Abstract

This paper presents the CP-TOPSIS Model in group decision-making using complex Fuzzy Data. Complex numbers were employed in this model, and the central point index was used to define both the negative and positive ideals as well as the distance between each option. In this approach, the options are graded using complex data (due to replacing linguistic variables). One of the advantages of this model in decision-making is the capability that creates a complex fuzzy technique for investigating, grading, and selecting the best option related to complex fuzzy data. The results show that this model effectively rates and grades the complex fuzzy data through an alternative period. Quantum mechanics wave functions could not be analyzed, nor could signals or time series or stock exchange transactions predict factors of a multiperiod alternation, nor could predictions be made about any of these variables. As a result, there are numerical results in rating with high precision.

1. Introduction

In everyday life, different criteria are usually measured implicitly. Such decisions may be made solely based on intuition and judgment. There are several crises that must be dealt with; therefore, it is critical to recognize the situation accurately. The site of a nuclear power facility, for instance, is a highly complex subject involving numerous parameters. Therefore, multicriteria decision-making (MCDM) is related to constructing and solving decision-making and planning problems with various criteria. MCDM was developed as a part of operation research in designing computational and mathematical tools to support the subjective assessment of the criteria performance by decision-makers [1].

In the last few years, MCDM tools and their applications have been used in different studies to solve problems associated with the industry [2], science [3], and engineering [4]. MCDM offers the best choice for decision-making out of a finite number of options [5]. Besides, due to the changes and developments over the past decades, MCDM is one of the fastest tools and methods for selecting the best option in the decision-making business. The decision-makers need help deciding between the fast and superior options. Decision-making methods are well accepted in all areas of the decision-making process with the help of computers. MCDM is vital in operations research and management science and is the basis for making and developing various computer-based methods [6]. MCDM issues can be classified into two categories: Multiple Attribute Decision-Making (MADM) and Multiple Objective Decision-Making (MODM). MADM is the most well-known branch of decision-making and a general class of operations research models dealing with decision-making problems under some criteria.

MADM approach requires selecting among decision alternatives described by their attributes. MADM problems are assumed to have a predetermined and limited number of decision alternatives. Solving a problem involves sorting and ranking. As an alternative to the decision-making matrix and additional information provided by the decision-maker, methodologies can be used to rank, screen, or select among the options. Moreover, is a powerful tool to help find decisions that will best satisfy several conflicting objectives. Contrary to the , the decision alternatives are not given in the approach. Instead, provides a mathematical framework for designing a set of decision alternatives. A solution’s suitability for implementation is determined by how closely it approaches a given set of goals. The can be classified into two categories of compensatory and noncompensatory methods. Compensatory methods incorporate trade-offs between high and low performance in the analysis. Those methods that do not perform such incorporation are termed noncompensatory. Hwang and Yoon [5] presented several methods. Two methods used in the present work are briefly explained as follows: TOPSIS: the principle behind TOPSIS is simple; the chosen alternative should be as close to the ideal and far from the negative ideal solution as possible. Distance from Target: this method and its results are also straightforward for graphical description. First, target values for each attribute are chosen, not requiring to be exhibited by any available alternative.

The method has some advantages, including its simplicity, comprehensibility, ease of calculation, and ability to measure the relative performance of each alternative using a simple mathematical form. Fuzzy is one of the most effective techniques in fuzzy, which was introduced by Wang Yoon [5]. The method is based on the premise that the alternative should simultaneously have the shortest distance with the positive ideal solution and the farthest distance with the negative ideal solution. In the method, for each criterion, the relative weighted distances between the various options are listed in relation to and . The relative distances represent efficiency. Therefore, the efficiency of each option against each criterion can be operated in this way. Torfi et al. [7] proposed a hierarchical process to determine the relative weighting of evaluation criteria and a fuzzy to rank alternatives. Liao and Cao [8] presented an integrated fuzzy approach and multichoice goal programming to select support in supply chain management. The problem of selecting multicriteria group support was simulated by Zouggari and Benyoucef [9] based on the fuzzy TOPSIS approach. Doukas et al. [10] developed a formula for separating weights to rank alternatives. A ranking formula was proposed by Kuo [11] based on the method of Dukas et al. by normalizing the performance measure of each alternative relative to the cost and profit criteria, that is, and . In both methods, the weights assigned to the separations have crisp values, and the use of crisp weights limits the range of applications, as linguistic weights are commonly used in fuzzy TOPSIS. In this paper, we used complex language weights to weight the complex data described in sections.

This paper is devoted to the discussion of complex fuzzy number ranking and is expected to have wide applications in other areas of complex fuzzy data ranking. The following is how this article is organized: Section 2 discusses the basic concept of complex fuzzy numbers and their other applications. In Section 3, a detailed discussion of the concepts of complex fuzzy numbers (including definitions and fuzzy distances) is devoted. In this section, a new method for ranking complex fuzzy numbers with a central point index is introduced, and finally, an example of this ranking method is introduced. In Section 4, the results of the new ranking method are presented. In Section 5, managerial insights are presented, and finally in Section 6, the work’s conclusion is fundamentally summarized, and the next field of research is offered.

