In this paper we study Brownian zeroes in the neighborhood of which one can observe non-typical growth rate of Brownian excursions. We interprete the multifractal curve for the Brownian zeroes calculated in 6) as the Hausdor dimension of certain sets
The aim of this work is the analysis of multifractals in the context of Mohamed El Naschie's epsilon...
AbstractWe apply the results in [L. Olsen, Multifractal analysis of divergence points of deformed me...
We study the Hausdorff dimension of a large class of sets in the real line defined in terms of the d...
We consider the multifractal spectrum of harmonic measure of a Brownian motion path in two or three ...
We calculate the multifractal spectrum and mass exponents for super-Brownian motion in three or more...
In the paper, we study the existence of the local nondeterminism and the joint continuity of the loc...
After an introduction to Brownian motion, Hausdorff dimension, nonstandard analysis and Loeb measure...
Abstract. We introduce a new concept of dimension for metric spaces, the so called topological Hausd...
In this dissertation, we study various dimension properties of the regularity of jump di usion proce...
We examine the multifractal spectra of one-sided local dimensions of Ahlfors regular measures on R. ...
Robert Kaufman’s proof that the set of rapid points of Brownian motion has a Fourier dimension equal...
Abstract. Let ` be the projected intersection local time of two independent Brownian paths in Rd for...
The topics of this thesis lie at the interference of probability theory with dimensional and harmoni...
this paper will follow for general fl 0 once they are established for fl 0 = 4, a value which arises...
The multifractal spectrum of discrete harmonic measure of a two dimensional simple random walk path ...
The aim of this work is the analysis of multifractals in the context of Mohamed El Naschie's epsilon...
AbstractWe apply the results in [L. Olsen, Multifractal analysis of divergence points of deformed me...
We study the Hausdorff dimension of a large class of sets in the real line defined in terms of the d...
We consider the multifractal spectrum of harmonic measure of a Brownian motion path in two or three ...
We calculate the multifractal spectrum and mass exponents for super-Brownian motion in three or more...
In the paper, we study the existence of the local nondeterminism and the joint continuity of the loc...
After an introduction to Brownian motion, Hausdorff dimension, nonstandard analysis and Loeb measure...
Abstract. We introduce a new concept of dimension for metric spaces, the so called topological Hausd...
In this dissertation, we study various dimension properties of the regularity of jump di usion proce...
We examine the multifractal spectra of one-sided local dimensions of Ahlfors regular measures on R. ...
Robert Kaufman’s proof that the set of rapid points of Brownian motion has a Fourier dimension equal...
Abstract. Let ` be the projected intersection local time of two independent Brownian paths in Rd for...
The topics of this thesis lie at the interference of probability theory with dimensional and harmoni...
this paper will follow for general fl 0 once they are established for fl 0 = 4, a value which arises...
The multifractal spectrum of discrete harmonic measure of a two dimensional simple random walk path ...
The aim of this work is the analysis of multifractals in the context of Mohamed El Naschie's epsilon...
AbstractWe apply the results in [L. Olsen, Multifractal analysis of divergence points of deformed me...
We study the Hausdorff dimension of a large class of sets in the real line defined in terms of the d...