Fractal Polynomials and Maps in Approximation of Continuous Functions |
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| Authors: | P. Viswanathan M. A. Navascués A. K. B. Chand |
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| Affiliation: | 1. Mathematical Sciences Institute, Australian National University, Canberra, Australiaamritaviswa@gmail.com;3. Escuela de Ingenieríay y Arquitectura, Universidad de Zaragoza, Spain;4. Department of Mathematics, Indian Institute of Technology Madras, Chennai, India |
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| Abstract: | The primary goal of this article is to establish some approximation properties of fractal functions. More specifically, we establish that a monotone continuous real-valued function can be uniformly approximated with a monotone fractal polynomial, which in addition agrees with the function on an arbitrarily given finite set of points. Furthermore, the simultaneous approximation and mboxinterpolation which is norm-preserving property of fractal polynomials is established. In the final part of the article, we establish differentiability of a more general class of fractal functions. It is shown that these smooth fractal functions and their derivatives are good approximants for the original function and its mboxderivatives. |
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| Keywords: | Best approximation constrained approximation fractal interpolation function fractal polynomial SAIN property |
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