1. Introduction

We always face tasks and activities in which it is necessary to use decision making processes in our daily lives. Generally, decision making is a cognitive process based on different mental and reasoning processes that lead to the choice of a suitable alternative from a set of possible alternatives in a decision situation^1–4. Despite the existence of different decision making processes in the literature composed of different phases, the TOPSIS method proposed in⁵ is useful, important and widely studied multiple attribute group decision making method, formally, the TOPSIS method originates from the concept that the selected alternative should have the shortest distance from the positive ideal solution and the farthest from the negative ideal solution, it’s decision making process can be expressed in the following five steps⁶: 1) normalization of decision matrix; 2) construction of weighted normalized decision matrix; 3) determination of positive and negative ideal solutions; 4) calculation of separation measures and relative closeness; 5) ranking of alternatives. After then, many extended TOPSIS methods have been applied to multiple attribute decision makings^7–13, such as, Chen¹⁴ proposed an extended TOPSIS method for multiple attribute decision makings by considering triangular fuzzy numbers and defining crisp Euclidean distance between two fuzzy numbers. Similarly, Ashtiani et al.¹⁵ extended the TOPSIS method to solve multiple attribute decision making problem with the interval-valued fuzzy sets. He and Gong¹⁶ proposed a natural generalization of the TOPSIS method to solve multiple attribute decision making problem with intuitionistic fuzzy sets. Liu, et al.¹⁷ developed a new TOPSIS method for decision making problems with interval-valued intuitionistic fuzzy data. Yue¹⁸ developed a method for decision making problems with interval number and extended his method to intuitionistic fuzzy sets.

Because of the inherent complexity and uncertainty of the decision situation or the existence of multiple and conflicting objectives in decision making problems, human beings often use fuzzy linguistic values to express complex or uncertain information in decision making process, and decision makings with fuzzy linguistic information attract many researchers^19–29, in which, the 2-tuple linguistic model³⁰ is a useful and important tool for expressing and dealing with linguistic information, which provides a continuous fuzzy representation for linguistic values by the translation of the linguistic value obtained from the symbolic computation to the closest linguistic value in the initial linguistic value set. Formally, the 2-tuple linguistic model consists of modeling the linguistic information by means of a pair of elements, one element is a linguistic value similar to the fuzzy linguistic approach whose semantics is provided by a fuzzy membership function and the syntax chosen according to the choices offered by the fuzzy linguistic approach, another element is a numerical value, also called symbolic translation, that indicates the translation of the fuzzy membership function which represents the closest linguistic value if it does not match exactly the computed linguistic information. Up to now, many new symbolic representation models to improve different aspects of the 2-tuple linguistic model have been developed and many different real-world decision makings based on 2-tuple linguistic model have been applied, such as, Xu³¹ introduced the extended linguistic variable based on the concept of virtual linguistic values to improve the operational laws of symbolic operations. Wang and Hao³² proposed the linguistic proportional 2-tuple model to represent linguistic information that is a generalization and extension of the 2-tuple linguistic model, Guo et al.³³ later extended the linguistic proportional 2-tuple model by using a third parameter to deal with incomplete linguistic preferences. Dong et al.³⁴ presented the concept of numerical scale with the aim of completing the 2-tuple linguistic model and proportional 2-tuple models and making the elicitation of information more consistent in different decision situations. Li³⁵ proposed an extended 2-tuple linguistic model that fuses the use of virtual linguistic values and 2-tuple linguistic values. Yang³⁶ developed the counted linguistic variable for representing and aggregating linguistic information with the aim of providing better results and being easier to understand. Wei³⁷ investigated the 2-tuple linguistic multiple attribute group decision making problems in which the information about attribute weights is partially known. Cables et al.³⁸ proposed a decision making method in which the decision makers provided their assessment information to represent their qualitative preferences under 2-tuple linguistic environment. Moreover, many 2-tuple linguistic aggregation operators have been proposed in literatures^39–44 to make the aggregation of linguistic information much more flexible, we refer⁴ for more details about 2-tuple linguistic model and decision makings based on 2-tuple linguistic model.

