It is well known that a Dirichlet form on a fractal structure can be defined as the limit of an increasing sequence of discrete Dirichlet forms, defined on finite subsets which fill the fractal. The initial form is defined on V-(0), which is a sort of boundary of the fractal, and we have to require that it is an eigenform, i.e., an eigenvector of a particular nonlinear renormalization map for Dirichlet forms on V-(0). In this paper, I prove that, provided an eigenform exists, even if the form on V-(0) is not an eigenform, the corresponding sequence of discrete forms converges to a Dirichlet form on all of the fractal, both pointwise and in the sense of Gamma-convergence (but these two limits can be different). The problem of Gamma-convergen...
Abstract. In this paper we consider post-critically finite self-similar fractals with regular harmon...
AbstractLet E be an infinite-dimensional locally convex space, let {μn} be a weakly convergent seque...
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...
In univariate settings, we prove a strong reinforcement of the energy image density criterion for lo...
ABSTRACT. – Convergence of Dirichlet forms of diffusion processes is investigated without assuming t...
AbstractThe construction of diffusions on finitely ramified fractals is straightforward if a certain...
The goal of this Diploma thesis is to study global properties of Dirichlet forms associated with inf...
Abstract. In this paper we consider post-critically finite self-similar fractals with regular harmon...
In this paper, I prove that on every fractal structure with three vertices, for suitable weights, th...
International audienceWe study $\Gamma$-convergence for problems with holes, with strongly local Dir...
Abstract. We construct regular, local and conservative Dirichlet forms on the fractal blowup or on t...
Albeverio S, KUSUOKA S, Streit L. CONVERGENCE OF DIRICHLET FORMS AND ASSOCIATED SCHRODINGER-OPERATOR...
We consider the class of graph-directed constructions which are connected and have the property of f...
AbstractIn this paper we define and study a gradient on p.c.f. (post critically finite, or finitely ...
Abstract. In this paper we consider post-critically finite self-similar fractals with regular harmon...
AbstractLet E be an infinite-dimensional locally convex space, let {μn} be a weakly convergent seque...
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...
In univariate settings, we prove a strong reinforcement of the energy image density criterion for lo...
ABSTRACT. – Convergence of Dirichlet forms of diffusion processes is investigated without assuming t...
AbstractThe construction of diffusions on finitely ramified fractals is straightforward if a certain...
The goal of this Diploma thesis is to study global properties of Dirichlet forms associated with inf...
Abstract. In this paper we consider post-critically finite self-similar fractals with regular harmon...
In this paper, I prove that on every fractal structure with three vertices, for suitable weights, th...
International audienceWe study $\Gamma$-convergence for problems with holes, with strongly local Dir...
Abstract. We construct regular, local and conservative Dirichlet forms on the fractal blowup or on t...
Albeverio S, KUSUOKA S, Streit L. CONVERGENCE OF DIRICHLET FORMS AND ASSOCIATED SCHRODINGER-OPERATOR...
We consider the class of graph-directed constructions which are connected and have the property of f...
AbstractIn this paper we define and study a gradient on p.c.f. (post critically finite, or finitely ...
Abstract. In this paper we consider post-critically finite self-similar fractals with regular harmon...
AbstractLet E be an infinite-dimensional locally convex space, let {μn} be a weakly convergent seque...
Like Brownian motion on d (or equivalently its Laplace operator or its Dirichlet integral) one woul...