Knowledge Measure for Atanassov's Intuitionistic Fuzzy Sets

A measure of knowledge is often viewed as a dual measure of entropy in a fuzzy system; thus, it appears that the less entropy may always accompany the greater amount of knowledge. Actually, this does not reflect the reality in the context of Atanassov's intuitionistic fuzzy sets (A-IFSs). In this paper, we introduce a novel axiomatic framework for measuring the amount of knowledge associated with A-IFSs, as opposed to a measure of fuzzy entropy. We present an axiomatic definition of knowledge measure for A-IFSs first and then develop a new robust model that strictly complies with these axioms. More efforts are made to form the main properties of two types of axioms (respectively, for fuzzy entropy and knowledge measure) into a unified framework, under which the numerical relationship between these two kinds of measures is discussed in considerable detail. This helps to clear up a fundamental misunderstanding aforementioned and ultimately to draw a firm conclusion on this topic. In particular, the developed model, for its excellent performance in experiments as well as ability to capture the unique features of A-IFSs, can be used to tackle some special problems that are difficult to handle by using fuzzy entropy alone, such as making a difference between such special cases in which there are a large number of arguments in favor but an equally large number of arguments in disapproval at the same time.

[1]  A Chitra,et al.  A note on the fixed points of fuzzy maps on partially ordered topological spaces , 1986 .

[2]  Humberto Bustince,et al.  Generalized Atanassov's Intuitionistic Fuzzy Index: Construction of Atanassov's Fuzzy Entropy from Fuzzy Implication Operators , 2011, Int. J. Uncertain. Fuzziness Knowl. Based Syst..

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

[4]  Janusz Kacprzyk,et al.  Some Problems with Entropy Measures for the Atanassov Intuitionistic Fuzzy Sets , 2007, WILF.

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

[6]  Ioannis K. Vlachos,et al.  Subsethood, entropy, and cardinality for interval-valued fuzzy sets - An algebraic derivation , 2007, Fuzzy Sets Syst..

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

[8]  Humberto Bustince,et al.  Uncertainties with Atanassov's intuitionistic fuzzy sets: Fuzziness and lack of knowledge , 2013, Inf. Sci..

[9]  Lotfi A. Zadeh,et al.  Please Scroll down for Article International Journal of General Systems Fuzzy Sets and Systems* Fuzzy Sets and Systems* , 2022 .

[10]  Miin-Shen Yang,et al.  Fuzzy entropy on intuitionistic fuzzy sets , 2006, Int. J. Intell. Syst..

[11]  Janusz Kacprzyk,et al.  How to measure the amount of knowledge conveyed by Atanassov's intuitionistic fuzzy sets , 2014, Inf. Sci..

[12]  Lotfi A. Zadeh,et al.  The concept of a linguistic variable and its application to approximate reasoning-III , 1975, Inf. Sci..

[13]  Krassimir T. Atanassov,et al.  On Intuitionistic Fuzzy Sets Theory , 2012, Studies in Fuzziness and Soft Computing.

[14]  B. Farhadinia,et al.  A theoretical development on the entropy of interval-valued fuzzy sets based on the intuitionistic distance and its relationship with similarity measure , 2013, Knowl. Based Syst..

[15]  Sheng-Yi Jiang,et al.  A note on information entropy measures for vague sets and its applications , 2008, Inf. Sci..

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

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

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

[19]  Nikhil R. Pal,et al.  Divergence Measures for Intuitionistic Fuzzy Sets , 2015, IEEE Transactions on Fuzzy Systems.

[20]  Xiaodong Liu,et al.  Entropy and Subsethood for General Interval-Valued Intuitionistic Fuzzy Sets , 2005, FSKD.

[21]  Wenyi Zeng,et al.  The relationship between similarity measure and entropy of intuitionistic fuzzy sets , 2012, Inf. Sci..

[22]  G. Klir,et al.  ON MEASURES OF FUZZINESS AND FUZZY COMPLEMENTS , 1982 .

[23]  R. Yager ON THE MEASURE OF FUZZINESS AND NEGATION Part I: Membership in the Unit Interval , 1979 .

[24]  K. Atanassov New operations defined over the intuitionistic fuzzy sets , 1994 .

[25]  Shengyi Jiang,et al.  Some information measures for interval-valued intuitionistic fuzzy sets , 2010, Inf. Sci..

[26]  Lotfi A. Zadeh,et al.  The Concepts of a Linguistic Variable and its Application to Approximate Reasoning , 1975 .

[27]  Humberto Bustince,et al.  Construction of interval-valued fuzzy entropy invariant by translations and scalings , 2010, Soft Comput..

[28]  Humberto Bustince,et al.  Entropy on intuitionistic fuzzy sets and on interval-valued fuzzy sets , 1996, Fuzzy Sets Syst..

[29]  Ranjit Biswas,et al.  Some operations on intuitionistic fuzzy sets , 2000, Fuzzy Sets Syst..

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

[31]  Robert LIN,et al.  NOTE ON FUZZY SETS , 2014 .