Add to ORKGInterest in the numerical solution of the Laplace equation on regions with fractal boundaries arises both in mathematics and physics. In mathematics, examples in-clude harmonic measure of fractals, complex iteration theory, and potential theory. In physics, examples include Brownian motion, crystallization, electrodeposition, viscous fingering, and diffusion-limited aggregation. In a typical application, the numerical simulation has to be on a very large scale involving at least tens of thousands of equa-tions with as many unknowns, in order to obtain any meaningful results. Attempts to use conventional techniques have encountered insurmountable difficulties, due to excessive CPU time requirements of the computations involved. Indeed, conve...
In this paper, we suggest an iterative method for solving nonlinear equations that can be used in th...
This paper describes how a numerical solution of Laplace's equation under Robbins boundary cond...
We consider the discretization in time if a fractional order diffusion equation. The approximation i...
In this paper, we present numerical procedures to compute solutions of partial differential equation...
The goal of this work is to construct and use continuous fractal functions to find a numerical solut...
Spectral properties of the weighted Laplace operator in the presence of fractal boundaries are numer...
In the last few years, repeatedly increased the role of simulation systems for solution of physical ...
We consider a fractal scalar conservation law, that is to say a conservation law modified by a fract...
En este artículo, se presenta un procedimiento numérico para calcular la solución de ecuaciones dife...
Laplacian Fractals are physical models for the fractal properties encountered in a selected group of...
A new method is introduced for solving Laplace problems on 2D regions with corners by approximation ...
Abstract: For many practical problems, numerical methods to solve partial dierential equations (PDEs...
This paper is devoted to numerical methods for solving boundary value problems in self-similar ramif...
One of the most important topics in the analysis of fractals is to construct the Laplacian. But this...
In the last few years, repeatedly increased the role of simulation systems for solution of physical ...
In this paper, we suggest an iterative method for solving nonlinear equations that can be used in th...
This paper describes how a numerical solution of Laplace's equation under Robbins boundary cond...
We consider the discretization in time if a fractional order diffusion equation. The approximation i...
In this paper, we present numerical procedures to compute solutions of partial differential equation...
The goal of this work is to construct and use continuous fractal functions to find a numerical solut...
Spectral properties of the weighted Laplace operator in the presence of fractal boundaries are numer...
In the last few years, repeatedly increased the role of simulation systems for solution of physical ...
We consider a fractal scalar conservation law, that is to say a conservation law modified by a fract...
En este artículo, se presenta un procedimiento numérico para calcular la solución de ecuaciones dife...
Laplacian Fractals are physical models for the fractal properties encountered in a selected group of...
A new method is introduced for solving Laplace problems on 2D regions with corners by approximation ...
Abstract: For many practical problems, numerical methods to solve partial dierential equations (PDEs...
This paper is devoted to numerical methods for solving boundary value problems in self-similar ramif...
One of the most important topics in the analysis of fractals is to construct the Laplacian. But this...
In the last few years, repeatedly increased the role of simulation systems for solution of physical ...
In this paper, we suggest an iterative method for solving nonlinear equations that can be used in th...
This paper describes how a numerical solution of Laplace's equation under Robbins boundary cond...
We consider the discretization in time if a fractional order diffusion equation. The approximation i...