Some Induced Correlated Aggregating Operators with Interval Grey Uncertain Linguistic Information and Their Application to Multiple Attribute Group Decision Making

We propose the interval grey uncertain linguistic correlated ordered arithmetic averaging (IGULCOA) operator and the induced interval grey uncertain linguistic correlated ordered arithmetic averaging (I-IGULCOA) operator based on the correlation properties of the Choquet integral and the interval grey uncertain linguistic variables to investigate the multiple attribute group decision making (MAGDM) problems, in which both the attribute weights and the expert weights are correlative. Firstly, the relative concepts of interval grey uncertain linguistic variables are defined and the operation rules between the two interval grey uncertain linguistic variables are established.Then, two new aggregation operators: the interval grey uncertain linguistic correlated ordered arithmetic averaging (IGULCOA) operator and the induced interval grey uncertain linguistic correlated ordered arithmetic averaging (I-IGULCOA) operator are developed and some desirable properties of the I-IGULCOA operator are studied, such as commutativity, idempotency, monotonicity, and boundness. Furthermore, the IGULCOA and I-IGULCOA operators based approach is developed to solve the MAGDM problems, in which both the attribute weights and the expert weights are correlative and the attribute values take the form of the interval grey uncertain linguistic variables. Finally, an illustrative example is given to verify the developed approach and to demonstrate its practicality and effectiveness.


