The spectral dimension of the Laplacian defined by a measure has been shown to be closely related to heat kernel estimates, which under suitable conditions determine whether wave propagates with finite or infinite speed. We observe that some self-similar measures defined by finite or infinite iterated function systems with overlaps satisfy certain “essentially finite type condition”, which allows us to extract useful measure-theoretic properties of iterates of the measure. We develop a technique to obtain, under this condition, a closed formula for the spectral dimension of the Laplacian. Earlier results for fractal measures with overlaps rely on Strichartz second-order identities, which are not satisfied by the measures we consider here. This is a...
We set up a framework for computing the spectral dimension of a class of one-dimensional self-simila...
A generalization of a classic result of H. Weyl concerning the asymptotics of the spectrum of the La...
We study one-dimensional wave equations defined by a class of fractal Laplacians. These Laplacians ar...
The spectral dimension of the Laplacian defined by a measure has been shown to be closely related to ...
The spectral dimension of the Laplacian defined by a measure has been shown to be closely related to...
We report some results concerning spectral asymptotics of fractal Laplacians defined one-dimensional...
We observe that some self-similar measures defined by finite or infinite iterated function systems with...
We observe that some self-similar measures defined by finite or infinite iterated function systems with...
We study the distribution of eigenvalues of some Laplacians defined by fractal measures. We focus on...
We study spectral asymptotics of Laplacians defined by iterated function systems with overlaps in hi...
We study spectral asymptotics of a class of Laplacians defined by iterated function systems with over...
We study spectral asymptotics of a class of Laplacians defined by iterated function systems with over...
AbstractUnder the assumption that a self-similar measure defined by a one-dimensional iterated funct...
Under the assumption that a self-similar measure defined by a one-dimensional iterated function syst...
Self-similar measures form a fundamental class of fractal measures, and is much less understood if t...
We set up a framework for computing the spectral dimension of a class of one-dimensional self-simila...
A generalization of a classic result of H. Weyl concerning the asymptotics of the spectrum of the La...
We study one-dimensional wave equations defined by a class of fractal Laplacians. These Laplacians ar...
The spectral dimension of the Laplacian defined by a measure has been shown to be closely related to ...
The spectral dimension of the Laplacian defined by a measure has been shown to be closely related to...
We report some results concerning spectral asymptotics of fractal Laplacians defined one-dimensional...
We observe that some self-similar measures defined by finite or infinite iterated function systems with...
We observe that some self-similar measures defined by finite or infinite iterated function systems with...
We study the distribution of eigenvalues of some Laplacians defined by fractal measures. We focus on...
We study spectral asymptotics of Laplacians defined by iterated function systems with overlaps in hi...
We study spectral asymptotics of a class of Laplacians defined by iterated function systems with over...
We study spectral asymptotics of a class of Laplacians defined by iterated function systems with over...
AbstractUnder the assumption that a self-similar measure defined by a one-dimensional iterated funct...
Under the assumption that a self-similar measure defined by a one-dimensional iterated function syst...
Self-similar measures form a fundamental class of fractal measures, and is much less understood if t...
We set up a framework for computing the spectral dimension of a class of one-dimensional self-simila...
A generalization of a classic result of H. Weyl concerning the asymptotics of the spectrum of the La...
We study one-dimensional wave equations defined by a class of fractal Laplacians. These Laplacians ar...