AbstractThe construction of diffusions on finitely ramified fractals is straightforward if a certain nonlinear eigenvalue problem can be solved. Usually this problem is attacked probabilistically using Brouwer′s fixed point theorem. We will translate this problem into the theory of Dirichlet forms and apply a different fixed point approach, Hilbert′s projective metric on cones. This allows one to prove new results about the eigenvalue problem, especially about the uniqueness and the approximation of solutions, and about the structure of fixed point sets
Stochastic analysis on fractals is, as one might expect, a subfield of analysis on fractals. An intu...
In this article we study two problems about the existence of a distance don a given fractal having c...
In 1989 Jun Kigami made an analytic construction of a Laplacian on the Sierpiński gasket, a construc...
AbstractThe construction of diffusions on finitely ramified fractals is straightforward if a certain...
Like Brownian motion on d (or equivalently its Laplace operator or its Dirichlet integral) one woul...
It is well known that a Dirichlet form on a fractal structure can be defined as the limit of an incr...
Following the methods used by Barlow and Bass to prove the existence of a diffusion on the Sierpinsk...
We study a (elliptic measurable coefficients) diffusion in the classical snowflake domain in the sit...
We consider post-critically finite self-similar fractals with regular harmonic structures. We first ...
In this paper, we present numerical procedures to compute solutions of partial differential equation...
AbstractThe main purpose of this paper is to give a general framework to analysis on fractals includ...
Abstract. In this paper we consider post-critically finite self-similar fractals with regular harmon...
AbstractOn nested fractals a “Laplacian” can be constructed as a scaled limit of difference operator...
AbstractWe study derivations and Fredholm modules on metric spaces with a local regular conservative...
Meinert M. Partial differential equations on fractals. Existence, Uniqueness and Approximation resul...
Stochastic analysis on fractals is, as one might expect, a subfield of analysis on fractals. An intu...
In this article we study two problems about the existence of a distance don a given fractal having c...
In 1989 Jun Kigami made an analytic construction of a Laplacian on the Sierpiński gasket, a construc...
AbstractThe construction of diffusions on finitely ramified fractals is straightforward if a certain...
Like Brownian motion on d (or equivalently its Laplace operator or its Dirichlet integral) one woul...
It is well known that a Dirichlet form on a fractal structure can be defined as the limit of an incr...
Following the methods used by Barlow and Bass to prove the existence of a diffusion on the Sierpinsk...
We study a (elliptic measurable coefficients) diffusion in the classical snowflake domain in the sit...
We consider post-critically finite self-similar fractals with regular harmonic structures. We first ...
In this paper, we present numerical procedures to compute solutions of partial differential equation...
AbstractThe main purpose of this paper is to give a general framework to analysis on fractals includ...
Abstract. In this paper we consider post-critically finite self-similar fractals with regular harmon...
AbstractOn nested fractals a “Laplacian” can be constructed as a scaled limit of difference operator...
AbstractWe study derivations and Fredholm modules on metric spaces with a local regular conservative...
Meinert M. Partial differential equations on fractals. Existence, Uniqueness and Approximation resul...
Stochastic analysis on fractals is, as one might expect, a subfield of analysis on fractals. An intu...
In this article we study two problems about the existence of a distance don a given fractal having c...
In 1989 Jun Kigami made an analytic construction of a Laplacian on the Sierpiński gasket, a construc...