The study of nonlinear partial differential equations on fractals is a burgeoning inter-disciplinary topic, allowing dynamic properties on fractals to be investigated. In this thesis we will investigate nonlinear PDEs of three basic types on bounded and unbounded fractals. We first review the definition of post-critically finite (p.c.f.) self-similar fractals with regular harmonic structure. A Dirichlet form exists on such a fractal; thus we may define a weak version of the Laplacian. The Sobolev-type inequality, established on p.c.f. self-similar fractals satisfying the separation condition, plays a crucial role in the analysis of PDEs on p.c.f. self-similar fractals. We use the classical approach to study the linear eigenvalue problem on ...
Stochastic analysis on fractals is, as one might expect, a subfield of analysis on fractals. An intu...
In this paper we study a quasi-linear evolution equation with nonlinear dynamical boundary condition...
Abstract. We use the heat kernel to study two distinct types of nonlinear partial differ-ential equa...
AbstractThe nonlinear wave equation utt=Δu+f(u) with given initial data and zero boundary conditions...
Classical analysis is not able to treat functions whose domain is fractal. We present an introductio...
AbstractWe investigate the nonlinear diffusion equation ∂u/∂t=Δu+up,p>1, on certain unbounded fracta...
We investigate the nonlinear diffusion equation partial derivativeu/partial derivativet Deltau + up,...
Kigami has defined an analog of the Laplacian on a class of self-similar fractals, including the fam...
A Laplacian may be defined on self-similar fractal domains in terms of a suitable self-similar Diric...
This paper is devoted to numerical methods for solving boundary value problems in self-similar ramif...
Meinert M. Partial differential equations on fractals. Existence, Uniqueness and Approximation resul...
AbstractKigami has defined an analog of the Laplacian on a class of self-similar fractals, including...
Like Brownian motion on d (or equivalently its Laplace operator or its Dirichlet integral) one woul...
This thesis explores the theory and applications of analysis on fractals. In the first chapter, we p...
AbstractThis paper investigates properties of certain nonlinear PDEs on fractal sets. With an approp...
Stochastic analysis on fractals is, as one might expect, a subfield of analysis on fractals. An intu...
In this paper we study a quasi-linear evolution equation with nonlinear dynamical boundary condition...
Abstract. We use the heat kernel to study two distinct types of nonlinear partial differ-ential equa...
AbstractThe nonlinear wave equation utt=Δu+f(u) with given initial data and zero boundary conditions...
Classical analysis is not able to treat functions whose domain is fractal. We present an introductio...
AbstractWe investigate the nonlinear diffusion equation ∂u/∂t=Δu+up,p>1, on certain unbounded fracta...
We investigate the nonlinear diffusion equation partial derivativeu/partial derivativet Deltau + up,...
Kigami has defined an analog of the Laplacian on a class of self-similar fractals, including the fam...
A Laplacian may be defined on self-similar fractal domains in terms of a suitable self-similar Diric...
This paper is devoted to numerical methods for solving boundary value problems in self-similar ramif...
Meinert M. Partial differential equations on fractals. Existence, Uniqueness and Approximation resul...
AbstractKigami has defined an analog of the Laplacian on a class of self-similar fractals, including...
Like Brownian motion on d (or equivalently its Laplace operator or its Dirichlet integral) one woul...
This thesis explores the theory and applications of analysis on fractals. In the first chapter, we p...
AbstractThis paper investigates properties of certain nonlinear PDEs on fractal sets. With an approp...
Stochastic analysis on fractals is, as one might expect, a subfield of analysis on fractals. An intu...
In this paper we study a quasi-linear evolution equation with nonlinear dynamical boundary condition...
Abstract. We use the heat kernel to study two distinct types of nonlinear partial differ-ential equa...