Linguistic Single-Valued Neutrosophic Multi-Criteria Group Decision Making Based on Personalized Individual Semantics and Consensus

1Introduction

A multi-criteria group decision-making (MCGDM) problem is defined as a decision problem where several experts (judges, decision makers (DMs), etc.) provide their evaluations on a set of alternatives regarding multiple criteria and seek to achieve a common solution that is most acceptable by the group of experts as a whole (Kabak and Ervural, 2017; Wang et al., 2021). One important issue in MCGDM is to depict the ratings of experts. As the socio-economic environment becomes increasingly complex, it becomes difficult for DMs to specify their preferences with crisp values. Zadeh (1965) pioneered fuzzy sets (FSs), which are characterized by membership functions and considered as an effective tool to capture uncertain information. In order to capture DMs’ imprecise preferences, Atanassov (1986) introduced the concept of intuitionistic fuzzy sets (IFSs), which are considered as an extension of Zadeh’s fuzzy sets (Zadeh, 1965). IFSs have been widely applied to address impreciseness and uncertainty information in MCGDM problems (Chen et al., 2020; Garg and Kumar, 2019; Ohlan, 2022; Seikh and Mandal, 2022; Wan et al., 2020; Zhao et al., 2021). For an overview of IFSs and their extensions in MCGDM, one can refer to Xu and Zhao (2016).

Although FSs and IFSs have been extended to manage various MCGGDM problems, they failed to effectively handle a situation where the indeterminate and inconsistent information are involved. To manage such issues, Smarandache (1999) pioneered neutrosophic sets that consider the truth, indeterminacy and falsity memberships, simultaneously. Neutrosophic sets are regarded as a flexible tool in coping with information involving uncertainty, incompleteness and inconsistency (Peng and Dai, 2020). However, without specific description, neutrosophic sets are hard to be applied in actual situations. Wang et al. (2010) introduced single-valued neutrosophic sets (SVNSs), which are considered as an extension of neutrosophic sets. Moreover, various extensions of neutrosophic sets, such as interval neutrosophic sets (Liu et al., 2022; Wang et al., 2005), trapezoidal neutrosophic sets (Liang et al., 2018b; Sarma et al., 2019), type-2 neutrosophic sets (Gokasar et al., 2022), multi-valued neutrosophic sets (MVNSs) (Ji et al., 2018; Ye et al., 2022), probability MVNSs (Liu and Cheng, 2019; Peng et al., 2018), interval-valued fermatean neutrosophic sets (Broumi et al., 2022) and complex fermatean neutrosophic sets (Broumi et al., 2023) have been proposed and applied to address various neutrosophic multi-criteria decision making (MCDM) problems, such as investment decision, personnel selection, disaster management and designing a stable sustainable closed-loop supply chain network (Kalantari et al., 2022). Among various forms of neutrosophic sets, SVNSs are considered as one of the most concise tools to capture DMs’ evaluations (Peng and Dai, 2020).

Over the past years, lots of studies have been witnessed focusing on MCDM and MCGDM based on SVNSs and their extensions, which can be roughly grouped into two categories (Nguyen et al., 2019; Peng and Dai, 2020). The first category is based on various neutrosophic aggregation operators, such as single-valued neutrosophic number (SVNN) generalized power averaging operator (Liu and Liu, 2018), SVNN weighted geometric averaging (WGA) operator (Refaat and El-Henawy, 2019), and SVNN ordered weighted harmonic averaging operator (Paulraj and Tamilarasi, 2022). The second category is based on kinds of neutrosophic measures (Hezam et al., 2023; Karabasevic et al., 2020; Kumar et al., 2020; Peng and Dai, 2018; Sun et al., 2019; Tian et al., 2020; Zhang et al., 2023). For example, Hezam et al. (2023) proposed a neutrosophic discrimination measure-based COPRAS framework, and applied it to evaluate the sustainable transport investment projects. Karabasevic et al. (2020) developed an extended TOPSIS method based on the SVNN Hamming distance measure, and applied it to e-commerce development strategies selection. Sun et al. (2019) developed a new distance measure for SVNNs, based on which an extended TODIM and ELECTRE III methods were proposed and applied in physician selection.

