1. Introduction
Decision problems with fuzzy and uncertain information exist extensively in the real decision making process since decision problems become increasingly complicated. Many useful tools have been developed to model these information, among which Spherical fuzzy sets is an important one developed by Ashraf et al. [
1] by extending picture fuzzy sets and intuitionistic fuzzy sets [
2,
3]. Spherical fuzzy sets have been studied and extended extensively [
4,
5].
Ashraf and Abdullah [
6] developed generalized spherical aggregation operators based on the Archimedean t-norm and t-conorm. Donyatalab et al. [
7] defined a spherical fuzzy weighted mean operator and Spherical Fuzzy Einstein weighted Harmonic mean operator. T-spherical fuzzy sets were proposed by Mahmood et al. [
8] to generalize Spherical fuzzy sets. Zeng et al. [
9] proposed some Einstein geometric averaging interactive aggregation operators.
Zeng et al. [
10] introduced T-spherical fuzzy interactive aggregation operators with associate probability. Al-Quran [
11] proposed T-spherical hesitant fuzzy sets by combining the hesitant fuzzy and the T-spherical hesitant fuzzy set. Some T-spherical hesitant fuzzy weighted averaging operators have been defined, including the T-spherical hesitant fuzzy weighted averaging operator and the T-spherical hesitant fuzzy weighted geometric operator in [
11].
Jan et al. [
12] developed the T-spherical fuzzy graph concept and dominant theory of T-spherical fuzzy graphs. Munir et al. [
13] defined some Einstein operations based on the Einstein t-norms and t-conorms for T-spherical fuzzy set and developed some T-spherical fuzzy Einstein geometric averaging aggregation operators. Ju et al. [
14] extended the TODIM method to the T-spherical fuzzy environment. Xian et al. [
15] applied the T-spherical fuzzy c-means method to image segmentation.
Zedam et al. [
16] defined the T-spherical fuzzy graph and some related concepts, including subgraphs, the shortest path etc. Guleria and Bajaj [
17] applied the T-spherical fuzzy graph notion for supply chain management problems. Mahmood et al. [
18] developed T-spherical fuzzy MULTIMOORA method and T-spherical fuzzy Dombi prioritized aggregation operators. Munir et al. [
19] introduced some T-spherical fuzzy interactive geometric operators with immediate probability information.
Liu et al. [
20] proposed a decision making method based on the T-spherical fuzzy generalized Maclaurin symmetric mean operator and applied it into the problem of selecting the Yunnan Baiyao’s R&D project. Wang and Chen [
21] presented the T-spherical fuzzy ELECTRE approach by incorporating two forms of Minkowski distance measures. T-spherical fuzzy correlation coefficients [
22] and T-spherical fuzzy similarity measures [
23] have been studied, and their applications in clustering were presented.
Khan et al. [
24] studied T-spherical fuzzy Schweizer–Sklar weighted geometric Heronian mean operator. Garg et al. [
25] proposed the T-spherical fuzzy interactive geometric operators. Mahmood et al. [
26] defined interval-valued T-spherical fuzzy soft sets and developed some interval-valued T-spherical fuzzy soft aggregation operators. Garg et al. [
27] developed T-spherical fuzzy power aggregation operators.
Ullah et al. [
28] defined some T-spherical fuzzy Hamacher aggregation operators. Based on the T-spherical fuzzy values, some new fuzzy sets have been defined and studied [
29,
30,
31,
32,
33,
34,
35,
36]. Chen et al. [
32] presented generalized T-spherical fuzzy geometric aggregation operators; however, the interaction of the operation laws has not been considered.
Though many T-spherical fuzzy multiple attribute decision making methods have been proposed, there are still many decision making problems that cannot be solved using existing methods. Aggregation operators are important in decision making process [
36], we develop some new T-spherical fuzzy aggregation operators based on the Bonferroni mean operator and Dombi operator in this paper.
The Bonferroni mean operator is the product of each input value with the average one of the other input values [
37,
38]. The Bonferroni mean operator has been extended extensively. The Bonferroni geometric mean operator has been studied by Xia et al. [
39] and Li et al. [
40]. Zhu and Xu [
41] developed the hesitant fuzzy Bonferroni mean operator. Zhu et al. [
42] studied the hesitant fuzzy geometric Bonferroni mean operator.
