We use the random self-similarity of the continuum random tree to show that it is homeomorphic to a post-critically finite self-similar fractal equipped with a random self-similar metric. As an application we determine the mean and almost-sure leading order behaviour of the high frequency asymptotics of the eigenvalue counting function associated with the natural Dirichlet form on the continuum random tree. We also obtain short time asymptotics for the trace of the heat semigroup and the annealed on-diagonal heat kernel associated with this Dirichlet form.
AbstractFractals and measures are often defined in a constructive way. In this paper, we give the co...
Journal électronique : http://www.math.washington.edu/~ejpecp/index.phpWe encode a certain class of ...
The probability that a random walker returns to its origin for large times scales as t- d/2, where d...
We use the random self-similarity of the continuum random tree to show that it is homeomorphic to a ...
AbstractWe use the random self-similarity of the continuum random tree to show that it is homeomorph...
AbstractGiven a self-similar Dirichlet form on a self-similar set, we first give an estimate on the ...
We calculate the mean and almost-sure leading order behaviour of the high frequency asymptotics of t...
We discuss the spectral asymptotics of some open subsets of the real line with random fractal bounda...
Dendrites are tree-like topological spaces, and in this thesis, the physical characteristics of vari...
We discuss two types of randomization for nested fractals based upon the d-dimensional Sierpinski ga...
The notion of spectral dimensionality of a self-similar (fractal) structure is recalled, and its val...
We report some results concerning spectral asymptotics of fractal Laplacians defined one-dimensional...
A generalization of a classic result of H. Weyl concerning the asymptotics of the spectrum of the La...
The recent field of analysis on fractals has been studied under a probabilistic and analytic point o...
It is shown that stretched exponential form of probability density of the random fractal systems is...
AbstractFractals and measures are often defined in a constructive way. In this paper, we give the co...
Journal électronique : http://www.math.washington.edu/~ejpecp/index.phpWe encode a certain class of ...
The probability that a random walker returns to its origin for large times scales as t- d/2, where d...
We use the random self-similarity of the continuum random tree to show that it is homeomorphic to a ...
AbstractWe use the random self-similarity of the continuum random tree to show that it is homeomorph...
AbstractGiven a self-similar Dirichlet form on a self-similar set, we first give an estimate on the ...
We calculate the mean and almost-sure leading order behaviour of the high frequency asymptotics of t...
We discuss the spectral asymptotics of some open subsets of the real line with random fractal bounda...
Dendrites are tree-like topological spaces, and in this thesis, the physical characteristics of vari...
We discuss two types of randomization for nested fractals based upon the d-dimensional Sierpinski ga...
The notion of spectral dimensionality of a self-similar (fractal) structure is recalled, and its val...
We report some results concerning spectral asymptotics of fractal Laplacians defined one-dimensional...
A generalization of a classic result of H. Weyl concerning the asymptotics of the spectrum of the La...
The recent field of analysis on fractals has been studied under a probabilistic and analytic point o...
It is shown that stretched exponential form of probability density of the random fractal systems is...
AbstractFractals and measures are often defined in a constructive way. In this paper, we give the co...
Journal électronique : http://www.math.washington.edu/~ejpecp/index.phpWe encode a certain class of ...
The probability that a random walker returns to its origin for large times scales as t- d/2, where d...