Recently, inspired by intuitionistic fuzzy sets and 2-tuple linguistic values, Chen, et al.⁴⁵ developed the concept of linguistic intuitionistic fuzzy numbers where membership and and nonmembership are represented as 2-tuple linguistic values. In order to process the multiple attribute decision making with linguistic intuitionistic fuzzy numbers, they provided the linguistic score index and linguistic accuracy index of number, analyzed the operation laws for linguistic intuitionistic fuzzy numbers and the related properties of the operation laws. Furthermore, they developed the linguistic intuitionistic fuzzy weighted averaging operator, linguistic intuitionistic fuzzy ordered weighted averaging operator and linguistic intuitionistic fuzzy hybrid averaging (LIFHA) operator, which can be utilized to aggregate the linguistic intuitionistic fuzzy information. Based on linguistic intuitionistic fuzzy numbers, this paper propose the linguistic intuitionistic fuzzy set TOPSIS method for linguistic multi-criteria decision makings, in which, we present Hamming distance between two linguistic intuitionistic fuzzy sets and analyze it’s several properties, then we provide the positive ideal solution, the negative ideal solution and the relative closeness degree of alternatives to solve LMCDMs. In numerical example, we compare the linguistic intuitionistic fuzzy set TOPSIS method with the HFL-VIKOR method⁴⁶, the symbolic aggregation-based method⁴⁷ and the HFL-TOPSIS method⁴⁸. The rest of this paper is structured as follows: In Section 2, we briefly review some basic concepts and linguistic intuitionistic fuzzy numbers. In Section 3, we define Hamming distance between two linguistic intuitionistic fuzzy sets and analyze their several properties. In Section 4, we present the framework of the linguistic intuitionistic fuzzy set TOPSIS method, and provide an algorithm to deal with LMCDMs in linguistic intuitionistic fuzzy set environment. In Section 5, we utilize a LMCDM problem to illustrate the practicality of the linguistic intuitionistic fuzzy set TOP-SIS method and comparison results. We conclude the paper in Section 6.

2. Preliminaries

In this section, we briefly review some basic concepts in 2-tuple linguistic model and linguistic intuitionistic fuzzy numbers.

The 2-tuple fuzzy linguistic representation model consists of a pair of elements ³⁰, which is explained as follows: 1) Let s_i ∈ S = {s₀,s₁,s₂,…,s_g} be a initial linguistic term set, whose semantics is provided by a fuzzy membership function on a universe of discourse, an ordered structure provided in the linguistic term set is a total order, i.e., for any s_i,s_j ∈ S, s_i ⩽ s_j if and only if i ⩽ j, moreover, a negation operator is Neg(s_i) = s_j such that j = g − i (g + 1 is the cardinality), the maximal and minimal operators are max{s_i,s_j} = s_j and min{s_i,s_j} = s_i if s_i ⩽ s_j; 2) α is a numerical value that indicates error when a fuzzy membership function is translated to the closest linguistic term, i.e.,

Accordingly, the 2-tuple linguistic value is a pair of elements noted as (s_i,α), which can be used to express the linguistic information on a universe of discourse, for example, a set of nine linguistic terms S on [0,1] is S = {s₀ (extremely poor), s₁ (very poor), s₂ (poor), s₃ (slightly poor), s₄ (fair), s₅ (slightly good), s₆ (good), s₇ (very good), s₈ (extremely good)} and their fuzzy sets on [0,1] are graphically shown in Fig. 1.

Fig. 1.

Fuzzy sets of S on [0,1]

In which, such as the 2-tuple linguistic value (s₄,0.3) = s_4.3 corresponds to fuzzy set s_4.3 in Fig. 1, formally, using the 2-tuple linguistic model can effectively avoid the loss and distortion of information in linguistic information processing, for simplify, we denote S_[0,g] = {s_α|s₀ ⩽ s_α ⩽ s_g} as all 2-tuple linguistic values on [0,1]³¹.

3. The distance between two linguistic intuitionistic fuzzy numbers

The distance measure is an important notion in existed TOPSIS methods. Inspired by the distance measure of intuitionistic fuzzy sets²⁷, we can define the following Hamming distance between two linguistic intuitionistic fuzzy sets.

4. The linguistic intuitionistic fuzzy set TOPSIS method

In this section, we present the linguistic intuitionistic fuzzy set TOPSIS method to solve LMCDMs, the method is mainly consisted of the four phases, i.e.,

1. 1.

   construct the linguistic intuitionistic fuzzy decision matrix;

2. 2.

   determine the positive and negative ideal solutions of alternatives;

3. 3.

   calculate the relative closeness degree of every alternative;

4. 4.

   rank alternatives according to their relative closenesses degree.

