We study fractal properties of the image and the graph of Brownian motion in Rd with an arbitrary càdlàg drift f. We prove that the Minkowski (box) dimension of both the image and the graph of B + f over A ⊆ [0, 1] are a.s. constants. We then show that for all d ≥ 1 the Minkowski dimension of (B + f)(A) is at least the maximum of the Minkowski dimension of f(A) and that of B(A). We also prove analogous results for the graph. For linear Brownian motion, if the drift f is continuous and A = [0, 1], then the corresponding inequality for the graph is actually an equality
In this paper we study Brownian zeroes in the neighborhood of which one can observe non-typical grow...
In the paper, we study the existence of the local nondeterminism and the joint continuity of the loc...
AbstractConsider a planar Brownian motion run for finite time. Thefrontieror “outer boundary” of the...
We study fractal properties of the image and the graph of Brownian motion in Rd with an arbitrary ca...
Let X be a fractional Brownian motion in Rd. For any Borel function f: [0, 1] → Rd, we express the ...
The purpose of this paper is to construct Brownian motion on a reasonably general class of self-simi...
In the plane, we define a fractal known as the Vicsek snowflake in terms of a family of affine contr...
AbstractIn the plane, we define a fractal known as the Vicsek snowflake in terms of a family of affi...
Hausdorff measure is often used to measure fractal sets. However, there is a more natural quantity, ...
Thesis (Ph.D.)--University of Washington, 2014In this thesis we introduce and study Brownian motion ...
Robert Kaufman’s proof that the set of rapid points of Brownian motion has a Fourier dimension equal...
This paper concerns the intermediate dimensions, a spectrum of dimensions that interpolate between t...
We show that the almost sure θ-intermediate dimension of the image of the set Fp ={0, 1,1/2p,1/3p,.....
This thesis concerns Brownian motion with a random drift defined to be fixed in each unit cube $Q\sb...
After an introduction to Brownian motion, Hausdorff dimension, nonstandard analysis and Loeb measure...
In this paper we study Brownian zeroes in the neighborhood of which one can observe non-typical grow...
In the paper, we study the existence of the local nondeterminism and the joint continuity of the loc...
AbstractConsider a planar Brownian motion run for finite time. Thefrontieror “outer boundary” of the...
We study fractal properties of the image and the graph of Brownian motion in Rd with an arbitrary ca...
Let X be a fractional Brownian motion in Rd. For any Borel function f: [0, 1] → Rd, we express the ...
The purpose of this paper is to construct Brownian motion on a reasonably general class of self-simi...
In the plane, we define a fractal known as the Vicsek snowflake in terms of a family of affine contr...
AbstractIn the plane, we define a fractal known as the Vicsek snowflake in terms of a family of affi...
Hausdorff measure is often used to measure fractal sets. However, there is a more natural quantity, ...
Thesis (Ph.D.)--University of Washington, 2014In this thesis we introduce and study Brownian motion ...
Robert Kaufman’s proof that the set of rapid points of Brownian motion has a Fourier dimension equal...
This paper concerns the intermediate dimensions, a spectrum of dimensions that interpolate between t...
We show that the almost sure θ-intermediate dimension of the image of the set Fp ={0, 1,1/2p,1/3p,.....
This thesis concerns Brownian motion with a random drift defined to be fixed in each unit cube $Q\sb...
After an introduction to Brownian motion, Hausdorff dimension, nonstandard analysis and Loeb measure...
In this paper we study Brownian zeroes in the neighborhood of which one can observe non-typical grow...
In the paper, we study the existence of the local nondeterminism and the joint continuity of the loc...
AbstractConsider a planar Brownian motion run for finite time. Thefrontieror “outer boundary” of the...