We consider the multifractal spectrum of harmonic measure of a Brownian motion path in two or three dimensions. We show that the multifractal spectrum is nontrivial and relate the spectrum to the intersection exponent. As a corollary we show that harmonic measure on a three dimension Brownian motion path is carried on a set of Hausdorff dimension strictly less than two
In this paper we study the multifractal structure of Schramm's SLE curves. We derive the values of t...
Self-similar measures form a fundamental class of fractal measures, and is much less understood if t...
this paper will follow for general fl 0 once they are established for fl 0 = 4, a value which arises...
We consider the multifractal spectrum of harmonic measure of a Brownian motion path in two or three ...
The multifractal spectrum of discrete harmonic measure of a two dimensional simple random walk path ...
In this paper we study Brownian zeroes in the neighborhood of which one can observe non-typical grow...
Abstract. Let ` be the projected intersection local time of two independent Brownian paths in Rd for...
URL: http://www-spht.cea.fr/articles/t98/154/Our aim is to derive from conformal invariance the mult...
We calculate the multifractal spectrum and mass exponents for super-Brownian motion in three or more...
Multifractal spectra provide a way of encapsulating information about the nature of random measures ...
We introduce the concepts of local spectral and walk dimension for fractals. For a class of finitely...
We introduce the mathematical concept of multifractality and describe various multifractal spectra f...
We introduce the mathematical concept of multifractality and describe various multifractal spectra f...
In the paper, we study the existence of the local nondeterminism and the joint continuity of the loc...
Let $M_{\gamma}$ be a sub-critical Gaussian multiplicative chaos measure associated with a general l...
In this paper we study the multifractal structure of Schramm's SLE curves. We derive the values of t...
Self-similar measures form a fundamental class of fractal measures, and is much less understood if t...
this paper will follow for general fl 0 once they are established for fl 0 = 4, a value which arises...
We consider the multifractal spectrum of harmonic measure of a Brownian motion path in two or three ...
The multifractal spectrum of discrete harmonic measure of a two dimensional simple random walk path ...
In this paper we study Brownian zeroes in the neighborhood of which one can observe non-typical grow...
Abstract. Let ` be the projected intersection local time of two independent Brownian paths in Rd for...
URL: http://www-spht.cea.fr/articles/t98/154/Our aim is to derive from conformal invariance the mult...
We calculate the multifractal spectrum and mass exponents for super-Brownian motion in three or more...
Multifractal spectra provide a way of encapsulating information about the nature of random measures ...
We introduce the concepts of local spectral and walk dimension for fractals. For a class of finitely...
We introduce the mathematical concept of multifractality and describe various multifractal spectra f...
We introduce the mathematical concept of multifractality and describe various multifractal spectra f...
In the paper, we study the existence of the local nondeterminism and the joint continuity of the loc...
Let $M_{\gamma}$ be a sub-critical Gaussian multiplicative chaos measure associated with a general l...
In this paper we study the multifractal structure of Schramm's SLE curves. We derive the values of t...
Self-similar measures form a fundamental class of fractal measures, and is much less understood if t...
this paper will follow for general fl 0 once they are established for fl 0 = 4, a value which arises...