Your search keyword '"*HAMMING distance"' showing total 8 results

1. Choice of an Online Teaching App in the E-learning Process of School Children based on Distance Measures.

Author

Kumar, Vinod and Rakshit, Madhuchanda

Subjects

*MOBILE learning, *FUZZY sets, *INTUITIONISTIC mathematics, *MOBILE apps in education, *HAMMING distance, *EUCLIDEAN distance

Abstract

In this paper, various E-learning Apps have been compared and analysed by two distance measures and formulate their comparison with limited number of students and factors with the scope of their extension. Hamming Distance and Euclidean Distance are two distance measures used in this paper. Moreover, the variables considered for this purpose follows the Intuitionistic Fuzzy Set (IFS) theory. [ABSTRACT FROM AUTHOR]

Published

2022

2. Generalized TODIM method based on symmetric intuitionistic fuzzy Jensen–Shannon divergence.

Author

Wu, Xinxing, Zhu, Zhiyi, Chen, Guanrong, Pedrycz, Witold, Liu, Lantian, and Aggarwal, Manish

Subjects

*TOPSIS method, *GROUP decision making, *FUZZY sets, *DECISION making, *HAMMING distance

Abstract

Intuitionistic fuzzy (IF) theory has become main approach to representing imprecision and vagueness. The IF divergence measure (IFDivM) based on Jensen–Shannon divergence is perhaps the most widely used measure to compare the similarity of multiple intuitionistic fuzzy sets (IFSs). In the present paper, this IFDivM is examined and applied to multiple examples. It is found that some extant IFDivMs hardly satisfy the axiomatic definition, and in a few cases even unable to show divergence of trivial IFSs. To address these inconsistencies, a new IFDivM based on Jensen–Shannon divergence is proposed, free from these problems. The effectiveness of the proposed IFDivM is tested on several critical cases, and precise analysis of its properties is performed. It is proved that the proposed IFDivM satisfies the axiomatic definition of IFDivMs. To illustrate the practical significance of the IFDivM, a novel intuitionistic fuzzy (IF) TODIM method, based on the proposed IFDivM, is developed, termed as GIF-TODIM method. Unlike the existing IF-TODIM methods, GIF-TODIM does not suffer from the revere ordering inconsistencies. The proposed GIF-TODIM method and the proposed IFDivM are applied to a real-world case study on supplier selection. A detailed comparative analysis is performed taking the TOPSIS method and other IFDivMs as baselines. The role of attitude on the final choice is analyzed in great detail. It is found that the proposed GIF-TODIM method is indeed useful, effective, and superior to the counterpart methods, when it comes to real-world situations. Concomitantly, in the present work, it is also revealed that the TOPSIS method based on the 2-D Hamming distance is a special form of the proposed GIF-TODIM method, when decision-makers have the same attitude towards losses and gains. Thus, an interesting relationship between TOPSIS and TODIM is identified under the intuitionistic fuzzy environment, which is bound to propel significant research in the area of decision making under uncertain conditions. As a whole, the article offers comprehensive analyses of IFDivMs and the TODIM method under the intuitionistic fuzzy environment. • Construct a new IF divergence measure (IFDivM) based on Jensen–Shannon divergence. • Develop a GIF-TODIM method based on the new IFDivM. • Apply the proposed GIF-TODIM method to a supplier selection problem. • Provide parameter analysis and comparative analysis with TOPSIS and other IFDivMs. • Show that TOPSIS based on 2-D Hamming distance is a special form of our GIF-TODIM. [ABSTRACT FROM AUTHOR]

Published

2024

3. Subtraction and division operations on intuitionistic fuzzy sets derived from the Hamming distance.

Author

Du, Wen Sheng

Subjects

*HAMMING distance, *FUZZY sets, *DIFFERENTIAL calculus, *NEUTROSOPHIC logic, *ARITHMETIC, *PROBLEM solving

Abstract

Intuitionistic fuzzy values, each characterized by a membership degree and a nonmembership degree, are the basic components of intuitionistic fuzzy sets. Arithmetic operations on intuitionistic fuzzy values/sets are of importance in practical problem solving. In this paper, the subtraction and division operations over intuitionistic fuzzy values/sets are derived from the Hamming distance between them by the optimization method. Compared with the existing operations, the developed operations are complete, that is, any two intuitionistic fuzzy values/sets can be performed by these two operations. Then, fundamental properties of the modified arithmetic operations are extensively investigated for intuitionistic fuzzy values/sets. Finally, the continuity and the derivative operation of intuitionistic fuzzy functions are introduced based on the proposed operations, which provides a novel basis for the intuitionistic fuzzy differential calculus. [ABSTRACT FROM AUTHOR]

Published

2021

4. AN INTUITIONISTIC FUZZY EXTENSION OF THE CODAS-SORT METHOD.

Author

Ouhibi, Abir and Frikha, Hela Moalla

Subjects

*HAMMING distance, *FUZZY sets, *EUCLIDEAN distance, *DECISION making, *MULTIPLE criteria decision making

Abstract

Currently, an important issue in multi-criteria decision-making (MCDM) problems are vagueness and lack of precision of decision- -making information because of insufficient data and incapability of the decision maker to process the information. Intuitionistic fuzzy sets (IFS) are a solution to eliminate the vagueness and the uncertainty. While fuzzy sets (FS) deal with ambiguity and vagueness problem, IFSs have more advantages. Moreover, the CODAS-SORT method cannot handle the uncertainty and ambiguity of information provided by human judgments. The aim of this study is to develop an IF extension of CODAS-SORT combining this method with the IFS theory. To achieve this, we use the fuzzy weighted Euclidean distance and fuzzy weighted Hamming distance instead of the crisp distances. A case study of a supplier selection assessment is used to clarify the details of our proposed method. [ABSTRACT FROM AUTHOR]

Published

2021

5. Modified Zhang and Xu's distance measure for Pythagorean fuzzy sets and its application to pattern recognition problems.