The above-mentioned approaches are effective when copying with MC(G)DM problems with SVNNs. However, specific numerical evaluations cannot always accurately reflect DMs’ behaviour and opinions because of the limitation of their cognition. Actually, DMs usually prefer to elicit their evaluations with linguistic terms, such as “poor”, “good” and “perfect” due to the prominent advantages of linguistic terms for characterizing ambiguous and inexact assessments (Zadeh, 1975). Recently, Li Y. et al. (2017) proposed linguistic single-valued neutrosophic sets (LSVNSs) which employ a triple-tuple linguistic structure to characterize the truth, indeterminacy and falsity memberships of LSVNSs. Since LSVNSs integrate the advantages of SVNSs and linguistic term sets (LTSs), various MC(G)DM methods on the basis of linguistic single-valued neutrosophic numbers (LSVNNs) have been proposed. For example, Fang and Ye (2017) developed a linguistic neutrosophic MCGDM method based on the LSVNN weighted arithmetic averaging (WAA) and WGA operators. Garg and Nancy (2018) proposed the LSVNN prioritized WAA and WGA operator-based MCGDM method. Moreover, several comprehensive MCGDM methods that integrate with the LSVNN power WAA and WGA operators and TOPSIS (Liang et al., 2018a), and the EDAS (Li et al., 2019) were developed. These linguistic neutrosophic MCGDM methods have been applied to the university human resource management evaluation and property management company selection, respectively.

Although great efforts have been made to improve and extend the application of linguistic neutrosophic MCGDM methods, there still exist some challenges. The existing methods seem to overlook the semantics of individual DMs and the consensual solution. In the existing methods, numerical values are identified through calculating the index values of linguistic terms. In this way, the numerical values cannot indicate experts’ personalized individual semantics with respect to linguistic terms.

When tackling linguistic MCGDM problems, it is argued and accepted that words indicate different meanings for various DMs in computing with words (Mendel et al., 2010). Considering the issue of personalized individual semantics (PISs) is necessary. For example, two referees are invited to express evaluations about a manuscript. Both of them provide comments with “good”. However, linguistic term “good” may indicate different numerical semantics for them. Recently, different attempts have been made to copy with this issue, which can be roughly classified into three groups, including type-2 fuzzy set model (Mendel and Wu, 2010), multi-granular linguistic model (Morente-Molinera et al., 2015), and consistency-driven models (Li et al., 2017). Compared with the first two types of models, the consistency-driven model can effectively characterize the specific semantics of individuals, and becomes a popular tool to manage PISs in linguistic GDM. Thus, various consistency-driven models have been designed to assign personalized numerical scales (PNSs) based on linguistic preference relations (LPRs) (Zhang and Li, 2022), incomplete LPRs (Li et al., 2022a), distribution LPRs (Tang et al., 2020), and hesitant fuzzy LPRs with self-confidence (Zhang et al., 2021). In these models, DMs’ PISs can be explored according to their linguistic preferences in terms of a set of alternatives. The traditional PIS models are valid in the situations where the evaluations are expressed with LPRs or their extensions. However, they will fail to work when DMs’ evaluations are in forms of linguistic MCGDM matrices.

Recently, Li et al. (2022a) designed a data-driven learning model to investigate the PISs of DMs in MCGDM. In this model, two objectives are achieved through maximizing the minimum overall deviation among alternatives between any two consecutive categories, and minimizing the overall deviation among alternatives in a category. Inspired by the idea of Li et al. (2022b), this study aims to propose an improved framework to handle PISs and GDM, where the evaluations are presented in forms of MCGDM matrices with LSVNNs. The main novelties and contributions are summarized as follows:

The rest of the paper is organized as follows. Section 2 introduces some concepts about 2-tuple linguistic model and numerical scale (NS) model, neutrosophic sets and LSVNSs. Section 3 presents the concept of distance and discrimination measures for LSVNNs and develops a discrimination-based optimization model to obtain PNSs. Section 4 presents a comprehensive linguistic neutrosophic MCGDM framework considering the PIS and group consensus. Section 5 presents an illustrative example, followed by the comparative analysis to valid the proposed framework. Finally, Section 6 concludes this study.

2Preliminaries

3Optimization Model to Obtain PNSs in MCGDM with LSVNNs

This section presents the concepts of distance and discrimination measures of LSVNNs, based on which a programming model is constructed to derive the PNSs of each DM.

For convenience, assume that M={1,2,…,m}, N={1,2,…,n} and Q={1,2,…,q}. Assume that A={a1,a2,…,am} (m⩾2) is a set of alternatives; C={c1,c2,…,cn} (n⩾2) is a set of criteria and wj∈[0,1] is the corresponding weight of criterion cj, satisfying ∑j=1nwj=1; and E={e1,e2,…,eq} (q⩾2) is a set of experts and each expert is assigned with a weight λh∈[0,1], satisfying ∑h=1qλh=1. Suppose that Bh=[bijh]m×n (h∈Q) are the decision matrices, where bijh=⟨sbijhT,sbijhI,sbijhF⟩ is linguistic single-valued neutrosophic evaluation given by expert eh.

