We define a new Markov chain on the symbolic space representing the Sierpinski gasket (SG), and show that the corresponding Martin boundary is homeomorphic to the SG while the minimal Martin boundary is the three vertices of the SG. In addition, the harmonic structure induced by the Markov chain coincides with the canonical one on the SG. This suggests another approach to consider the existence of Laplacians on those self-similar sets for which the problem is still not settled
Abstract. For a family of domains in the Sierpinski gasket, we study har-monic functions of finite e...
In this paper, we study the non-linear backward problems (with deterministic or stochastic durations...
AbstractKigami has defined an analog of the Laplacian on a class of self-similar fractals, including...
We define a Markov chain on a discrete symbolic space corresponding to the Sierpinski gasket (SG) and...
We prove that for a certain Markov chain on the symbolic space of the Hata tree K, the Martin bounda...
In this paper,we extend some results from the standard Laplacian on the Sierpinski Gasket to the ene...
A uniformly John domain is a domain intermediate between a John domain and a uniform domain. We dete...
In this thesis we study non-linear dynamical systems on complex domains. Although the systems we con...
For a family of domains in the Sierpinski gasket, we study harmonic functions of finite energy, char...
We study the spectral properties of the Laplacian on infinite Sierpin ski gaskets. We prove that th...
We show that it is possible to define a notion of p-energy for functions defined on a class of fract...
We construct a lift of the Sierpinski gasket to the Heisenberg group, the invariant set of a horizon...
By using analytic tools from stochastic analysis, we initiate a study of some non-linear parabolic e...
We study the extension problem on the Sierpinski Gasket (SG). In the first part we con-sider minimiz...
Abstract We study the boundary value problems for the Laplacian on a sequence of domains constructed...
Abstract. For a family of domains in the Sierpinski gasket, we study har-monic functions of finite e...
In this paper, we study the non-linear backward problems (with deterministic or stochastic durations...
AbstractKigami has defined an analog of the Laplacian on a class of self-similar fractals, including...
We define a Markov chain on a discrete symbolic space corresponding to the Sierpinski gasket (SG) and...
We prove that for a certain Markov chain on the symbolic space of the Hata tree K, the Martin bounda...
In this paper,we extend some results from the standard Laplacian on the Sierpinski Gasket to the ene...
A uniformly John domain is a domain intermediate between a John domain and a uniform domain. We dete...
In this thesis we study non-linear dynamical systems on complex domains. Although the systems we con...
For a family of domains in the Sierpinski gasket, we study harmonic functions of finite energy, char...
We study the spectral properties of the Laplacian on infinite Sierpin ski gaskets. We prove that th...
We show that it is possible to define a notion of p-energy for functions defined on a class of fract...
We construct a lift of the Sierpinski gasket to the Heisenberg group, the invariant set of a horizon...
By using analytic tools from stochastic analysis, we initiate a study of some non-linear parabolic e...
We study the extension problem on the Sierpinski Gasket (SG). In the first part we con-sider minimiz...
Abstract We study the boundary value problems for the Laplacian on a sequence of domains constructed...
Abstract. For a family of domains in the Sierpinski gasket, we study har-monic functions of finite e...
In this paper, we study the non-linear backward problems (with deterministic or stochastic durations...
AbstractKigami has defined an analog of the Laplacian on a class of self-similar fractals, including...