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Fuzzy fractional more sigmoid function activated neural network approximations revisited

George A. Anastassiou

2022Mathematical Foundations of Computing14 citationsDOIOpen Access PDF

Abstract

<p style='text-indent:20px;'>Here we study the univariate fuzzy fractional quantitative approximation of fuzzy real valued functions on a compact interval by quasi-interpolation arctangent-algebraic-Gudermannian-generalized symmetrical activation function relied fuzzy neural network operators. These approximations are derived by establishing fuzzy Jackson type inequalities involving the fuzzy moduli of continuity of the right and left Caputo fuzzy fractional derivatives of the involved function. The approximations are fuzzy pointwise and fuzzy uniform. The related feed-forward fuzzy neural networks are with one hidden layer. We study also the fuzzy integer derivative and just fuzzy continuous cases. Our fuzzy fractional approximation result using higher order fuzzy differentiation converges better than in the fuzzy just continuous case.

Topics & Concepts

MathematicsFuzzy numberFuzzy logicPointwiseFuzzy classificationFuzzy mathematicsFuzzy set operationsDefuzzificationFuzzy subalgebraApplied mathematicsFuzzy setMathematical analysisArtificial intelligenceComputer scienceFuzzy Systems and OptimizationMulti-Criteria Decision MakingApproximation Theory and Sequence Spaces