Where, we use the linguistic intuitionistic fuzzy decision matrix to express linguistic assessments of alternatives, i.e., in LMCDMs, we utilize linguistic intuitionistic fuzzy sets on S and weights of criteria to represent uncertain linguistic assessments of alternatives provided by decision maker with respect to criteria, which is described in Subsection 4.1. In Subsection 4.2, based on the linguistic intuitionistic fuzzy decision matrix, we adopt ∪ and ∩ operations of linguistic intuitionistic fuzzy sets and the linguistic intuitionistic fuzzy weighted averaging operator to determine the positive and negative ideal solutions of alternatives. In Subsection 4.3, we use Hamming distance between linguistic intuitionistic fuzzy assessment of each alternative and the positive and negative ideal solutions to calculate the relative closeness degree of each alternative, then according to relative closeness degrees, we rank the preference order of all alternatives. We also provide Algorithm 1 in the end of Subsection 4.3 to automatically deal with LMCDM problems.

Input: The numbers of alternatives (m) and criteria (n), the linguistic term set S = {s0,s1,··· ,sg}.

Output: The ranking of alternatives and the most satisfying alternative.

Begin

Step 1: According to the membership and nonmembership fuzzy linguistic assessments and Eq.(5), the linguistic intuitionistic fuzzy decision matrix D of the LMCDM problem can be constructed;

Step 2: For each column of D, calculate ˅cj and ˄cj, then the linguistic intuitionistic fuzzy weighted averaging operator is used to determine PIS (Eq.(6)) and NIS (Eq.(7));

Step 3: For each row of D, the linguistic intuitionistic fuzzy weighted averaging operator is used to obtain the linguistic intuitionistic fuzzy assessment Ai (Eq.(8)) of each alternative xi;

Step 4: For each alternative, Hamming distances d(Ai,PIS) and d(Ai,NIS) between each Ai and PIS (or NIS) are calculated by Eqs.(9) and (10), the maximum Hamming distance dmax− (Eq.(11)) of all d(Ai,NIS)(i = 1,…,m) and the minimum Hamming distance dmin+ (Eq.(12)) of all d(Ai,PIS)(i = 1,…,m) are obtained, then the relative closeness degree C(xi) of each alternative xi is calculated by Eq.(13);

Output: xi ≺ xi′ if and only if C(xi) ⩽ C(xi′) by using Eq.(14).

end

5. Numerical example

In this section, we utilize an example to illustrate the practicality of the linguistic intuitionistic fuzzy set TOPSIS method, and compare the linguistic intuitionistic fuzzy set TOPSIS method with the HFLVIKOR method⁴⁶, the symbolic aggregation-based method⁴⁷ and the HFL-TOPSIS method⁴⁸. The example initially used in reference⁴⁶ to show the HFLVIKOR method.

By using the linguistic intuitionistic fuzzy set TOPSIS method (Algorithm 1), the LMCDM problem can be carried out as follows:

Step 1: According to Table 3 and Eq.(5), we use S′ to obtain the linguistic intuitionistic fuzzy decision matrix D, i.e.,

In Table 3, such as for hesitant fuzzy linguistic term sets {s₁,s₂,s₃} of a₁ with respect to c₁, in S′, {s₁,s₂,s₃} is transformed as {s₄,s₅,s₆}, then we select s₄ = min{s₄,s₅,s₆} as the membership fuzzy linguistic assessment of a₁ with respect to c₁ and s₀ = s_{g−max{4,5,6}} as the nonmembership fuzzy linguistic assessment of a₁ with respect to c₁, i.e., the linguistic intuitionistic fuzzy set of a₁ with respect to c₁ is (s₄,s₀), others linguistic intuitionistic fuzzy sets in D can be similarly obtained. Formally, for any hesitant fuzzy linguistic term set {s_i,…,s_j}(i ⩽ … ⩽ j) on S = {s₀,…,s_g}, (s_i,s_g−j) is a linguistic intuitionistic fuzzy set on S due to i + g − j = g − ( j − i) ⩽ g. This does not mean that linguistic intuitionistic fuzzy sets and hesitant fuzzy linguistic term sets on S are equal to each other, because in real world practice, a decision maker provides a hesitant fuzzy linguistic term set {s_i,…,s_j}, it does not imply that s_i is membership fuzzy linguistic assessment and s_{g− j} is nonmembership fuzzy linguistic assessment. Here, we only limit discussion in a formal form, and we think that hesitant fuzzy linguistic term set and linguistic intuitionistic fuzzy set are two alternative tools for representing linguistic assessments of alternatives in linguistic decision making.

