summary:We show that whenever the $q$-dimensional Minkowski content of a subset $A\subset \mathbb R^d$ exists and is finite and positive, then the “S-content” defined analogously as the Minkowski content, but with volume replaced by surface area, exists as well and equals the Minkowski content. As a corollary, we obtain the almost sure asymptotic behaviour of the surface area of the Wiener sausage in $\mathbb R^d$, $d\geq 3$
Hausdorff measure is often used to measure fractal sets. However, there is a more natural quantity, ...
AbstractLet Jωx(t) = x + ∝0t bω(s) ds, where bω is planar Brownian motion starting at 0. A Wiener-ty...
The heat content of a domain D of ℝd is defined as E(s) = ∫D u(s,x)dx, where u is the solut...
summary:We show that whenever the $q$-dimensional Minkowski content of a subset $A\subset \mathbb R^...
Title: On Selected Geometric Properties of Brownian Motion Paths Author: Mgr. Ondřej Honzl E-mail Ad...
For parallel neighborhoods of the paths of the d–dimensional Brownian motion, so–called Wiener sausa...
We consider the path Zt described by a standard Brownian motion in on some time interval [0,t]. This...
We construct the surface measure on the space C([0,1],M) of paths in a compact Riemannian manifold M...
AbstractWe construct the surface measure on the space C([0,1],M) of paths in a compact Riemannian ma...
AbstractWe consider the path Zt described by a standard Brownian motion in Rd on some time interval ...
Let $L$L be a submanifold of a Riemannian manifold $M$M. The authors discuss several ways to constru...
25p.We show that the range of a critical branching random walk conditioned to survive forever and th...
We construct and study two surface measures on the space C([0,1],M) of paths in a compact Riemannian...
We show that with probability 1, the trace B[0, 1] of Brownian motion in space, has positive capacit...
This thesis discusses an approach to define surface measures on the path spaces of Riemannian subman...
Hausdorff measure is often used to measure fractal sets. However, there is a more natural quantity, ...
AbstractLet Jωx(t) = x + ∝0t bω(s) ds, where bω is planar Brownian motion starting at 0. A Wiener-ty...
The heat content of a domain D of ℝd is defined as E(s) = ∫D u(s,x)dx, where u is the solut...
summary:We show that whenever the $q$-dimensional Minkowski content of a subset $A\subset \mathbb R^...
Title: On Selected Geometric Properties of Brownian Motion Paths Author: Mgr. Ondřej Honzl E-mail Ad...
For parallel neighborhoods of the paths of the d–dimensional Brownian motion, so–called Wiener sausa...
We consider the path Zt described by a standard Brownian motion in on some time interval [0,t]. This...
We construct the surface measure on the space C([0,1],M) of paths in a compact Riemannian manifold M...
AbstractWe construct the surface measure on the space C([0,1],M) of paths in a compact Riemannian ma...
AbstractWe consider the path Zt described by a standard Brownian motion in Rd on some time interval ...
Let $L$L be a submanifold of a Riemannian manifold $M$M. The authors discuss several ways to constru...
25p.We show that the range of a critical branching random walk conditioned to survive forever and th...
We construct and study two surface measures on the space C([0,1],M) of paths in a compact Riemannian...
We show that with probability 1, the trace B[0, 1] of Brownian motion in space, has positive capacit...
This thesis discusses an approach to define surface measures on the path spaces of Riemannian subman...
Hausdorff measure is often used to measure fractal sets. However, there is a more natural quantity, ...
AbstractLet Jωx(t) = x + ∝0t bω(s) ds, where bω is planar Brownian motion starting at 0. A Wiener-ty...
The heat content of a domain D of ℝd is defined as E(s) = ∫D u(s,x)dx, where u is the solut...