Fuzzy rule-base driven orthogonal approximation

Alcı, Musa

doi:10.1007/s00521-007-0146-2

Cited by 8 publications

(3 citation statements)

References 15 publications

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“…The aim of the paper is to prove that fuzzy systems are also universal approximators to continuous functions on compact domain in the case of the described subsystem inference representation corresponding to the fuzzy systems, as in the work of Kosko [11], Wang [16] and later Alci [1], Kim [10]. The paper is organized as follows: the first section provides a brief review on product sum fuzzy inference and introduces the concepts of additive and multiplicative decomposable systems; the second section presents a subsystem inference representation; the next sections discuss the cases of polynomial, sinusoidal, orthonormal and other designs of subsystem inferences; the last section presents some conclusions on the matter.…”

Section: Introductionmentioning

confidence: 99%

Representing Fuzzy Systems Universal Approximators

Iatan¹,

Giebel²

2018

Review of the Air Force Academy

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The described representation of a fuzzy system enables an approximate functional characterization of the inferred output of the fuzzy system. With polynomial subsystem inferences, the approximating function is a sum of polynomial terms of orders depending on the numbers of input membership functions. The constant, linear, and nonlinear parts of the fuzzy inference can hence be identified. The present work also includes two applications which show that the procedure can very well approximate the differential equations. In the case of no analytical solution, the procedure is a good alternative.

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Section: Introductionmentioning

confidence: 99%

Representing Fuzzy Systems Universal Approximators

Iatan¹,

Giebel²

2018

Review of the Air Force Academy

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“…(1) Orthogonality is also an important tool in traditional fuzzy systems. Orthogonal transformation method, orthogonal rule, and orthogonal approximation concept are frequently applied to fuzzy rule-based models [26][27][28], fuzzy neural networks [29,30], and fuzzy control [31,32]. Complex fuzzy sets as an extension of fuzzy sets have been studied.…”

Section: Introductionmentioning

confidence: 99%

The Orthogonality between Complex Fuzzy Sets and Its Application to Signal Detection

Dai

2017

Symmetry

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Abstract:A complex fuzzy set is a set whose membership values are vectors in the unit circle in the complex plane. This paper establishes the orthogonality relation of complex fuzzy sets. Two complex fuzzy sets are said to be orthogonal if their membership vectors are perpendicular. We present the basic properties of orthogonality of complex fuzzy sets and various results on orthogonality with respect to complex fuzzy complement, complex fuzzy union, complex fuzzy intersection, and complex fuzzy inference methods. Finally, an example application of signal detection demonstrates the utility of the orthogonality of complex fuzzy sets.

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“…Fuzzy modeling is an effective tool for the approximation of uncertain systems on the basis of measured data (Hellendoorn and Driankov, 1997). The TakagiSugeno (T-S) model (Takagi and Sugeno, 1985) has been widely applied in many fields, such as modeling (Boukhris et al, 1999;Alci, 2008;Soltani et al, 2010a), control (Ying, 2000;Brdyś and Littler, 2002;Kościelny and Syfert, 2006;Qi and Brdys, 2009;Kluska, 2009) and fault tolerant control (Marx et al, 2007;Ichalal et al, 2010). In many studies, T-S based approaches such as the Gustafson-Kessel (GK) clustering algorithm (Gustafson and Kessel, 1979), the Gath-Geva (GG) algorithm (Gath and Geva, 1989), the fuzzy c-regression model clustering algorithm (Hathaway and Bezdek, 1993), enhanced fuzzy system models (Celikyilmaz and Burhan Turksen, 2008), the new FCRM clustering algorithm (NFCRMA) (Chaoshun et al, 2009; and the Fuzzy C-Means (FCM) clustering algorithm (Bezdek, 1981) are often used for the description of complex systems in a human intuitive way (especially the last one).…”

Section: Introductionmentioning

confidence: 99%

A novel fuzzy c-regression model algorithm using a new error measure and particle swarm optimization

Soltani

Châari

Hmida

2012

International Journal of Applied Mathematics and Computer Science

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This paper presents a new algorithm for fuzzy c-regression model clustering. The proposed methodology is based on adding a second regularization term in the objective function of a Fuzzy C-Regression Model (FCRM) clustering algorithm in order to take into account noisy data. In addition, a new error measure is used in the objective function of the FCRM algorithm, replacing the one used in this type of algorithm. Then, particle swarm optimization is employed to finally tune parameters of the obtained fuzzy model. The orthogonal least squares method is used to identify the unknown parameters of the local linear model. Finally, validation results of two examples are given to demonstrate the effectiveness and practicality of the proposed algorithm.

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Fuzzy rule-base driven orthogonal approximation

Cited by 8 publications

References 15 publications

Representing Fuzzy Systems Universal Approximators

Representing Fuzzy Systems Universal Approximators

The Orthogonality between Complex Fuzzy Sets and Its Application to Signal Detection

A novel fuzzy c-regression model algorithm using a new error measure and particle swarm optimization

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