Step 2: For each column of D, we have

• ∨c₁ = (max{s₄,s₄,s₅},min{s₀,s₀,s₀}) = (s₅,s₀),

• ∨c₂ = (max{s₅,s₄,s₄},min{s₀,s₀,s₀}) = (s₅,s₀),

• ∨c₃ = (max{s₄,s₁,s₃},min{s₀,s₃,s₃}) = (s₄,s₀),

• ∧c₁ = (min{s₄,s₄,s₅},max{s₀,s₀,s₀}) = (s₄,s₀),

• ∧c₂ = (min{s₅,s₄,s₄},max{s₀,s₀,s₀}) = (s₄,s₀),

• ∧c₃ = (min{s₄,s₁,s₃},max{s₀,s₃,s₃}) = (s₁,s₃).

Based on Eqs.(6) and (7), we obtain the positive and negative ideal solutions are

Step 3: For each row of D, according to Eq.(8), we have

Step 4: For each alternative, according to Eqs.(9) and (10), we obtain the following Hamming distances

Based on Eqs.(11), (12) and (13), the maximum Hamming distance, the minimum Hamming distance and the relative closeness degree of each alternative are as follows:

Accordingly, the ranking of three alternatives is a₂ ≺ a₃ ≺ a₁ according to Eq.(14), and the set of most satisfying alternatives is A_MS = {a₁}.

In the following, we compare the linguistic intuitionistic fuzzy set TOPSIS method with the HFL-VIKOR method, the symbolic aggregation-based method and the HFL-TOPSIS method, in which, the HFL-VIKOR method, the symbolic aggregation-based method and the HFL-TOPSIS method transform assessments of alternatives into HFLTSs based on Table 3, however, the linguistic intuitionistic fuzzy set TOPSIS method transforms assessments of alternatives into linguistic intuitionistic fuzzy sets, we carry out comparison of four methods as follows.

a) The positive and negative ideal solutions: The HFL-VIKOR method⁴⁶ and the HFL-TOPSIS method⁴⁸ utilized the score function, the variance function, the Max and Min operators of HFLTSs to obtain PIS and NIS, this means that their PIS or NIS are one of HFLTSs of alternatives, such as in Table 4, {s₃} of PIS is HFLTS of c₃, {s₋₂,s₋₁, s₀} of NIS is HFLTS of c₃. Its drawback is that PIS or NIS may be a HFLTS of an alternative, such as NIS ({s₁,s₂,s₃},{s₁,s₂, s₃},{s₋₂,s₋₁,s₀}) is the HFLTS of a₂, i.e., this makes that a₂ is the worst alternative.

The symbolic aggregation-based method⁴⁷ utilized Min-upper and Max-lower operators to obtain the upper bound and the lower bound of each HFLTS and construct the core information of alternatives (CIA), such as for c₁, Min bounds of a₁, a₂ and a₃ are s₁, s₁ and s₂, so the Min-upper of c₁ is s₂. Max bounds of a₁, a₂ and a₃ are s₃, s₃ and s₃, so the Max-lower of c₁ is s₃, hence CIA for c₁ is [s₂,s₃]. Intuitively, CIA reduces HFLTSs into linguistic intervals, especially, if the Min-upper is equal to the Max-lower for each criterion, then CIA contain certain linguistic information, such as [s₃,s₃] for c₃ in Table 4, which maybe loss a lot of useful information, and there is no any hesitant fuzzy linguistic information in CIA.

