucheviciene, “Stochastic EDAS method for multi-criteria decision-making with normally distributed data,” Journal of Intelligent & Fuzzy Systems, vol. 33, no. 3, pp. 1627–1638, 2017.
View at: Publisher Site | Google Scholar
M. Yahya, M. Naeem, S. Abdullah, M. Qiyas, and M. Aamir, “A novel approach on the intuitionistic fuzzy rough Frank aggregation operator-based EDAS method for multicriteria group decision-making,” Complexity, vol. 2021, Article ID 5534381, 24 pages, 2021.
View at: Publisher Site | Google Scholar
Z. Li, G. Wei, R. Wang, J. Wu, C. Wei, and Y. Wei, “EDAS method for multiple attribute group decision making under q-rung orthopair fuzzy environment,” Technological and Economic Development of Economy, vol. 26, no. 1, pp. 86–102, 2020.
View at: Google Scholar
Y. Liang, “An EDAS method for multiple attribute group decision-making under intuitionistic fuzzy environment and its application for evaluating green building energy-saving design projects,” Symmetry, vol. 12, no. 3, p. 484, 2020.
View at: Publisher Site | Google Scholar
S. Pramanik, S. Dalapati, S. Alam, and T. K. Roy, “VIKOR based on MAGDM strategy under bipolar neutrosophic set environment,” Neutrosophic Sets and Systems, vol. 19, pp. 57–69, 2018.
View at: Google Scholar
H. Kamaci, H. Garg, and S. Petchimuthu, “Bipolar trapezoidal neutrosophic sets and their dombi operators with applications in multicriteria decision making,” Soft Computing, vol. 25, pp. 8417–8440, 2021.
View at: Google Scholar
H. Garg, J. Gwak, Z. Ali, T. Mahmood, and S. Aljahdali, “Some complex intuitionistic uncertain Linguistic Heronian mean operators and their application in multi-attribute group decision-making,” Journal of Mathematics, vol. 2021, Article ID 9986704, 31 pages, 2021.
View at: Publisher Site | Google Scholar
I. Irvanizam, N. N. Zi, R. Zuhra, A. Amrusi, and H. Sofyan, “An extended MABAC method based on triangular fuzzy neutrosophic numbers for multiple-criteria group decision making problems,” Axioms, vol. 9, no. 3, p. 104, 2020.
View at: Publisher Site | Google Scholar

Copyright

Copyright © 2021 Irvanizam Irvanizam et al. This is an open access article distributed under the Creative Commons Attribution License, which permits unrestricted use, distribution, and reproduction in any medium, provided the original work is properly cited.

PDF Download Citation

Download other formats

Order printed copies

Views

1022

Downloads

1046

Citations