HIGHER ORDER FUZZY KOROVKIN THEORY VIA INEQUALITIES

TitleHIGHER ORDER FUZZY KOROVKIN THEORY VIA INEQUALITIES
Publication TypeJournal Article
Year of Publication2006
AuthorsAnastassiou, GA
Secondary TitleCommunications in Applied Analysis
Volume10
Issue4
Start Page469
Pagination503
Date Published12/2006
Type of Workscientific: mathematics
ISSN1083–2564
AMS26E50, 28E10, 41A17, 41A25, 41A36, 47S40
Abstract

Here is studied with rates the fuzzy uniform and L p , p ≥ 1, convergence of a sequence of fuzzy positive linear operators to the fuzzy unit operator acting on spaces of fuzzy differentiable functions. This is done quantitatively via fuzzy Korovkin type inequalities involving the fuzzy modulus of continuity of a fuzzy derivative of the engaged function. From there we deduce general fuzzy Korovkin type theorems with high rate of convergence. The surprising fact is that basic real positive linear operator simple assumptions enforce here the fuzzy convergences. At the end we give applications. Our results are univariate and multivariate. The assumptions are minimal and natural fulfilled by almost all example – fuzzy positive linear
operators.

URLhttp://www.acadsol.eu/en/articles/10/4/4.pdf
Short TitleFuzzy Korovkin Theory
Refereed DesignationRefereed
Full Text

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