Zipper Fractal Functions with Variable Scalings-Reference-Cited by-同舟云学术

Zipper Fractal Functions with Variable Scalings

Published:2022-12-30 Issue:4 Volume:6 Page:481-501
ISSN:2587-2648
Container-title:Advances in the Theory of Nonlinear Analysis and its Application
language:en
Short-container-title:ATNAA

Author:

VİJAY .¹,CHAND A. K. B.¹

Affiliation:

1. Indian Institute of Technology Madras, Chennai - 600036, India.

Abstract

Zipper fractal interpolation function (ZFIF) is a generalization of fractal interpolation function through an improved version of iterated function system by using a binary parameter called a signature. The signature allows the horizontal scalings to be negative. ZFIFs have a complex geometric structure, and they can be non-differentiable on a dense subset of an interval I. In this paper, we construct k-times continuously differentiable ZFIFs with variable scaling functions on I. Some properties like the positivity, monotonicity, and convexity of a zipper fractal function and the one-sided approximation for a continuous function by a zipper fractal function are studied. The existence of Schauder basis of zipper fractal functions for the space of k-times continuously differentiable functions and the space of p-integrable functions for p ∈ [1,∞) are studied. We introduce the zipper versions of full Müntz theorem for continuous function and p-integrable functions on I for p ∈ [1,∞).

Publisher

Erdal Karapinar

Subject

Applied Mathematics,Analysis

Reference35 articles.

1. [1] V.V. Aseev, On the regularity of self-similar zippers, 6th Russian-Korean International Symposium on Science and Tech- nology, KORUS-2002 (June 24-30, 2002, Novosibirsk State Techn. Univ. Russia, NGTU, Novosibirsk), Part 3 (Abstracts), 2002, p.167.

2. [2] V.V. Aseev, A.V. Tetenov, and A.S. Kravchenko, On self-similar Jordan curves on the plane, Sib. Math. J. 44(3) (2003), 379–386.

3. [3] M.F. Barnsley, Fractal functions and interpolation, Constr. Approx., 2(1) (1986), 303–329.

4. [4] M.F. Barnsley and A.N. Harrington, The calculus of fractal interpolation functions, J. Approx. Theory, 57(1) (1989), 14–34.

5. [5] S.N. Bernstein, Sur les recherches recentes relatives à la meilleure approximation des fonctions continues par les polynômes, in Proc. of 5th Inter. Math. Congress, 1 (1912), 256–266.

Cited by 2 articles. 订阅此论文施引文献订阅此论文施引文献，注册后可以免费订阅5篇论文的施引文献，订阅后可以查看论文全部施引文献

1. Rational quadratic trigonometric spline fractal interpolation functions with variable scalings;The European Physical Journal Special Topics;2023-02-17

2. On the structure of self-affine Jordan arcs in ℝ²;Demonstratio Mathematica;2023-01-01