2. Literature Review

The concept of the type-1 fuzzy set was introduced by LotfiZadeh [12]. In 1975, he introduced the type-2 fuzzy set, in which its membership function was a fuzzy number [13]. A complex fuzzy set was presented by Ramot et al. [14]. In recent years, big data has become a growing research concern. High and low data have often been associated with fluctuations and uncertainty. Uncertainty may be because of factors such as corruption or loss of data components, and a cyclical and repetitive pattern may cause fluctuations in data. For example, there is more temperature in summer and less in winter or more traffic during rush hours. Fuzzy sets have been recently used for ranking the fuzzy numbers with many applications in numerous sectors of production, industry, and management. Some applications of fuzzy sets in industry and management include flow workshop scheduling (FSS), interactive fuzzy solution method, self-adapting artificial fish swarm algorithm (SAAFSA) [15], hybrid fuzzy and data-driven robust optimization for resilience and sustainable health care supply chain [16], viable medical waste chain network design [17], two-level solid planning for the location of renewable energy in conditions of uncertainty [18], sustainable supply chain network design [19], a robust optimization model for sustainable and resilient closed-loop supply chain network design [20], a robust time-cost-quality-energy-environment trade-off with resource-constrained due to uncertainty [21], Viable Supply Chain Network Design by considering Blockchain Technology and Cryptocurrency [22], robust optimization of risk-aware, resilient and sustainable closed-loop supply chain network design [23], an extended robust mathematical model to project the course of COVID-19 epidemic in Iran [24], linear programming of complex integers (CILP) to handle location decisions [25], developing a sustainable operational management system [26], a Covering Tour Approach for Disaster Relief Locating and Routing with Fuzzy Demand [27], a parallel machine sequence-dependent group scheduling problem with the goal of minimizing total weighted [28], hybrid artificial intelligence and robust optimization [55], and Location Improved Harmony Search Algorithm [29]. However, despite their many applications, prioritizing the existing options was not considered in ranking the complex fuzzy numbers. Therefore, in the present paper, we examined the available options for ranking complex fuzzy numbers by the TOPSIS decision method in polar conditions while considering the periodicity of these numbers.

The recent complex fuzzy sets are innovative with the increasing number of applications. Among the applications of complex fuzzy sets is the analysis of solar activity based on the number of recorded sunspots [14], signal processing [14], stock trading in the New York Stock Exchange [30], voter turnout forecast [30], multiperiodic factor prediction [31], prediction of voter turnout in elections [32], complex fuzzy logic systems [30, 33–37], image restoration [38], an integrated approach based on artificial intelligence, and novel metaheuristic algorithms to predict demand for dairy products [39].

The complex fuzzy set modifies the fuzzy membership function’s initial premise. In certain instances, however, it is argued that a second dimension must be added to the concept of membership function. The fundamental principle of the phase is unaffected by the second characteristic of membership. In both the ordinary and the complex fuzzy sets, the membership function is the same fuzzy function. In the apparent dimension of the membership function, the novelty of complex fuzzy sets is the membership function, the power factor, or the fuzzy period. According to the definition of a complex fuzzy set, each grade of membership is defined by an amplitude term and a phase term. Therefore, the difference between the two complex fuzzy sets can be simply calculated by combining the difference between the amplitude terms and the phase terms. In this regard, Zhang et al. [40] proposed a distance measure to determine the equality of complex fuzzy sets. Alkouri and Salleh [41] introduced several distance measures for complex fuzzy sets. Nonetheless, in the distance measure determined by Zhang et al. [40, 41], the periodicity of the phase term of a complex fuzzy set as a function was disregarded. The cyclic representation of the complex membership in a complex fuzzy set is ignored. We modified the distance measure for complex fuzzy sets.

In this research, we defined and presented a new strategy for prioritizing a model of decision-making, in which complex fuzzy numbers play a role. A rating algorithm was constructed based on the central point index and the TOPSIS-oriented technique. We also employ linguistic terminology to analyze possibilities. In this study, we labeled this method, the so-called CP-TOPSIS. For ranking and picking the best options based on complex fuzzy data, a complex fuzzy technique is developed. These options may have many applications, including analyzing wave functions in quantum mechanics and many physical quantities. This paper presents a new rating method through a central point index based on the center of mass in complex fuzzy numbers used in the TOPSIS method. The modified distance function, which is applicable for the complex fuzzy numbers based on the complex membership function, is described in the TOPSIS method and is also shown with a practical instance in the TOPSIS complex method.

3. Problem Statement

Definition 1. Let be a universe of discourse. A complex fuzzy set on with a membership function for every specifies that each element is assigned a complex membership degree in the complex set of numbers . The complex fuzzy set can be represented as a set of ordered pairswhere the membership function has a complex form , the amplitude term and the phase term are both real-valued, and . The function maps into unit disk of the complex plane, and the function is a periodic function with periodicity .in which is the main argument of the function. Consider distance measure for complex fuzzy sets:whereComplex fuzzy sets are a generalization of ordinary fuzzy sets. Any ordinary fuzzy set can be represented as a complex fuzzy set by simply setting the argument component of the membership function for each element, , to zero. As a result, the membership function argument is the distinction between ordinary and complex fuzzy sets. Indeed, without an argument for the membership function, the complex fuzzy set becomes a regular fuzzy set, and the membership function range is [0, 1].

