AbstractFractal interpolation functions provide a new method to model experimental data. Dalla and Drakopoulos got some conditions that a vertical scaling factor must obey to model effectively an arbitrary function (J. Approx. Theory 101 (1999) 289). In this paper, we present certain counterexamples to show that the converse does not hold
The primary concern of fractal metrology is providing a means of reliable estimation of scaling expo...
Fractal methodology provides a general setting for the understanding of realworld phenomena. In part...
An iterated function system that defines a fractal interpolation function, where ordinate scaling is...
M. F. Barnsley proposed the concept of fractal interpolation function (FIF) using iterated function ...
AbstractFractal interpolation functions provide a new means for fitting experimental data and their ...
AbstractFractal interpolation functions are very useful in capturing data that exhibit an irregular ...
Abstract. This dissertation examines the theory and applications of fractal interpolation. Its main ...
Fractal interpolation that possesses the ability to produce smooth and nonsmooth inter- polants is a...
The fractal interpolation functions defined by iterated function systems provide new methods of appr...
This textbook is intended to supplement the classical theory of uni- and multivariate splines and th...
In the literature, a rational cubic spline fractal interpolation function is developed using a ratio...
This paper generalizes the classical spline using a new construction of spline coalescence hidden va...
AbstractBased on the construction of Fractal Interpolation Functions, a new construction of Fractal ...
A continuous function defined on a closed interval can be of unbounded variation with certain fracta...
This paper investigates the Fourier transform of a hidden variable fractal interpolation function wi...
The primary concern of fractal metrology is providing a means of reliable estimation of scaling expo...
Fractal methodology provides a general setting for the understanding of realworld phenomena. In part...
An iterated function system that defines a fractal interpolation function, where ordinate scaling is...
M. F. Barnsley proposed the concept of fractal interpolation function (FIF) using iterated function ...
AbstractFractal interpolation functions provide a new means for fitting experimental data and their ...
AbstractFractal interpolation functions are very useful in capturing data that exhibit an irregular ...
Abstract. This dissertation examines the theory and applications of fractal interpolation. Its main ...
Fractal interpolation that possesses the ability to produce smooth and nonsmooth inter- polants is a...
The fractal interpolation functions defined by iterated function systems provide new methods of appr...
This textbook is intended to supplement the classical theory of uni- and multivariate splines and th...
In the literature, a rational cubic spline fractal interpolation function is developed using a ratio...
This paper generalizes the classical spline using a new construction of spline coalescence hidden va...
AbstractBased on the construction of Fractal Interpolation Functions, a new construction of Fractal ...
A continuous function defined on a closed interval can be of unbounded variation with certain fracta...
This paper investigates the Fourier transform of a hidden variable fractal interpolation function wi...
The primary concern of fractal metrology is providing a means of reliable estimation of scaling expo...
Fractal methodology provides a general setting for the understanding of realworld phenomena. In part...
An iterated function system that defines a fractal interpolation function, where ordinate scaling is...
DOI
Add to ORKG