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On Possibilistic Correlation Coefficient and Ratio for Triangular Fuzzy Numbers with Multiplicative Joint Distribution
Robert Fullér, István Á. Harmati, Péter Várlaki, On Possibilistic Correlation Coefficient and Ratio for Triangular Fuzzy Numbers with Multiplicative Joint Distribution. In: Imre J. Rudas (Ed.), Proceedings of the Eleventh IEEE International Symposium on Computational Intelligence and Informatics (CINTI 2010), 103-108, IEEE Computer Society Press, 2010.
http://dx.doi.org/10.1109/CINTI.2010.5672266
Abstract:
The goal of this paper is to provide calculation formulas for the possibilistic correlation coefficient and ratio for two marginal possibility distributions of triangular form when their joint possibility distribution is defined by the product t-norm. We will also introduce an alternative definition for the possibilistic correlation coefficient and ratio when their joint possibility distribution is defined by the product t-norm.
BibTeX entry:
@INPROCEEDINGS{inpFuHaVa10a,
title = {On Possibilistic Correlation Coefficient and Ratio for Triangular Fuzzy Numbers with Multiplicative Joint Distribution},
booktitle = {Proceedings of the Eleventh IEEE International Symposium on Computational Intelligence and Informatics (CINTI 2010)},
author = {Fullér, Robert and Harmati, István Á. and Várlaki, Péter},
editor = {Rudas, Imre J.},
publisher = {IEEE Computer Society Press},
pages = {103-108},
year = {2010},
keywords = {Triangular fuzzy number, correlation ratio},
}
Belongs to TUCS Research Unit(s): Institute for Advanced Management Systems Research (IAMSR)