Add to ORKGM. F. Barnsley proposed the concept of fractal interpolation function (FIF) using iterated function systems (IFS) to describe the real world objects. The purpose of this paper is to study the parameter identification method for FIF with vertical scaling factor functions (VSFF) for one dimensional data set and establish the generalized version of the analytic approach of Mazel [13]
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...
An iterated function system that defines a fractal interpolation function, where ordinate scaling is...
AbstractFractal interpolation functions provide a new method to model experimental data. Dalla and D...
AbstractFractal interpolation functions are very useful in capturing data that exhibit an irregular ...
AbstractFractal interpolation functions provide a new means for fitting experimental data and their ...
Abstract. This dissertation examines the theory and applications of fractal interpolation. Its main ...
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...
An extended iterated-function-system (IFS) interpolation method is presented for modelling for a giv...
A method to construct fractal surfaces by recurrent fractal curves is provided. First we construct f...
Classical ways to describe shape functions for finite element methods make use of interpolating or ...
We consider a construction of recurrent fractal interpolation surfaces with function vertical scalin...
This paper generalizes the classical cubic spline with the construction of the cubic spline coa-lesc...
Fractal interpolation function (FIF) constructed through an iterated function system is more versati...
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...
An iterated function system that defines a fractal interpolation function, where ordinate scaling is...
AbstractFractal interpolation functions provide a new method to model experimental data. Dalla and D...
AbstractFractal interpolation functions are very useful in capturing data that exhibit an irregular ...
AbstractFractal interpolation functions provide a new means for fitting experimental data and their ...
Abstract. This dissertation examines the theory and applications of fractal interpolation. Its main ...
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...
An extended iterated-function-system (IFS) interpolation method is presented for modelling for a giv...
A method to construct fractal surfaces by recurrent fractal curves is provided. First we construct f...
Classical ways to describe shape functions for finite element methods make use of interpolating or ...
We consider a construction of recurrent fractal interpolation surfaces with function vertical scalin...
This paper generalizes the classical cubic spline with the construction of the cubic spline coa-lesc...
Fractal interpolation function (FIF) constructed through an iterated function system is more versati...
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...
An iterated function system that defines a fractal interpolation function, where ordinate scaling is...