In the linguistic intuitionistic fuzzy set TOPSIS method, we use linguistic intuitionistic fuzzy numbers on the linguistic term set S to represent assessments of alternatives, and utilize Union and Intersection of linguistic intuitionistic fuzzy numbers and the linguistic intuitionistic fuzzy weighted averaging operator to obtain PIS and NIS, which are still linguistic intuitionistic fuzzy numbers, i.e., hesitant fuzzy linguistic information PIS are contained in PIS and NIS, because we use the linguistic intuitionistic fuzzy weighted averaging operator, our PIS and NIS are different with PIS and NIS in methods ^46,47,48, this can be seen from Table 4.

b) The ranking of alternatives: In the HFL-VIKOR method⁴⁶, the hesitant fuzzy linguistic group utility measure HFLGU_i and the hesitant fuzzy individual regret measure HFLIR_i for the alternative a_i are defined by the hesitant fuzzy linguistic Euclidean L_p−metric, then the hesitant fuzzy linguistic compromise measure HFLC_i is established,

In the symbolic aggregation-based method⁴⁷, based on the CIA of each alternative, a binary preference relation between two alternatives is calculated, and the nondominance degree (NDD) of each alternative is used to obtain the set of nondominated alternatives, which indicates the degree to which alternative a_i is not dominated by the remaining ones. In the HFL-TOPSIS method⁴⁸, the Euclidean distance measure is used to obtain distances between alternatives and the positive and negative ideal solutions, then the relative closeness degree (RC) of each alternative is calculated to rank alternatives, where weights of criteria are not used in the symbolic aggregation-based method and the HFL-TOPSIS method.

In the linguistic intuitionistic fuzzy set TOPSIS method, we use Hamming distances between alternatives and the positive and negative ideal solutions to calculate the relative closeness of each alternative. As shown in Table 5, the ranking of alternatives are the same in the linguistic intuitionistic fuzzy set TOPSIS method and the HFL-VIKOR method⁴⁶, however, calculation of the linguistic intuitionistic fuzzy set TOPSIS method are simpler than the HFL-VIKOR method. We notice that the ranking results of the symbolic aggregation-based method and the HFL-TOPSIS method are different from that produced by the linguistic intuitionistic fuzzy set TOPSIS method and the HFL-VIKOR method, The reasons leading to this unconvincing result can be set out as follows: for one thing, with the symbolic aggregation-based method and the HFL-TOPSIS method, the weights of different criterion do not take into consideration; For another thing, when aggregating the HFLTSs by the symbolic aggregation operators, including the Min-upper operator and the Max-lower operator, the HFLTSs are reduced into linguistic intervals, which losses quite a lot of useful information. When aggregating the HFLTSs by Euclidean distance measure, including the normalized hesitant fuzzy linguistic terms, it only considers the distances from the ideal solution and from the negative-ideal solution, without considering their relative importance.

Summary, in Example 6, we respectively use hesitant fuzzy linguistic term sets and linguistic intuitionistic fuzzy sets to represent linguistic assessments of the LMCDM problem, then we compare the linguistic intuitionistic fuzzy set TOPSIS method with the HFL-VIKOR method, the symbolic aggregation-based method and the HFL-TOPSIS method, which are based on hesitant fuzzy linguistic term sets. An intriguing problem is which method is more reasonable among the above mentioned four methods or which representation of the above mentioned four methods is more reasonable? In real world practice, it is not possible to determine which one is the best suitable alternative for a given decision problem, this means that it is difficult to answer the intriguing problem. Theoretically, the testing criteria to evaluate the validity of MCDM methods in the same numerical data has been established such as in ⁴⁹, which can help us for our future research works.

6. Conclusions

Motivated by linguistic intuitionistic fuzzy numbers, in the paper, uncertain assessments information in linguistic multi-criteria decision makings are express by linguistic intuitionistic fuzzy sets on linguistic terms set, then Hamming distance between two linguistic intuitionistic fuzzy sets and their properties are presented and analyzed. Accordingly, the linguistic intuitionistic fuzzy set TOPSIS method for LMCDM problems is proposed, compared with the traditional TOPSIS methods, different the positive ideal solution, the negative ideal solution and the relative closeness degrees of alternatives are provided, based on the designed algorithm, LMCDM problems with linguistic intuitionistic fuzzy sets can be automatically carried out. An example is also utilized to illustrate the performance, usefulness and effectiveness of the linguistic intuitionistic fuzzy set TOPSIS method, and compare the method with the HFL-VIKOR method, the symbolic aggregation-based method and the HFL-TOPSIS method.

Acknowledgments

This work has been partially supported by the National Natural Science Foundation of China (Grant No.61372187), the scientific and technological project of Sichuan Province (2016GZ0099) and the open research fund of key laboratory of intelligent network information processing, Xihua University (szjj2014-052, szjj2015-061).