Introduction
Recently, multiple attribute group decision making (MAGDM) has been extensively applied to various areas such as society, economics, management, and military.It is well known that the object things are complex and uncertain and human thinking is ambiguous.Hence, the majority of multiple attribute group decision making is also uncertain and fuzzy, and fuzziness is the major factor in the process of decision making.However, in dealing with the problem of incomplete information caused by poor information, decision making also demonstrates its greyness.The "fuzzy" means those uncertain factors in the evaluation information which are caused by the fuzziness of human thinking, while the "grey" means that objective uncertainty caused by the insufficient and incomplete information.Therefore, the "fuzzy" and the "grey" are different concepts, many scholars have studied the grey fuzzy multiple attribute decision making, which demonstrates not only its fuzziness, but also its greyness.
Since Zadeh introduced the concept of the fuzzy set [1] and Deng firstly presented the grey system theory [2], which were well applied in multiple attribute group decision making [3][4][5][6][7][8][9][10][11][12][13], the research on the grey fuzzy group decision making problem has been widely investigated and applied to a variety of fields.Chen [14] introduced the concept of the grey fuzzy in detail in his book.Bu and Zhang [15] presented an approach to transform the grey fuzzy number into the interval number, and then utilized the ranking method of interval number to rank the order of alternatives.Basing on the grey fuzzy multiple attribute decision making, in which both the fuzzy part and the grey part are real numbers, Jin and Lou [16,17] used the decision making model which utilized the hamming distance to measure the alternatives and utilized the difference between the fuzzy positive ideal solution and the negative ideal solution to rank the order.In order to solve the grey fuzzy decision making, Dang and Sifeng [18] developed the maximum entropy formulism to determine attribute weight and ranked the order of alternatives based on the linear combination of fuzzy information and grey information.Meng et al. [19] proposed the grey degree and fuzzy degree with the interval numbers, and then, based on this, the mathematical model of interval-valued grey fuzzy comprehensive evaluation was established.At last its application to the selection of the preferred project was given.In many real-life decision making problems, the linguistic variable is easier to express fuzzy information and closer to actual condition; the research on linguistic decision making has witnessed rich achievements [3,11,[20][21][22][23][24][25][26][27].Liu and Jin [4] defined the concept of the interval grey linguistic variable where the fuzzy part and the grey part took the form of the uncertain linguistic variable and the interval number, respectively, studied the operation rules, and developed the multiple attribute decision making method based on the interval grey linguistic variable.Liu and Zhang [5] proposed the interval grey linguistic variables weighted geometric aggregation (IGLWGA) operator, and the interval grey linguistic variables ordered weighted geometric aggregation (IGLOWGA) operator and the interval grey linguistic variables hybrid weighted geometric aggregation (IGLHWGA) operator and then suggested a method for solving multiple attribute group decision making based on those operators.Zhang and Wei [28] introduced the interval grey linguistic variables ordered weighted aggregation (IGLOWA) operator, and then used the Choquet integral to develop the interval grey linguistic correlated ordered arithmetic aggregation (IGLCOA) operator and the interval grey linguistic correlated ordered geometric aggregation (IGLCOGA) operator.Those operators not only consider the importance of the elements, but also can reflect the correlations among the elements.Then, they developed an approach to multiple attribute decision making problems with correlative weights where the attribute values are given in terms of interval grey linguistic variables information based on those operators.
The existing grey fuzzy multiple attribute group decision making only considers the situation where all the elements in the grey fuzzy set are independent.However, in many practical situations, the elements in the grey fuzzy set are usually correlative.Therefore, we need to find some new ways to deal with the situations, in which the decision data in question are correlative and the weights are correlative.The Choquet integral [29] is a very useful way of measuring the expected utility of an uncertain event and can be utilized to depict the correlations of the decision data under consideration.Yager [30,31] introduced the idea of order-induced aggregation to the Choquet aggregation operator and defined an induced Choquet ordered weighted averaging (C-OWA) operator, which allowed the ordering of the arguments to be based upon some other associated variables instead of ordering the arguments based on their values.Tan and Chen [32] developed the induced Choquet ordered averaging (I-COA) operator and applied it to aggregate fuzzy preference relations in group decision making.Xu [25] utilized the Choquet integral to propose the interval-valued intuitionistic fuzzy correlated averaging (IVIFCA) operator and the intervalvalued intuitionistic fuzzy correlated geometric (IVIFCG) operator to aggregate interval-valued intuitionistic fuzzy information and applied them to a practical decision making problem involving the prioritization of information technology improvement projects.Wei and Zhao [33] developed the induced intuitionistic fuzzy correlated averaging (I-IFCA) operator and induced intuitionistic fuzzy correlated geometric (I-IFCG) operator and developed to solve the MAGDM problems, in which both the attribute weights and the expert weights are usually correlative and attribute values take the form of intuitionistic fuzzy values.
Motivated by the correlation properties of the Choquet integral and the uncertain linguistic variables, in this paper, we propose the interval grey uncertain linguistic correlated ordered arithmetic averaging (IGULCOA) operator and the induced interval grey uncertain linguistic correlated ordered arithmetic averaging (I-IGULCOA) operator with interval grey uncertain linguistic variables information.The prominent characteristic of those operators is that they cannot only consider the importance of the elements or their ordered positions, but also reflect the correlations among the elements or their ordered positions.And we introduce those induced correlated aggregating operators to deal with group decision making problems.The aim of this paper is to investigate the MAGDM problems, in which both the attribute weights and the expert weights are correlative and the attribute values take the form of interval grey uncertain linguistic variables.In order to do so, the remainder of this paper is set out as follows.
In the next section, we introduce some basic concepts related to interval grey uncertain linguistic variables and some operational laws of interval grey uncertain linguistic variables.In Section 3, we have developed two interval grey uncertain linguistic correlated aggregation operators: the IGULCOA operator and the I-IGULCOA operator.In Section 4, we have developed an approach to multiple attribute group decision making, in which both the attribute weights and the expert weights are correlative and the attribute values take the form of interval grey uncertain linguistic variables based on the IGULCOA operator and the I-IGULCOA operator with interval grey uncertain linguistic variables information.In Section 5, an illustrative example is pointed out.In Section 6, we conclude the paper and give some remarks.