He et al. [
43] developed the intuitionistic fuzzy geometric power Bonferroni means operators by combing the geometric Bonferroni mean operator with the power mean operator. Park et al. [
44] studied optimized weighted geometric Bonferroni means for intuitionistic fuzzy information. Wei et al. [
45] proposed the uncertain linguistic Bonferroni mean operators. Liu and Liu [
46] defined the intuitionistic uncertain linguistic partitioned Bonferroni mean operators. Chen et al. [
47] developed the linguistic 2-tuple geometric Bonferroni mean operator.
Yang et al. [
48] studied hesitant Pythagorean fuzzy geometric weight Bonferroni mean operator considering interactions between arguments. Yang et al. [
49] studied Pythagorean fuzzy partitioned Bonferroni mean considering interactions. Yang and Pang [
50] studied fuzzy Bonferroni mean Dombi aggregation operators in q-rung orthopair fuzzy environments.
Liu and Liu [
51] defined normal intuitionistic fuzzy Bonferroni mean operators. Mesiarova-Zemankova et al. [
52] introduced the weighted Bonferroni mean considering interactions between inputs. Liang et al. [
53] presented interval-valued Pythagorean fuzzy Bonferroni mean operators. Ate and Akay [
54] developed picture fuzzy Bonferroni mean operators.
Mahmood and Ahsen [
55] presented some picture-hesitant fuzzy Bonferroni mean operators. Although the Bonferroni mean operator has been extended into various environments, the Bonferroni mean operator in T-spherical fuzzy environments has not been studied. Hence, we extend the Bonferroni mean operator to the T-spherical fuzzy environment considering the interaction operations between T-spherical fuzzy values.
The Dombi mean [
56] is a flexible aggregation method by a parameter that is based on the Dombi t-norm and Dombi t-conorm. The Dombi aggregation has also received extensive attention. Liu et al. [
57] studied Pythagorean fuzzy Dombi power average operators. Jana and Pal [
58] presented single-valued neutrosophic aggregation operators.
Wu et al. [
59] proposed Dombi Hamy mean operators in interval-valued intuitionistic fuzzy environments. Jana et al. [
60] developed some Dombi aggregation operators to aggregate Pythagorean fuzzy information. Shit and Ghorai [
61] presented some Fermatean fuzzy Dombi aggregation operators.
Kurama [
62] studied the similarity classifier with Dombi aggregation operators. Jana et al. [
63] proposed picture fuzzy Dombi aggregation operators. Gulfam et al. [
64] defined some bipolar neutrosophic Dombi aggregation operators. Ayub et al. [
65] presented cubic fuzzy Dombi aggregation operators using the Heronian mean. Akram et al. [
66] proposed complex Pythagorean fuzzy Dombi aggregation operators.
Ali and Mahmood [
67] presented some complex q-rung orthopair fuzzy Dombi aggregation operators. Khan et al. [
68] studied spherical fuzzy improved Dombi power averaging operators. Saha et al. [
69] studied hesitant fuzzy Archimedean Dombi aggregation operators. Kamaci et al. [
70] proposed bipolar trapezoidal neutrosophic Dombi operators.
Dombi aggregation operators have been used in typhoon disaster assessment problems [
71], personnel evaluation problems [
72], green supplier selection problems [
73] etc. Since the Bonferroni mean can consider the interaction between input arguments, and the Dombi mean is flexible in aggregation, we further extend the Bonferroni mean to combine the Dombi mean in T-spherical fuzzy environment and develop T-spherical fuzzy Dombi Bonferroni mean operators.
