A fixed 2-dimensional projection of a 3-dimensional Brownian motion is almost surely neighborhood recurrent; is this simultaneously true of all the 2-dimensional projections with probability one? Equivalently: 3-dimensional Brownian motion hits any infinite cylinder with probability one; does it hit all cylinders? This papers shows that the answer is no. Brownian motion in three dimensions avoids random cylinders and in fact avoids bodies of revolution that grow almost as fast as cones
This work is composed of three self-contained parts, where the different models of statistical physi...
Abstract. We study a spatial branching model, where the underlying motion is d-dimensional (d ≥ 1) B...
Consider a semimartingale reflecting Brownian motion Z whose state space is the d-dimensional non-ne...
We consider a collection of balls in Euclidean space and the problem of determining if Brownian moti...
Consider the radial projection onto the unit sphere of the path a d-dimensional Brownian motion W, s...
Consider a semimartingale reflecting Brownian motion (SRBM) Z whose state space is the d-dimensional...
Let Z = {Z(t), t ≥ 0} be a semimartingale reflecting Brownian motion that lives in the three-dimensi...
International audienceMany situations of physical and biological interest involve diffusions on mani...
We discuss limiting behaviors of multi-dimensional diffusion processes in new types of random enviro...
We investigate the Martin-L�of random sample paths of Brownian motion, applying techniques from algo...
For d ϵ {1, 2, 3}, let (Bdt ; t > 0) be a d-dimensional standard Brownian motion. We study the d-...
Thesis (Ph.D.)--University of Washington, 2014In this thesis we introduce and study Brownian motion ...
Let A be the set of all points of the plane C, visited by two-dimensional Brownian motion before tim...
We study a spatial branching model, where the underlying motion is d-dimensional (d≥1) Brownian moti...
Abstract. The main result is a counterpart of the theorem of Monroe [Ann. Probability 6 (1978) 42–56...
This work is composed of three self-contained parts, where the different models of statistical physi...
Abstract. We study a spatial branching model, where the underlying motion is d-dimensional (d ≥ 1) B...
Consider a semimartingale reflecting Brownian motion Z whose state space is the d-dimensional non-ne...
We consider a collection of balls in Euclidean space and the problem of determining if Brownian moti...
Consider the radial projection onto the unit sphere of the path a d-dimensional Brownian motion W, s...
Consider a semimartingale reflecting Brownian motion (SRBM) Z whose state space is the d-dimensional...
Let Z = {Z(t), t ≥ 0} be a semimartingale reflecting Brownian motion that lives in the three-dimensi...
International audienceMany situations of physical and biological interest involve diffusions on mani...
We discuss limiting behaviors of multi-dimensional diffusion processes in new types of random enviro...
We investigate the Martin-L�of random sample paths of Brownian motion, applying techniques from algo...
For d ϵ {1, 2, 3}, let (Bdt ; t > 0) be a d-dimensional standard Brownian motion. We study the d-...
Thesis (Ph.D.)--University of Washington, 2014In this thesis we introduce and study Brownian motion ...
Let A be the set of all points of the plane C, visited by two-dimensional Brownian motion before tim...
We study a spatial branching model, where the underlying motion is d-dimensional (d≥1) Brownian moti...
Abstract. The main result is a counterpart of the theorem of Monroe [Ann. Probability 6 (1978) 42–56...
This work is composed of three self-contained parts, where the different models of statistical physi...
Abstract. We study a spatial branching model, where the underlying motion is d-dimensional (d ≥ 1) B...
Consider a semimartingale reflecting Brownian motion Z whose state space is the d-dimensional non-ne...