On entropy, similarity measure and cross-entropy of single-valued neutrosophic sets and their application in multi-attribute decision making

As a subclass of neutrosophic sets, single-valued neutrosophic sets (SVNS) can be used to represent uncertainty and inconsistent information that exist in real-world situations. Information measures play an important role in SVNS theory, which has received more and more attention in recent years. In this paper, we develop a multi-attribute decision-making (MADM) method based on single-valued neutrosophic information measures. To this end, three axiomatic definitions of information measures are first introduced. These include entropy, similarity measure and cross-entropy. Then, we construct information measure formulas on the basis of the cosine function. The relationship among entropy, similarity measure and cross-entropy as well as their mutual transformations are further discussed. Moreover, an approach to single-valued neutrosophic MADM based on these information measure formulas is presented. Finally, a numerical example of city pollution evaluation is provided. The comparative analysis demonstrates the applicability and effectiveness of the proposed method.

[1]  Rajshekhar Sunderraman,et al.  Single Valued Neutrosophic Sets , 2010 .

[2]  K. Atanassov More on intuitionistic fuzzy sets , 1989 .

[3]  Cengiz Kahraman,et al.  Multi-expert wind energy technology selection using interval-valued intuitionistic fuzzy sets , 2015 .

[4]  Jun Ye Vector Similarity Measures of Simplified Neutrosophic Sets and Their Application in Multicriteria Decision Making , 2014 .

[5]  Krassimir T. Atanassov,et al.  Two theorems for intuitionistic fuzzy sets , 2000, Fuzzy Sets Syst..

[6]  Jun Ye,et al.  Single valued neutrosophic cross-entropy for multicriteria decision making problems , 2014 .

[7]  Huayou Chen,et al.  The induced linguistic continuous ordered weighted geometric operator and its application to group decision making , 2013, Comput. Ind. Eng..

[8]  Hong-yu Zhang,et al.  outranking approach for multi-criteria decision-making problems ith simplified neutrosophic sets uan - , 2014 .

[9]  Florentin Smarandache,et al.  A unifying field in logics : neutrosophic logic : neutrosophy, neutrosophic set, neutrosophic probability , 2020 .

[10]  Settimo Termini,et al.  A Definition of a Nonprobabilistic Entropy in the Setting of Fuzzy Sets Theory , 1972, Inf. Control..

[11]  Pinaki Majumdar,et al.  On similarity and entropy of neutrosophic sets , 2013, J. Intell. Fuzzy Syst..

[12]  Janusz Kacprzyk,et al.  Entropy for intuitionistic fuzzy sets , 2001, Fuzzy Sets Syst..

[13]  Ioannis K. Vlachos,et al.  Intuitionistic fuzzy information - Applications to pattern recognition , 2007, Pattern Recognit. Lett..

[14]  Francisco Chiclana,et al.  A risk attitudinal ranking method for interval-valued intuitionistic fuzzy numbers based on novel attitudinal expected score and accuracy functions , 2014, Appl. Soft Comput..

[15]  Huayou Chen,et al.  Continuous intuitionistic fuzzy ordered weighted distance measure and its application to group decision making , 2015 .

[16]  Pei Wang,et al.  Entropy, similarity measure of interval-valued intuitionistic fuzzy sets and their applications , 2011, Inf. Sci..

[17]  Jun Ye Multicriteria fuzzy decision-making method using entropy weights-based correlation coefficients of interval-valued intuitionistic fuzzy sets , 2010 .

[18]  Jing Fu,et al.  Multi-period medical diagnosis method using a single valued neutrosophic similarity measure based on tangent function , 2015, Comput. Methods Programs Biomed..

[19]  Wenyi Zeng,et al.  Relationship between similarity measure and entropy of interval valued fuzzy sets , 2006, Fuzzy Sets Syst..

[20]  Krassimir T. Atanassov,et al.  Intuitionistic fuzzy sets , 1986 .

[21]  Liu Xuecheng,et al.  Entropy, distance measure and similarity measure of fuzzy sets and their relations , 1992 .

[22]  Lotfi A. Zadeh,et al.  Fuzzy Sets , 1996, Inf. Control..

[23]  Miin-Shen Yang,et al.  Similarity measures of intuitionistic fuzzy sets based on Lp metric , 2007, Int. J. Approx. Reason..

[24]  Jun Ye,et al.  Single-valued neutrosophic similarity measures based on cotangent function and their application in the fault diagnosis of steam turbine , 2015, Soft Computing.

[25]  K. Atanassov,et al.  Interval-Valued Intuitionistic Fuzzy Sets , 2019, Studies in Fuzziness and Soft Computing.

[26]  Huayou Chen,et al.  Approaches to group decision making with intuitionistic fuzzy preference relations based on multiplicative consistency , 2016, Knowl. Based Syst..

[27]  Huayou Chen,et al.  Interval-valued intuitionistic fuzzy continuous weighted entropy and its application to multi-criteria fuzzy group decision making , 2014, Knowl. Based Syst..

[28]  L. Zadeh Probability measures of Fuzzy events , 1968 .

[29]  Changlin Mei,et al.  Entropy of interval-valued fuzzy sets based on distance and its relationship with similarity measure , 2009, Knowl. Based Syst..

[30]  Przemyslaw Grzegorzewski,et al.  Distances between intuitionistic fuzzy sets and/or interval-valued fuzzy sets based on the Hausdorff metric , 2004, Fuzzy Sets Syst..

[31]  Miguel Pagola,et al.  Vector valued similarity measures for Atanassov's intuitionistic fuzzy sets , 2014, Inf. Sci..

[32]  Huayou Chen,et al.  Continuous interval-valued intuitionistic fuzzy aggregation operators and their applications to group decision making , 2014 .

[33]  Zeshui Xu,et al.  Hesitant fuzzy entropy and cross‐entropy and their use in multiattribute decision‐making , 2012, Int. J. Intell. Syst..

[34]  Jun Ye,et al.  Improved cosine similarity measures of simplified neutrosophic sets for medical diagnoses , 2015, Artif. Intell. Medicine.

[35]  Xiaohong Chen,et al.  Interval type-2 hesitant fuzzy set and its application in multi-criteria decision making , 2015, Comput. Ind. Eng..

[36]  Shaorong Liu,et al.  A method of generating control rule model and its application , 1992 .

[37]  Fanyong Meng,et al.  Interval-valued intuitionistic fuzzy multi-criteria group decision making based on cross entropy and 2-additive measures , 2015, Soft Comput..

[38]  Huayou Chen,et al.  Multiple attribute group decision making based on interval-valued hesitant fuzzy information measures , 2016, Comput. Ind. Eng..

[39]  Huayou Chen,et al.  Intuitionistic Fuzzy Ordered Weighted Cosine Similarity Measure , 2013, Group Decision and Negotiation.