Add to ORKGIn this article, we consider the problem of estimating the heat kernel on measure-metric spaces equipped with a resistance form. Such spaces admit a corresponding resistance metric that reflects the conductivity properties of the set. In this situation, it has been proved that when there is uniform polynomial volume growth with respect to the resistance metric the behaviour of the on-diagonal part of the heat kernel is completely determined by this rate of volume growth. However, recent results have shown that for certain random fractal sets, there are global and local (point-wise) fluctuations in the volume as r → 0 and so these uniform results do not apply. Motivated by these examples, we present global and local on-diagonal heat kernel e...
This paper studies strongly local symmetric Dirichlet forms on general measure spaces. The underlyin...
On doubling metric measure spaces endowed with a strongly local regular Dirichlet form, we show some...
Grigoryan A, Hu E, Hu J. Lower estimates of heat kernels for non-local Dirichlet forms on metric mea...
In this article, we consider the problem of estimating the heat kernel on measure-metric spaces equi...
Dendrites are tree-like topological spaces, and in this thesis, the physical characteristics of vari...
In this article, we prove global and local (point-wise) volume and heat kernel bounds for the contin...
Abstract. In this paper we present new heat kernel upper bounds for a certain class of non-local reg...
We examine a class of fractal graphs which arise from a subclass of finitely ramified fractals. The ...
Generalized diamond fractals constitute a parametric family of spaces that arise as scaling limits o...
We discuss two types of randomization for nested fractals based upon the d-dimensional Sierpinski ga...
Abstract. In this paper we prove that sub-Gaussian estimates of heat kernels of regular Dirichlet fo...
The heat content of a domain D of ℝd is defined as E(s) = ∫D u(s,x)dx, where u is the solut...
When viewed at an appropriate scale, a disordered medium can behave as if it is strictly less than t...
A fractal field is a collection of fractals with, in general, different Hausdorff dimensions, embedd...
Abstract. We obtain two-sided estimates of heat kernels on effective-resistance metric spaces by usi...
This paper studies strongly local symmetric Dirichlet forms on general measure spaces. The underlyin...
On doubling metric measure spaces endowed with a strongly local regular Dirichlet form, we show some...
Grigoryan A, Hu E, Hu J. Lower estimates of heat kernels for non-local Dirichlet forms on metric mea...
In this article, we consider the problem of estimating the heat kernel on measure-metric spaces equi...
Dendrites are tree-like topological spaces, and in this thesis, the physical characteristics of vari...
In this article, we prove global and local (point-wise) volume and heat kernel bounds for the contin...
Abstract. In this paper we present new heat kernel upper bounds for a certain class of non-local reg...
We examine a class of fractal graphs which arise from a subclass of finitely ramified fractals. The ...
Generalized diamond fractals constitute a parametric family of spaces that arise as scaling limits o...
We discuss two types of randomization for nested fractals based upon the d-dimensional Sierpinski ga...
Abstract. In this paper we prove that sub-Gaussian estimates of heat kernels of regular Dirichlet fo...
The heat content of a domain D of ℝd is defined as E(s) = ∫D u(s,x)dx, where u is the solut...
When viewed at an appropriate scale, a disordered medium can behave as if it is strictly less than t...
A fractal field is a collection of fractals with, in general, different Hausdorff dimensions, embedd...
Abstract. We obtain two-sided estimates of heat kernels on effective-resistance metric spaces by usi...
This paper studies strongly local symmetric Dirichlet forms on general measure spaces. The underlyin...
On doubling metric measure spaces endowed with a strongly local regular Dirichlet form, we show some...
Grigoryan A, Hu E, Hu J. Lower estimates of heat kernels for non-local Dirichlet forms on metric mea...