Assume that the standardized matrices are denoted by Rh=[rijh]m×n (h∈Q). The original decision matrices Bh=[bijh]m×n (h∈Q) can then be normalized into Rh=[rijh]m×n (h∈Q) based on the primary transformation rule of Li Y. et al. (2017), where

3.2Discrimination-Based Optimization Model to Obtain PNSs

As mentioned above, an expert is expected to be skilled and have the ability to discriminate the differences between cases. When experts are required to express linguistic ratings, their PISs of linguistic terms are embedded in the evaluations, which implicitly indicate the subtle differences among alternatives distinguished by experts. Therefore, an optimization model by maximizing the discrimination degree can be considered as a good solution to derive the PISs of DMs.

(9)

MaxDis(eh)=1m(m−1)∑j=1n∑i=1m∑k=1,k≠imwjd(rijh,rkjh)s.t.NSh(s0)=0,NSh(sθ)∈(θ−1τ,θ+1τ],θ=1,2,…,τ−1;θ≠τ2,NSh(sτ2)=0.5,NSh(sτ)=1,

where d(rijh,rkjh) is the distance measure of LSVNNs, as per Eq. (7).

By resolving Model (9), a set of possible PNSs of linguistic terms for DM eh can be derived, i.e. APSh={(NSh(s0),NSh(s1),…,NSh(sτ));…}. The obtained NSs can guarantee the maximum discrimination degree with respect to alternatives.

Example 2

Example 2(Continuation of Example 1).

Assume that R1=[rij1]4×4 and w are the same as Example 1. Then, the PNSs of linguistic terms for DM e1 can be obtained as follows:

Without loss of generality, ρ is set as ρ=1. The discrimination-based optimization model can be established based on Model (9).

(10)

MaxDis(e1)=13×4×4∑j=14∑i=14∑k=1,k≠i4d(rij1,rkj1)s.t.NS1(s0)=0,NS1(s1)∈(08,28],NS1(s2)∈(18,38],NS1(s3)∈(28,48],NS1(s4)=0.5,NS1(s5)∈(48,68],NS1(s6)∈(58,78],NS1(s7)∈(68,1],NS1(s8)=1.

By resolving Model (10), the PNSs of linguistic terms for DM e1 can be identified, i.e. NS1(s0)=0, NS1(s1)=0.05, NS1(s2)=0.125, NS1(s3)=0.45, NS1(s4)=0.5, NS1(s5)=0.55, NS1(s6)=0.875, NS1(s7)=0.95, and NS1(s8)=1. Moreover, according to Eq. (8), the discrimination degree is Dis′(e1)=0.1816, which is higher than that derived from Example 1. Specifically, compared to the method of without considering PISs in Example 1, the approach of considering PISs increases the discrimination degree of DM e1 by approximately 61%. Figure 1 vividly reveals the difference between the method of without considering and considering PISs.

Fig. 1

Results derived from without considering and considering PISs.

4Linguistic Single-Valued Neutrosophic MCGDM Considering PIS and Consensus

This section develops a comprehensive linguistic neutrosophic MCGDM framework that considers the PIS and group consensus.

4.3Proposed Framework for MCGDM with LSVNNs

This subsection presents a framework for managing MCGDM with LSVNNs considering the PIS and consensus, which is described in Fig. 2. The detailed steps are as follows:

Step 1: Normalize the decision matrices of group members.

Each member provides evaluation information with LSVNNs and the individual decision matrices are normalized based on Eq. (6), i.e. Rh=[rijh]m×n (h∈Q).

Step 2: Identify PNSs of linguistic terms for each DM.

The PNSs APSh (h∈Q) of linguistic terms can be derived based on Model (9).

Step 3: Determine the weight vector and obtain the collective evaluations of DMs.

The weight vector λ=(λ1,λ2,…,λq)T can be derived based on Model (14), and the collective evaluation matrix Rc=[rijc]m×n can be calculated based on Eq. (4).

Step 4: Derive the overall evaluations of each alternative.

The overall evaluations ric (i∈M) of each alternative can be calculated based on Eq. (4).

Step 5: Determine the ranking of alternatives.

The ranking of alternatives can be identified based on the score values S(ric) (i∈M) and accuracy values H(ric) (i∈M).

Fig. 2

Flowchart of the proposed approach.

5Illustrative Example

This section presents an illustrative example adapted from Garg and Nancy (2018) to demonstrate the application of the proposed approach.