The main contributions of this paper are summarized as follows. (1) The T-spherical fuzzy values are used in the decision-making process to deal with complicated decision problems. (2) The T-spherical fuzzy interaction operation laws are used to reduce the influence of an extremely small membership degree, abstinence degrees or non-membership degree. (3) T-spherical fuzzy interaction Bonferroni mean operators are defined by extending the Bonferroni mean to accommodate the T-spherical fuzzy values by considering interactions. (4) T-spherical fuzzy Dombi Bonferroni mean operators are developed by combining the Bonferroni mean with Dombi mean operator in T-spherical fuzzy environments. (5) A new T-spherical fuzzy entropy measure and a new T-spherical fuzzy cross-entropy measure are proposed. The attribute weights are calculated using the proposed entropy and cross-entropy measure for partly known and completely unknown situations. (6) The decision making method based on the new T-spherical fuzzy Bonferroni mean operators are developed. Some comparisons are conducted to illustrate the practical advantages of the proposed method.
The rest of the paper is organized as follows. In
Section 2, some concepts about T-spherical fuzzy sets are reviewed, including the interaction operation laws of T-spherical fuzzy numbers. In
Section 3, some T-spherical fuzzy interaction Bonferroni mean operators are defined, including the T-spherical fuzzy interaction Bonferroni mean operator and T-spherical fuzzy interaction weighted Bonferroni mean operator. In
Section 4, the T-spherical fuzzy Dombi Bonferroni mean operator and the T-spherical fuzzy weighted Dombi Bonferroni mean operator are introduced.
In
Section 5, the T-spherical fuzzy entropy and cross-entropy measures are proposed, and a method to determine attribute weights using the cross-entropy measure is developed. In
Section 6, a new T-spherical fuzzy multiple attribute decision making method is presented based on the new proposed operators. In
Section 7, a numerical example is proposed to illustrate the new method. In the last section, our conclusions are given.
2. Preliminaries
Definition 1 ([
8])
. For a universal set X, a T-spherical fuzzy set (T-SFS) on X can be defined aswhere , and denote the membership degree, the abstinence degree and the non-membership degree, respectively, which satisfy the following condition The refusal degree is given as For simplicity, the triple is the T-spherical fuzzy number (T-SFN). . Let H be the set of all the T-spherical fuzzy values. Definition 2 ([
14])
. Let be a T-SFN, then the score function of α is defined as. Definition 3 ([
14])
. Let be a T-SFN, then the accuracy function of α is defined as. Definition 4 ([
14])
. Let and be two T-SFNs. Then,(1) If, then;
(2) If, and
, then ;
, then .
Let
and
be two T-SFNs,
. Then, the operational laws of T-spherical fuzzy values can be defined as follows [
20]
,
,
,
.
Then, by using the T-spherical fuzzy operational laws [
20], the T-spherical fuzzy weighted averaging (TSFWA) operator and the the T-spherical fuzzy weighted geometric averaging (TSFWGA) operator can be obtained, respectively, as
Example 1. Let,,,,. Then, the aggregated results are obtained asand.
From the above results, we can see that, if 0 is in the membership degree, the abstinence degree and the non-membership degree of the T-SFNs, then there may be 0 in the aggregated the membership degree, the abstinence degree and the non-membership degree even if other values are not zero. In order to avoid information loss, the following interaction operational laws of T-SFNs can be defined.
Let
,
and
be T-SFNs,
. The operational laws of T-SFNs considering interaction relationships among
are defined as follows [
14]
By using the interaction operation laws of T-spherical fuzzy numbers, the TSFWA operator and the TSFWGA operator become the T-spherical fuzzy interaction weighted averaging (TSFIWA) operator and the T-spherical fuzzy interaction weighted geometric averaging (TSFIWGA) operator as
Example 2. and t are the same as that in Example 1. By using the TSFIWA operator and the TSFIWGA operator, the aggregated results can be obtained as,.
Definition 5 ([
14])
. Let , be two T-SFNs. The T-spherical fuzzy generalized distance measure can be defined asIf , becomes the T-spherical fuzzy Hamming distance. If , becomes the T-spherical fuzzy Euclidean distance. 3. T-Spherical Fuzzy Interaction Bonferroni Mean Operator
Definition 6 ([
37])
. The Bonferroni mean aggregation operator of dimension n is a mapping ,where , is a collection of nonnegative real numbers. Definition 7. Letbe T-SFNs. The T-spherical fuzzy interaction Bonferroni mean (TSFIBM) operator can be defined aswhere. Theorem 1. Letbe T-SFNs,. The aggregated value of TSFIBM operator is still a T-SFN, and Proof. Since , . Similarly, . Then, and . Hence, the aggregated value of TSFIBM operator is still a T-SFN. □
In the following, we prove some important properties of the TSFIBM operator, including idempotency and boundedness.
