论文信息 - Univariate fuzzy-random neural network approximation operators

Univariate fuzzy-random neural network approximation operators

In this article, we study the rate of pointwise convergence in the q-mean to thefuzzy-random unit operator of very precise univariate fuzzy-random neural network operators of cardaliaguet-Euvrard and ''squashing'' types. These fuzzy-random operators arise in a natural and common way among fuzzy-random neural networks. These rates are given through probabilistic Jackson type inequalities involving the fuzzy-random modulus of continuity of the engaged fuzzy-random function or its fuzzy derivatives. Also several interesting new results in fuzzy-random analysis are given of independent merit, which are used then in the proofs of the main results of the paper.

George A. Anastassiou | G. Anastassiou

[1] Pierre Cardaliaguet,et al. Approximation of a function and its derivative with a neural network , 1992, Neural Networks.

[2] George A. Anastassiou,et al. Rate of Convergence of Basic Neural Network Operators to the Unit-Univariate Case , 1997 .

[3] Lotfi A. Zadeh,et al. Fuzzy Sets , 1996, Inf. Control..

[4] Congxin Wu,et al. On Henstock integrals of interval-valued functions and fuzzy-valued functions , 2000, Fuzzy Sets Syst..

[5] G. Anastassiou. Handbook of Analytic Computational Methods in Applied Mathematics , 2000 .

[6] Sorin G. Gal. Approximation Theory in Fuzzy Setting , 2000 .

[7] Charalambos D. Aliprantis,et al. Principles of Real Analysis , 1981 .

[8] Congxin Wu,et al. On Henstock integral of fuzzy-number-valued functions (I) , 2001, Fuzzy Sets Syst..

[9] George A. Anastassiou. RATE OF CONVERGENCE OF FUZZY NEURAL NETWORK OPERATORS, UNIVARIATE CASE , 2002 .

[10] Dudley,et al. Real Analysis and Probability: Measurability: Borel Isomorphism and Analytic Sets , 2002 .