Add to ORKGFollowing the methods used by Barlow and Bass to prove the existence of a diffusion on the Sierpinski Carpet, we establish the existence of a diffusion for a class of planar fractals which are not post critically finite. We conjecture that specific resistance estimates hold on our class of fractals. We further conjecture that these resistance estimates imply the existence of the spectral dimension for our class of fractals. Under these assumptions we use the methods of Barlow and Bass to establish heat kernel asymptotics. From there, we can use the techniques of Barlow, Bass, Kumagai, and Teplyaev to show the uniqueness of the diffusion up to scalar multiples. As a corollary, we conjecture the existence and uniqueness of a diffusion on the ...
We propose a numerical method to approximate the solution of a nonlocal diffusion problem on a gener...
The purpose of this research is to investigate properties of diffusion processes in porous media. Po...
The known properties of diffusion on fractals are reviewed in order to give a general outlook of the...
Following the methods used by Barlow and Bass to prove the existence of a diffusion on the Sierpinsk...
Following the methods used by Barlow and Bass to prove the existence of a diffusion on the Sierpinsk...
We construct Brownian motion on a class of fractals which are spatially homogeneous but which do not...
We develop a method to construct diffusions on singular sets. Our method can be applied to various f...
A fractal field is a collection of fractals with, in general, different Hausdorff dimensions, embedd...
The purpose of this research is to investigate properties of diffusion processes in porous media. Po...
A fractal field is a collection of fractals with, in general, different Hausdorff dimensions, embedd...
The purpose of this research is to investigate properties of diffusion processes in porous media. Po...
The purpose of this research is to investigate properties of diffusion processes in porous media. Po...
When viewed at an appropriate scale, a disordered medium can behave as if it is strictly less than t...
In the plane, we define a fractal known as the Vicsek snowflake in terms of a family of affine contr...
We calculate the spectral dimension of a wide class of tree-like fractals by solving the random walk...
We propose a numerical method to approximate the solution of a nonlocal diffusion problem on a gener...
The purpose of this research is to investigate properties of diffusion processes in porous media. Po...
The known properties of diffusion on fractals are reviewed in order to give a general outlook of the...
Following the methods used by Barlow and Bass to prove the existence of a diffusion on the Sierpinsk...
Following the methods used by Barlow and Bass to prove the existence of a diffusion on the Sierpinsk...
We construct Brownian motion on a class of fractals which are spatially homogeneous but which do not...
We develop a method to construct diffusions on singular sets. Our method can be applied to various f...
A fractal field is a collection of fractals with, in general, different Hausdorff dimensions, embedd...
The purpose of this research is to investigate properties of diffusion processes in porous media. Po...
A fractal field is a collection of fractals with, in general, different Hausdorff dimensions, embedd...
The purpose of this research is to investigate properties of diffusion processes in porous media. Po...
The purpose of this research is to investigate properties of diffusion processes in porous media. Po...
When viewed at an appropriate scale, a disordered medium can behave as if it is strictly less than t...
In the plane, we define a fractal known as the Vicsek snowflake in terms of a family of affine contr...
We calculate the spectral dimension of a wide class of tree-like fractals by solving the random walk...
We propose a numerical method to approximate the solution of a nonlocal diffusion problem on a gener...
The purpose of this research is to investigate properties of diffusion processes in porous media. Po...
The known properties of diffusion on fractals are reviewed in order to give a general outlook of the...