Theorem 2 (Idempotency)
. If . Then Proof. Let
.
Hence, . □
Theorem 3 (Boundedness)
. Let be a collection of T-SFNs. If , , then Proof. Since , , , then . □
Definition 8. Letbe T-SFNs. The T-spherical fuzzy interaction geometric Bonferroni mean (TSFIGBM) operator can be defined aswhere. Theorem 4. Letbe T-SFNs,. The aggregated value of TSFIGBM operator is still a T-SFN and Proof. Let
. Since
,
can be proved easily. Moreover,
,
,
Hence,
Then, the aggregated value of TSFIGBM operator is still a T-SFN. □
Theorem 5 (Idempotency)
. If . Then, Theorem 6 (Boundedness)
. Let be a collection of T-SFNs. If , , then Definition 9. Letbe T-SFNs. The T-spherical fuzzy interaction weighted Bonferroni mean (TSFIWBM) operator can be defined aswhere,is the weight vector of T-SFNswithand. Theorem 7. Letbe T-SFNs,be the weight vector of T-SFNs withand. The aggregated value of TSFIWBM operator is still a T-SFN and Definition 10. Letbe T-SFNs,. The T-spherical fuzzy weighted interaction geometric Bonferroni mean (TSFIWGBM) operator can be defined as Theorem 8. Letbe T-SFNs,be the weight vector of T-SFNs withand. The aggregated value of TSFIWGBM operator is still a T-SFN and Example 3. , and t are the same as that in Example 1. By using the TSFIWBMoperator and the TSFIWGBMoperator, the aggregated results can be obtained as,.
4. T-Spherical Fuzzy Dombi Bonferroni Mean Operator
Definition 11. Let. The Dombi T-normand Dombi T-conormare defined as follows. Definition 12. Let,be two T-SFNs. The operational laws of T-SFNs based on the Dombi T-normand Dombi T-conormare defined as
Definition 13. Letbe T-SFNs,. The T-spherical fuzzy Dombi Bonferroni mean (TSFDBM) operator can be defined as Theorem 9. Letbe T-SFNs,. The aggregated value of TSFDBM operator is as follows. Theorem 10. Letbe T-SFNs,,. Then,.
Proof. Let
.
Hence, . □
Theorem 11. (Boundedness) Letbe a collection of T-SFNs. If,, then Definition 14. Letbe T-SFNs,. The T-spherical fuzzy geometric Dombi Bonferroni mean (TSFGDBM) operator can be defined as Theorem 12. Letbe T-SFNs,. The aggregated value of TSFGDBM operator is as follows Theorem 13. Letbe T-SFNs,,. Then,.
Proof. Let
.
Hence, . □
Theorem 14 (Boundedness)
. Let be a collection of T-SFNs. If , , then Definition 15. Letbe T-SFNs,. The T-spherical fuzzy weighted Dombi Bonferroni mean (TSFWDBM) operator can be defined as Theorem 15. Letbe a collection of T-SFNs,. The T-spherical fuzzy weighted Dombi Bonferroni mean (TSFWDBM) operator is as follows Theorem 16 (Boundedness)
. Let be a collection of T-SFNs. If , , then Definition 16. Letbe T-SFNs,. The T-spherical fuzzy weighted geometric Dombi Bonferroni mean (TSFWGDBM) operator can be defined as Theorem 17. Letbe a collection of T-SFNs,. The TSFWGDBM operator is as follows Theorem 18 (Boundedness)
. Let be a collection of T-SFNs. If , , then 5. T-Spherical Fuzzy Entropy and Cross-Entropy Measure
Let
be T-spherical fuzzy set,
. Then, an entropy measure is defined as follows
The entropy measure satisfies the following axioms:
(1) .
(2) if or .
(3) if .
(4) if and .
(5) .
Let
and
be a T-spherical fuzzy set,
,
. Then, the T-spherical fuzzy cross-entropy measure can be defined as
The T-spherical fuzzy cross-entropy measure satisfies the following conditions:
(1)
(2) if
(3) .