Preliminaries
In this section, we briefly review some basic concepts to be used throughout the paper.
The linguistic approach is an approximate technique, which represents qualitative aspects as linguistic values by means of linguistic variables [34,35].
Suppose that  = {  |  = −, . . ., −1, 0, 1, . . ., } is a finite and totally ordered discrete term set, whose cardinality value is odd [35].Any label   represents a possible value for a linguistic variable (as shown in Figure 1), and it has the following characteristics: (1) the set is ordered as   >   , if  > , and (2) there is the negative operator: neg(  ) =  − .We call this linguistic label set  the additive linguistic scale.For example, a set of nine terms  could be defined as follows: in which   <   if  < .
To preserve all the given information, we extend the discrete term set  to a continuous term set  = {  |  ∈ [−, ]}.If   < , then we call   an original linguistic term; otherwise, we call   a virtual linguistic term.In general, the decision maker uses the original linguistic terms to evaluate alternatives, and the virtual linguistic terms can only appear in operation [10,36].
Let s = [  ,   ], where   ,   ∈ ,   and   are the lower and the upper limits, respectively, we then call  an uncertain linguistic variable.Let  be the set of all the uncertain linguistic variables [10].
Consider any three uncertain linguistic variables s = [  ,   ], s1 = [  1 ,   1 ], and s2 = [  2 ,   2 ], then we define the operations s1 ⊕ s2 and s as follows: ( where  ∈ [0, 1]; (3) s1 ⊕ s2 = s2 ⊕ s1 ; (4) (s 1 ⊕ s2 ) = s 1 ⊕ s 2 , where  ∈ [0, 1]; ( Definition 1 (see [14]).Let Ã() be the fuzzy subset in the space  = {}; if the membership degree   () of  to Ã() is the grey in the interval [0, 1], and its grey is   (), then Ã() is called the grey fuzzy set in space  (GF set, for short), denoted by Ã ⊗ (), as follows: The set pair mode is So the grey fuzzy set is regarded as the generalization of the fuzzy set and the grey set.Suppose that The continuous ordered weighted averaging ((C-OWA), for short) operator which is developed by Yager [37] can be usefully applied to aggregate the grey part, the greyness of the grey part would be transformed into a real number, and then the fuzzy part integrates with the grey part, that is to say, the size of the interval uncertain grey linguistic variables can be gotten through comparing the size of ), which can be obtained based on the continuous ordered weighted averaging (C-OWA) operator, such as   ([, ]) = ∫ 1 0 (()/)( − ( − )).In order to compare uncertain linguistic variables, we use the degree of possibility.

Some Interval Grey Uncertain Linguistic Correlated Ordered Arithmetic Averaging Operators
In multiple attribute group decision making, the considered attributes usually have different levels of importance and, thus, need to be assigned different weights.Some operators have been introduced to aggregate the interval grey uncertain linguistic variables together with independent weighted elements, but they only consider the addition of the importance of individual elements.However, in some practical situations, the elements in the interval grey uncertain linguistic variables have some correlations with each other and, thus, it is necessary to consider this issue.For real decision making problems, there is always some degree of interdependent characteristics between attributes.Usually, there is interaction among attributes of decision makers.However, this assumption is too strong to match decision behaviors in the real world.The independence axiom generally cannot be satisfied.Thus, it is necessary to consider this issue.
If all the elements in  are independent, then we have Based on Definition 5, in what follows we use the wellknown Choquet integral [29] to develop an operator for aggregating the interval grey uncertain linguistic variables with correlative weights.Below, we discuss two special cases of the IGULCOA operator.

An Approach to Multiple Attribute Group Decision Making Method Based on the IGULCOA Operator and the I-IGULCOA Operator
In this section, we will develop an approach to multiple attribute group decision making with interval grey uncertain linguistic variables information and correlated weight as follows.
In the following, we apply the IGULCOA and I-IGULCOA operators to multiple attribute group decision making based on interval grey uncertain linguistic information and correlated weight.The method involves the following steps.
Step 5.The ranking of the alternatives can be gained and the best one can be found out.

Illustrative Example
Let us suppose there is an investment company, which wants to invest a sum of money in the best option.There is a panel with four possible alternatives to invest the money: (1)  1 is a car company.
The investment company must take a decision according to the following four attributes: (1)  1 is the risk analysis.
(4)  4 is the environmental impact analysis.
The four possible alternatives { 1 ,  2 ,  3 ,  4 } are to be evaluated by the three decision makers { 1 ,  2 ,  3 } under the above four attributes and construct, respectively, the inducing ] .

Conclusion
In this paper, we use the Choquet integral to propose the interval grey uncertain linguistic correlated ordered arithmetic aggregation (IGULCOA) operator and the induced interval grey uncertain linguistic correlated ordered geometric aggregation (I-IGULCOA) operator, which are used to discuss the correlative interval grey uncertain linguistic variables.Furthermore, we also analyze the relation between it and some known operators and develop an approach to multiple attribute group decision making with the correlative attributes weights and the correlative expert weights, in which the attribute values are given in terms of the induced interval grey uncertain linguistic variables based on the interval grey uncertain linguistic correlated ordered arithmetic aggregation (IGULCOA) operator and the induced interval grey uncertain linguistic correlated ordered geometric aggregation (I-IGULCOA) operator.Finally, an illustrative example has been given to show the developed method.The applications of the operator in many actual fields, such as decision making, pattern recognition, and clustering analysis, are open questions for future research.