In the present communication, the existing measures of
fuzzy entropy are reviewed. A generalized parametric exponential
fuzzy entropy is defined.Our study of the four essential and some
other properties of the proposed measure, clearly establishes the
validity of the measure as an entropy.
[1] D. Bhandari and N. R. Pal, Some new information measures for fuzzy
sets, Information Sciences, 67,204-228,1993.
[2] A. Deluca and S. Termini, A definition of Non-Probabilistic entropy in
the Setting of Fuzzy Set Theory, Information and Control, 20, 301-312,
1971.
[3] J. L. Fan and Y. L. Ma, Some new fuzzy entropy formulas, Fuzzy sets
and Systems, 128(2),277-284, 2002.
[4] C. H. Hwang and M. S.Yang, On entropy of fuzzy sets, International
Journal of Uncertainty, Fuzziness and Knowledge-Based Systems, 16(4),
519-527, 2008.
[5] D. S. Hooda, On generalized measures of fuzzy entropy, Mathematica
Slovaca, 54(3), 315-325, 2004.
[6] T. O. Kvalseth, On Exponential Entropies, IEEE International Conference
on Systems, Man, and Cybernetics, 4, 2822-2826, 2000.
[7] J. N. Kapur, Measures of Fuzzy Information. Mathematical Sciences Trust
Society, New Delhi, 1997.
[8] N. R. Pal and S. K. Pal, Object-background segmentation using new
definitions of entropy, IEE Proceedings, 136, 284-295, 1989.
[9] N. R. Pal and S. K. Pal, Entropy: a new definitions and its applications,
IEEE Transactions on systems, Man and Cybernetics, 21(5), 1260-1270,
1999.
[10] A. R`enyi,On measures of entropy and information, Proceedings of the
Fourth Berkeley Symposium on Mathematical Statistics and Probability,
Berkeley, CA: University of California Press,547-561,1961.
[11] C. E. Shannon, A mathematical theory of communication, Bell System
Technical Journal, 27, 379-423; 623-656, 1948.
[12] R. R.Yager, On the measure of fuzziness and negation, Part I: Membership
in the unit interval, International Journal of General Systems, 5,
221-229, 1979.
[13] L. A. Zadeh, Fuzzy sets, Information Control, 8, 94-102, 1948.
[14] L. A. Zadeh, Probability measure of fuzzy event, Journal of Mathematical
Analysis and Application, 23(2), 421-427, 1968.
[1] D. Bhandari and N. R. Pal, Some new information measures for fuzzy
sets, Information Sciences, 67,204-228,1993.
[2] A. Deluca and S. Termini, A definition of Non-Probabilistic entropy in
the Setting of Fuzzy Set Theory, Information and Control, 20, 301-312,
1971.
[3] J. L. Fan and Y. L. Ma, Some new fuzzy entropy formulas, Fuzzy sets
and Systems, 128(2),277-284, 2002.
[4] C. H. Hwang and M. S.Yang, On entropy of fuzzy sets, International
Journal of Uncertainty, Fuzziness and Knowledge-Based Systems, 16(4),
519-527, 2008.
[5] D. S. Hooda, On generalized measures of fuzzy entropy, Mathematica
Slovaca, 54(3), 315-325, 2004.
[6] T. O. Kvalseth, On Exponential Entropies, IEEE International Conference
on Systems, Man, and Cybernetics, 4, 2822-2826, 2000.
[7] J. N. Kapur, Measures of Fuzzy Information. Mathematical Sciences Trust
Society, New Delhi, 1997.
[8] N. R. Pal and S. K. Pal, Object-background segmentation using new
definitions of entropy, IEE Proceedings, 136, 284-295, 1989.
[9] N. R. Pal and S. K. Pal, Entropy: a new definitions and its applications,
IEEE Transactions on systems, Man and Cybernetics, 21(5), 1260-1270,
1999.
[10] A. R`enyi,On measures of entropy and information, Proceedings of the
Fourth Berkeley Symposium on Mathematical Statistics and Probability,
Berkeley, CA: University of California Press,547-561,1961.
[11] C. E. Shannon, A mathematical theory of communication, Bell System
Technical Journal, 27, 379-423; 623-656, 1948.
[12] R. R.Yager, On the measure of fuzziness and negation, Part I: Membership
in the unit interval, International Journal of General Systems, 5,
221-229, 1979.
[13] L. A. Zadeh, Fuzzy sets, Information Control, 8, 94-102, 1948.
[14] L. A. Zadeh, Probability measure of fuzzy event, Journal of Mathematical
Analysis and Application, 23(2), 421-427, 1968.
@article{"International Journal of Engineering, Mathematical and Physical Sciences:58482", author = "Rajkumar Verma and Bhu Dev Sharma", title = "On Generalized Exponential Fuzzy Entropy", abstract = "In the present communication, the existing measures of
fuzzy entropy are reviewed. A generalized parametric exponential
fuzzy entropy is defined.Our study of the four essential and some
other properties of the proposed measure, clearly establishes the
validity of the measure as an entropy.", keywords = "fuzzy sets, fuzzy entropy, exponential entropy, exponential
fuzzy entropy.", volume = "5", number = "12", pages = "1995-4", }