Example 1. Let and its complex membership function are

Definition 2. Let be two complex fuzzy sets on universal set with membership function and , and then,(i)(ii)(iii)(iv)(v). .Zhang et al. [40] defined the distance function as follows:

Definition 3. Let and be two complex fuzzy numbers:where the membership functions arewhere are real-valued and . Let be distance the function such thatThe following is a counterexample of distance measure 2:

Example 2. Let , and then, by using relation 2, we haveSo, . Based on Figure 1 (the coordinates of points A, B, and C are obtained using the polar form of complex numbers), we haveAs shown in Figure 1, this inequality is not correct [42].
Therefore, we can use the following definition to correct the inaccuracy of relations 2 and 3.

Figure 1 

Definition 4. Let be a complex fuzzy number with a membership function , and then, we have is the residue modulo . Thus, the modified distance functions 2 and 3 for complex fuzzy sets are as follows:Also, the normalized form 5 is as follows:Then, the function of the normalized Euclidean distance isso, we have

3.1. Distances for Complex Fuzzy Sets

Let be a universe of discourse, and the complex fuzzy set may be represented as the set of ordered pairs:where the membership function is of the form , and the amplitude term and the phase term are both real-valued. We know that the complex exponential function is a periodic function with periodicity . Therefore, we consider ; otherwise, we take the residue modulo into account.

Let be two complex fuzzy sets in and let be a parameter satisfying . The Minkowski distances [43]:

The normalized Minkowski distances [43]:

If , then is called the Hamming distance of complex fuzzy sets [43]:and the normalized Hamming distance of complex fuzzy sets is [43]

If , then is termed the Euclidean distance of complex fuzzy sets:and the normalized Euclidean distance of complex fuzzy sets is [43]

3.2. Centroid-Index Ranking Method of Complex Fuzzy Numbers

The ranking of fuzzy numbers has been a concern in fuzzy Multiple Attribute Decision-Making (MADM) since its inception. More than 20 fuzzy ranking indices have been proposed since 1976. Various techniques are applied to compare the fuzzy numbers. The fuzzy number ranking, including complex fuzzy numbers to choose the best option from different options, is completely based on ranking or comparing the data. Various fuzzy ranking methods have been proposed ranging from one to several fuzzy number properties. In ranking fuzzy numbers with a center point index, the geometric center of a fuzzy number is found. Each geometric center has two components , where is on the horizontal axis, and is on the vertical coordinate axis.

Ranking fuzzy numbers are considered either by values alone or with the values and . Several methods have been proposed in this regard, including Yager’s method to rank fuzzy numbers based on. Yager [44] proposed a centroid-index ranking method to calculate the value for a fuzzy number as follows:where is a weighting function measuring the importance of the value , and denotes the membership function of the fuzzy number and . Murakami et al. (1983) proposed a centroid-index ranking method for calculating the center of gravity point for each fuzzy number. The larger the value of , the better the ranking of fuzzy numbers. We proposed a centroid-index ranking method to calculate the centroid point of complex fuzzy numbers. Since any complex fuzzy number contains a polar representation, in polar coordinates and , respectively, the directional distance is used from the pole and the angle between this half-line and the polar axis. Therefore, we consider ranking based on both components. In polar coordinates, the relationship between Cartesian (x, y) and polar coordinates is as follows:

Consider a segment with the radius of and polar angle of , given that the center of mass is located from the pole, as depicted below. The area of a polar sector with a radius and the polar angle equals . Thus, the element area is equal to . In the triangle, the centroid is located of the distance from the vertex. Hence, the centroid of this segment is at of the distance from the pole. Considering the coordinates of the center of mass , we can calculate the centroid of this element (Figure 2):

Figure 2 

As a result, the center of mass of the whole sector with radius and angle isAlso,

So,

To rank complex fuzzy numbers, we can use the distance function between the center points and the origin as shown in Table 1:

Let be complex numbers then for every , and then, we have(i)If then (ii)If then (iii)If then .

Example 3. Let , and then

3.3. Linguistic Variable of Complex Fuzzy Sets

An original element in human knowledge representation is the linguistic variables, which is important when using indicators to measure variables and get numbers. Besides, when we asked human experts to describe these variables, they gave us words such as good, slightly, more, or less to describe the variables.

Definition 5. Let be a complex fuzzy set in , and then, very , very-very , indeed , a little , slightly , more or less , and extremely are defined as a complex fuzzy set in with membership functions [41]:(i)(ii)(iii) where(iv)(v)(vi)(vii)By representing the relative performance using the expressed complex fuzzy numbers, the fuzzy quantity set will be considered . The complex fuzzy rankings for the language variables are presented in Table 2.