The symmetric T-spherical fuzzy cross-entropy measure is defined as
In the decision making process, there are case attribute weights that are partly known or completely unknown. The attribute weights can be determined by using the entropy measure and cross-entropy measure proposed above. Let
be decision matrix. If the attribute weights are unknown completely, the following mathematical programming model can be set up.
The Lagrange function
is set up as
Then, calculate the partial derivatives of
and set them to zero.
If the attribute weights are partly known, the following linear programming model is set up.
where
H is the set of partly known attribute weights, including the following cases:
,
,
,
,
,
,
,
.
6. T-Spherical Fuzzy Decision Methods Based on Bonferroni Mean Operator
A new T-spherical fuzzy multiple attribute decision making method based on Bonferroni mean operators is developed in this section. Let be the alternatives and be the attributes. is the weight vector of the attributes with and .
The T-spherical fuzzy numbers are given by decision makers to evaluate alternatives. Based on the introduced T-spherical fuzzy Bonferroni mean operators, a new T-spherical fuzzy multiple attribute decision making method is proposed as in Algorithm 1. The flowchart of the algorithm is shown in
Figure 1.
Algorithm 1 T-spherical fuzzy decision making method based on Bonferroni mean operator |
Step 1. T-spherical fuzzy evaluation values are given by decision makers to form T-spherical fuzzy decision matrix . Step 2. Calculate the weights of attributes using Equation ( 20) for completely unknown situations.
For partly known attribute situation, Model (M-2) is used to calculate the attribute weights. Step 3. Aggregate the T-spherical fuzzy evaluation values into collective ones using the TSFWIBM operator, the TSFWIGBM operator, the TSFWGDBM operator or the TSFWDBM operator as follows
or
Step 4. Rank according to Definition 4 and select the optimal alternative. |
7. Numerical Example
Increasingly, students are entering university for higher education due to the development of Chinese higher education. Some old campuses are located in the city center, and there is no room for new buildings to accommodate more students. Some universities choose to construct new campuses in rural areas. There is a university constructing a new campus in Gaoxin district of Xi’an city. Several new dormitory buildings for students have been built, and there is the need to purchase new furniture.
The following attributes are considered: price, quality, after-sales service, transportation cost and convenience of use. The university rear service group invited several experts from different fields, including the purchasing department, finance department etc. There were five furniture companies left for further select after pre-evaluation: Zhongwei furniture company, Jongtay furniture company, Yongnuo furniture company, Yicai furniture company and Jiheng furniture company. The proposed algorithm is used to select the best furniture company. .
Step 1. The T-spherical fuzzy evaluation values are given by experts, and a decision matrix is formed as
in
Table 1.
Step 2. Assume the attribute weights are completely unknown and can be calculated by Equation (
20). First,
can be calculated as as in
Table 2. Then, calculate the
. For example
.
.
. Other
can be calculated similarly. By using Equation (
20), the weights can be calculated as
.
Step 3. If the TSFWIBM operator is used to aggregate evaluation values and
,
, the aggregated results can be calculated by Equation (
21) to obtain
,
,
,
,
.
Step 4. The scores of the can be calculated as , , , , . Then, can be ranked according to the scores to obtain , and the optimal alternative is .
For other
considered in the TSFWIBM operator, including
, and
, the aggregated results are shown in
Table 3, and the ranking results are shown in
Table 4. From the results, we can see that the optimal alternative is
, and the suboptimal alternative is
in the TSFWIBM operator. There are slight differences in ranking for different
.
is ranked third, and
is ranked fourth in
and
. With the increasing
k and
l,
is ranked third, and
is ranked fourth.
For the TSFWIGBM operator used in the aggregation process in Step 3, the T-spherical fuzzy aggregated results are shown in
Table 5, and the ranking results are shown in
Table 6 In most cases, the optimal alternative is
, and the suboptimal alternative is
except for
, in which the optimal alternative is
, and the suboptimal alternative is
.
is ranked third,
is ranked fourth, and
is ranked last in all cases. The optimal alternative is different in the TSFWIBM operator and the TSFWIGBM operator due to different characteristics of the geometric Bonferroni mean and geometric Bonferroni mean operator.
