Fuzzy robust regression analysis for fuzzy input- output data
DOI:
https://doi.org/10.15587/2312-8372.2015.54189Keywords:
robust regression, fuzzy regression, membership functionAbstract
In multiple regression analysis data analysis is very important. If data set has outliers, robust methods are used in parameter estimates. When input data are fuzzy and data set has outlier, the weight matrix is defined by the membership function of the residuals . In this study, multiple regression is suggested when the dependent and independent variables are triangular fuzzy numbers and parameters estimation are crisp numbers. The weighted fuzzy least squares are used with the weight matrix. Outliers influence the model by very small degree of membership, the degrees of membership of the other observation values are 1 or close to 1, and the effects of those on the estimation of the regression model are very important. The fuzzy robust regression method may be able to detect outliers automatically. Thus, possible negative effects of the outlier on the model may be minimized.
References
- Tanaka, H., Uegima, S., Asai, K. (1982). Linear regression analysis with fuzzy model. IEEE Transactions on Systems, Man, and Cybernetics, Vol. 12, № 6, 903–907. doi:10.1109/tsmc.1982.4308925
- Yang, M.-S., Liu, H.-H. (2003). Fuzzy Least Squares Algorithms for Interactive Fuzzy Linear Regression Models. Fuzzy Sets and Systems, Vol. 135, № 2, 305–316. doi:10.1016/s0165-0114(02)00123-9
- Rousseeuw, P., Daniels, B., Leroy, A. (1984). Applying robust regression to insurance. Insurance: Mathematics and Economics, Vol. 3, № 1, 67–72. doi:10.1016/0167-6687(84)90020-9
- Alma, G. (2011). Comparison of Robust Regression Methods in Linear Regression. International Journal of Contemporary Mathematical Sciences, Vol. 6, № 9, 409–421.
- Qadir, M. F. (1996). Robust Method for Detection of Single and Multiple Outliers. Scientific Khyber, Vol. 9, 135–144.
- Asad, A., Qadir, M. F. (2005). A Modified M-Estimator for the Detection of Outliers. Pakistan Journal of Statistics and Operation Research, Vol. 1, № 1, 49–64. doi:10.18187/pjsor.v1i1.116
- Rousseuw, P. J., Leroy, A. M. (1987). Robust regression and outlier detection. New York: JohnWiley&Sons, 334.doi:10.1002/0471725382
- Kula, K. S., Apaydin, A. (2008). Fuzzy Robust Regression Analysis Based on the Ranking of Fuzzy Sets. International Journal of Uncertainty, Fuzziness and Knowledge-Based Systems, Vol. 16, № 1, 663–681. doi:10.1142/s0218488508005558
- Kula, K. S., Fatih Tank, Türkan Erbay Dalkiliс. (2012). A study on fuzzy robust regression and its application to insurance. Mathematical and Computational Applications, Vol. 17, № 3, 223–234.
- Sanli, K., Apaydin, A. (2004). The fuzzy robust regression analysis, the case of fuzzy data set has outlier. G. U. Journal of Science, Vol. 17, 71–84.
- Xu, R., Li, C. (2001). Multidimensional least-squares fitting with a fuzzy model. Fuzzy Sets and Systems, Vol. 119, № 2, 215–223. doi:10.1016/S0165-0114(98)00350-9
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