Author

Ejegwa, P. A.

Subjects

*FUZZY sets, *FUZZY measure theory, *HAMMING distance, *EUCLIDEAN distance, *DISTANCES, *PATTERN recognition systems

Abstract

The concept of distance between Pythagorean fuzzy sets (PFSs) has been proven to be relevant in the applications of PFSs as seen in the literature. The main purpose of this paper is to show that Zhang and Xu's distance measure between PFSs fails the conditions of distance measure; hence, it is not an appropriate distance measure for PFSs. Some numerical examples are used to validate this stance. In order to remedy this shortcoming, Zhang and Xu's distance measure for PFSs is normalised/modified to cater for the limitation by employing the technique used to normalise both Hamming and Euclidean distances between intuitionistic fuzzy sets by Szmidt and Kacprzyk. The modified Zhang and Xu's distance measure for PFSs satisfies the conditions of the axiomatic definition of distance measure for PFSs; hence, it is an appropriate/reliable distance measure for PFSs. Finally, the modified Zhang and Xu's distance measure for PFSs is applied to pattern recognition problems of classification of building materials and mineral fields. [ABSTRACT FROM AUTHOR]

Published

2020

6. Several new results based on the study of distance measures of intuitionistic fuzzy sets.

Author

Chen, C. and Deng, X.

Subjects

*FUZZY sets, *FUZZY measure theory, *HAMMING distance, *CHARACTERISTIC functions, *PATTERN recognition systems, *EUCLIDEAN distance, *DISTANCES

Abstract

It is doubtless that intuitionistic fuzzy set (IFS) theory plays an increasingly important role in solving the problems under uncertain situation. As one of the most critical members in the theory, distance measure is widely used in many aspects. Nevertheless, it is a pity that part of the existing distance measures has some drawbacks in practical significance and accuracy. To make up for their drawbacks and pursue more accuracy and effectiveness, in this paper, we propose a new inclusion relation of IFSs and a new definition called strict distance measure. Based on this new relation, an analysis is given to point out that the common shortcoming of Hamming distance measure and Euclidean distance measure is the mishandling of hesitancy degree. Therefore, the role of hesitancy degree in distance measure is studied deeply and then three strict distance measures are put forward to overcome the above shortcoming. In addition, a novel definition called the characteristic function of distance measure is defined to describe the character of strict distance measure. On this basis, a theorem is presented to illustrate the inevitability of the occurrence of unrecognized result in pattern recognition problems in some special cases. This theorem also shows that the problem cannot be entirely attributed to distance measures. In view of this condition, we provide an appropriate solution. Compared with other existing distance measures in some examples, the superiorities of our improved distance measures are demonstrated to be more effective and more significant. [ABSTRACT FROM AUTHOR]

Published

2020

7. Solving medical diagnostic problem in intuitionistic fuzzy sets using new distance measure.

Author

PATHMAVATHI, V. R. and SELVAKUMARI, K.

Subjects

*FUZZY sets, *HAMMING distance, *PATIENTS, *PUBLIC health, *MEDICAL care

Abstract

The main aim of the paper is to propose an application of Intuitionistic fuzzy set in medical field using new normalized Hamming distance method. This method was very useful to find the distance between patient and their Health problem. From this we find the solution is obtained by measuring the minimum distance between each patient and each health problem. Finally, an illustrative example is also included to demonstrate our proposed method. [ABSTRACT FROM AUTHOR]

Published

2019

8. Intuitionistic fuzzy induced ordered weighted averaging distance operator and its application to decision making.

Author

Shouzhen Zeng, Merigó, José M., Palacios-Marqués, Daniel, Jin, Huanhuan, and Fengjuan Gu

Subjects

*DECISION making, *FUZZY sets, *AGGREGATION operators, *HAMMING distance, *INTUITIONISTIC mathematics

Abstract

In this paper, we develop a new method for intuitionistic fuzzy decision making problems with induced aggregation operators and distance measures. Firstly, we introduce the intuitionistic fuzzy induced ordered weighted averaging distance (IFIOWAD) operator. It is an extension of the ordered weighted averaging (OWA) operator that uses the main characteristics of the induced OWA (IOWA), the distance measures and uncertain information represented by intuitionistic fuzzy numbers. The main advantage of this operator is that it is able to consider complex attitudinal characters of the decision-maker by using order-inducing variables in the aggregation of the distance measures. We further generalize the IFIOWAD by using weighted average. The result is the intuitionistic fuzzy induced ordered weighted averaging weighted average distance (IFIOWAWAD) operator. Finally, a practical example about the selection of investments is provided to illustrate the developed intuitionistic fuzzy aggregation operators. [ABSTRACT FROM AUTHOR]

Published

2017