In the TSFWDBM operator and the TSFWGDBM operator, there are more parameters, including
, which are more flexible comparing with the TSFWIBM operator and the TSFWIGBM operator. If the TSFWDBM operator or the TSFWGDBM operator is used in the aggregation process in Step 3, we only present the scores and ranking results for space limit. We consider
and
, respectively. For the TSFWDBM operator, the results are shown in
Table 7.
The optimal alternative is in most cases. With the increasing of , the ranking becomes and . If in the TSFWDBM operator, the optimal alternative is and the suboptimal alternative is or . is the optimal alternative if in the TSFWDBM operator.
For the TSFWGDBM operator, the results are shown in
Table 8.
are the top three alternatives and ranking of
is different for different parameters. Since each operator has its own characteristics and focuses on each aspect of the problem, the different rankings are reasonable. For example, the
can be seen as the risk attitude of the decision maker. Decision makers are more risk seeking with the increasing of
.
8. Advantages and Comparison Analysis
Advantages
The T-SFS can be reduced to some other fuzzy sets, including the spherical fuzzy set, Pythagorean fuzzy set, q-rung orthopair fuzzy set, picture fuzzy set, intuitionistic fuzzy set etc. Then, the proposed operators can be reduced to some other fuzzy aggregation operators.
1. If all the values satisfy , then the TSFIBM operator becomes the spherical fuzzy interaction Bonferroni mean (SFIBM) operator, the TSFIGBM operator becomes the spherical fuzzy interaction geometric Bonferroni mean (SFIGBM) operator. Other T-spherical fuzzy Bonferroni mean operators also reduce to the corresponding spherical fuzzy Bonferroni mean operators.
2. If all the values satisfy , then the TSFIBM operator becomes the picture fuzzy interaction Bonferroni mean (PFIBM) operator, and the TSFIGBM operator becomes the picture fuzzy interaction geometric Bonferroni mean (PFIGBM) operator. Other T-spherical fuzzy Bonferroni mean operators also reduce to the corresponding picture fuzzy Bonferroni mean operators.
3. If all the values satisfy and , then the TSFIBM operator becomes the q-rung orthopair fuzzy interaction Bonferroni mean (q-ROFIBM) operator, the TSFIGBM operator becomes the q-rung orthopair fuzzy interaction geometric Bonferroni mean (q-ROFIGBM) operator. Other T-spherical fuzzy Bonferroni mean operators also reduce to the corresponding q-rung orthopair fuzzy Bonferroni mean operators.
4. If all the values satisfy and , then the TSFIBM operator becomes the Pythagorean fuzzy interaction Bonferroni mean (PyFIBM) operator, the TSFIGBM operator becomes the Pythagorean fuzzy interaction geometric Bonferroni mean (PyFIGBM) operator. Other T-spherical fuzzy Bonferroni mean operators also reduce to the corresponding Pythagorean fuzzy Bonferroni mean operators.
5. If all the values satisfy and , then the TSFIBM operator becomes the intuitionistic fuzzy interaction Bonferroni mean (IFIBM) operator, and the TSFIGBM operator becomes the intuitionistic fuzzy interaction geometric Bonferroni mean (IFIGBM) operator. Other T-spherical fuzzy Bonferroni mean operators also reduce to the corresponding intuitionistic fuzzy Bonferroni mean operators.
Here, an example from He and He [
74] is taken to illustrate the advantages of the proposed algorithm. Consider the alternative set
and attribute set
. The decision matrix is shown in
Table 9. The data can be expressed as T-spherical fuzzy values shown in
Table 10. Since all the values in
Table 10 can satisfy
, we take
. The weight vector is taken as
and
, which is the same as that in reference [
74].
Then, the aggregated values using the TSFIWBM
operator are as
,
,
,
. The scores can be calculated as
Then, the alternatives can be ranked as
The proposed results are the same as that in [
74]. Hence, the proposed algorithm is the generalization of the existing work and it can solve the problems more broadly than the existing one. Other fuzzy structures can be used similarly if the conditions are satisfied.
