Add to ORKGClassical ways to describe shape functions for finite element methods make use of interpolating or approximating schemes, for example, Taylor and Lagrange or Bézier. In this paper we outline the possibility of using iterative schemes first applied in the computation of fractal curves and surfaces. Our attempt will be restricted to shape functions defined over 2-simplices. Because of the fractal nature of the functions, we get only continuous or uniformly continuous functions. We see that they can be found as an attractor of a suitable iterated function system (IFS)
In the literature, a rational cubic spline fractal interpolation function is developed using a ratio...
A recurrent iterated function system (RIFS) is a genaralization of an IFS and provides nonself-affin...
In the literature, a rational cubic spline fractal interpolation function is developed using a ratio...
Classical ways to describe shape functions for finite element methods make use of interpolating or ...
AbstractThe calculus of deterministic fractal functions is introduced. Fractal interpolation functio...
A method to construct fractal surfaces by recurrent fractal curves is provided. First we construct f...
The fractal interpolation functions defined by iterated function systems provide new methods of appr...
The goal of this work is to construct and use continuous fractal functions to find a numerical solut...
In computer graphics, geometric modelling of complex objects is a difficult process. An important cl...
We present some new techniques for shape approximation with fractals, using iterated function system...
Fractal structures containing relief surfaces have applications in a variety of fields, including co...
AbstractThe calculus of deterministic fractal functions is introduced. Fractal interpolation functio...
The fractal interpolation techniques are powerful alternatives to classical interpolation methods in...
The fractal interpolation techniques are powerful alternatives to classical interpolation methods in...
AbstractBased on the construction of Fractal Interpolation Functions, a new construction of Fractal ...
In the literature, a rational cubic spline fractal interpolation function is developed using a ratio...
A recurrent iterated function system (RIFS) is a genaralization of an IFS and provides nonself-affin...
In the literature, a rational cubic spline fractal interpolation function is developed using a ratio...
Classical ways to describe shape functions for finite element methods make use of interpolating or ...
AbstractThe calculus of deterministic fractal functions is introduced. Fractal interpolation functio...
A method to construct fractal surfaces by recurrent fractal curves is provided. First we construct f...
The fractal interpolation functions defined by iterated function systems provide new methods of appr...
The goal of this work is to construct and use continuous fractal functions to find a numerical solut...
In computer graphics, geometric modelling of complex objects is a difficult process. An important cl...
We present some new techniques for shape approximation with fractals, using iterated function system...
Fractal structures containing relief surfaces have applications in a variety of fields, including co...
AbstractThe calculus of deterministic fractal functions is introduced. Fractal interpolation functio...
The fractal interpolation techniques are powerful alternatives to classical interpolation methods in...
The fractal interpolation techniques are powerful alternatives to classical interpolation methods in...
AbstractBased on the construction of Fractal Interpolation Functions, a new construction of Fractal ...
In the literature, a rational cubic spline fractal interpolation function is developed using a ratio...
A recurrent iterated function system (RIFS) is a genaralization of an IFS and provides nonself-affin...
In the literature, a rational cubic spline fractal interpolation function is developed using a ratio...