Comparison analysis
In order to further illustrate the proposed method, we compare it with some other decision making methods, including the method base on the T-spherical fuzzy weighted aggregation operators, T-spherical fuzzy TOPSIS, T-spherical fuzzy VIKOR method and T-spherical fuzzy TODIM method. The attribute weight vector is also taken as
, which is the same as in the above section. The decision matrix is also the same as that in
Table 1.
If T-spherical fuzzy weighted aggregation operators are used, aggregation results are shown in
Table 11 and ranking results are shown in
Table 12. If the TSFWA operator is used in the aggregation step, the ranking result is
. If the TSFWGA operator is used, the ranking result is
. The optimal alternative is the same for these two operators, but the ranking is different for other alternatives. If the TSFIWA operator or the TSFIGWA operator is used in Step 3, the ranking is
. In the TSFIWA operator or the TSFIGWA operator, the interaction operations are considered.
If the T-spherical fuzzy TOPSIS method is used to solve the problem, the first two steps are the same. The T-spherical fuzzy weighted decision matrix is calculated as
. The T-spherical fuzzy positive ideal solution
. The T-spherical fuzzy negative ideal solution
. The collective distances of each alternative to the
and
are defined as
and
can be calculated as
,
,
,
,
,
,
,
,
,
. Calculate the T-spherical fuzzy closeness coefficients by
to obtain
,
,
,
,
. The alternatives can be ranked as
and the optimal alternative is
.
If the T-spherical fuzzy VIKOR method is used, the first two steps are also the same. The utility index
is calculated by the following equation
,
,
,
,
. We rank alternatives according to
to obtain
. The regret index is calculated by the following equation
,
,
,
,
. Rank alternatives according to
to obtain
. The collective index can be calculated by
where
,
,
,
. If
,
,
,
,
,
. The alternatives can be ranked as
. If other
are used,
can be calculated and results are shown in
Table 13. The optimal alternative is always
and suboptimal alternative is
. There are slightly differences in the ranking of
and
for different
v.
If the T-spherical fuzzy TODIM method is used in decision making, the first two steps are the same as other methods. The relative weights are calculated as
,
.
The dominant degree of
over
with regard to
is defined as
Here,
. Then,
. The results are shown in
Table 14. The prospect value
can be calculated by
Then,
,
,
,
,
. The alternatives can be ranked as
.
Comparison summary
The main difference between the existing methods and the proposed methods are summarized in
Table 15. The evaluation values are given as TSF values, which are more flexible and powerful. The interrelation between T-spherical fuzzy input arguments are considered using the Bonferroni mean. The interaction operations between the membership degree, the abstinence degree and the non-membership degree are considered.
The Dombi and Bonferroni mean are used at the same time in T-spherical fuzzy environments to make aggregation more flexible. Existing T-spherical fuzzy methods do not have all these characteristics.
9. Conclusions
In this paper, some T-spherical fuzzy Bonferroni mean aggregation operators were developed. The main findings are as follows. By considering interaction laws, T-spherical fuzzy Bonferroni mean aggregation operators were developed, including the TSFIBM operator, the TSFIGBM operator, the TSFIWBM operatror and the TSFIWGBM operator. The properties of the operators were studied, including the idempotency and boundedness.
Then, T-spherical fuzzy Dombi Bonferroni mean aggregation operators were developed using the Dombi mean and Bonferroni mean, including the TSFDBM operator, the TSFGDBM operator, the TSFWDBM operator and the TSFWGDBM operator. New T-spherical fuzzy entropy and cross-entropy measures were defined, and an attribute weight determining method based on these was developed. The new T-spherical fuzzy multiple attribute decision making method based on the T-spherical fuzzy Bonferroni mean operators were defined, and the dormitory furniture procurement problem was presented to illustrate the algorithm.
The weakness of the method is that it cannot deal with problems with multiple types of decision information. In the future, we will study some useful tools to model uncertain information and related concepts, including the properties, set-theoretic operations and axiomatic results of the refined Pythagorean Fuzzy Sets. We will study further T-spherical fuzzy decision making methods to deal with decision problems with special characteristics. We will also apply newly developed algorithms to deal with more real complicated decision problems.