AbstractWe construct the surface measure on the space C([0,1],M) of paths in a compact Riemannian manifold M without boundary embedded into Rn which is induced by the usual flat Wiener measure on C([0,1],Rn) conditioned to the event that the Brownian particle does not leave the tubular ε-neighborhood of M up to time 1. We prove that the limit as ε→0 exists, the limit measure is equivalent to the Wiener measure on C([0,1],M), and we compute the corresponding density explicitly in terms of scalar and mean curvature
AbstractConsider the mean distance of Brownian motion on Riemannian manifolds. We obtain the first t...
Let be a one-parameter family of positive integral operators on a locally compact space . For a poss...
On the infinite dimensional space E of continuous paths from [0, 1] to Rn, n≥ 1 , endowed with ...
We construct the surface measure on the space C([0,1],M) of paths in a compact Riemannian manifold M...
We construct and study two surface measures on the space C([0,1],M) of paths in a compact Riemannian...
AbstractWe construct the surface measure on the space C([0,1],M) of paths in a compact Riemannian ma...
Let $L$L be a submanifold of a Riemannian manifold $M$M. The authors discuss several ways to constru...
This thesis discusses an approach to define surface measures on the path spaces of Riemannian subman...
We consider the path Zt described by a standard Brownian motion in on some time interval [0,t]. This...
AbstractWe consider the path Zt described by a standard Brownian motion in Rd on some time interval ...
Abstract.We consider two measure families related to Brownian motion conditioned to be in a tubular ...
Title: On Selected Geometric Properties of Brownian Motion Paths Author: Mgr. Ondřej Honzl E-mail Ad...
We present a study of the distance between a Brownian motion and a submanifold of a complete Riemann...
summary:We show that whenever the $q$-dimensional Minkowski content of a subset $A\subset \mathbb R^...
We study the functional Ω↦E(Ω), where Ω runs in the set of all compact domains of fixed volume v in ...
AbstractConsider the mean distance of Brownian motion on Riemannian manifolds. We obtain the first t...
Let be a one-parameter family of positive integral operators on a locally compact space . For a poss...
On the infinite dimensional space E of continuous paths from [0, 1] to Rn, n≥ 1 , endowed with ...
We construct the surface measure on the space C([0,1],M) of paths in a compact Riemannian manifold M...
We construct and study two surface measures on the space C([0,1],M) of paths in a compact Riemannian...
AbstractWe construct the surface measure on the space C([0,1],M) of paths in a compact Riemannian ma...
Let $L$L be a submanifold of a Riemannian manifold $M$M. The authors discuss several ways to constru...
This thesis discusses an approach to define surface measures on the path spaces of Riemannian subman...
We consider the path Zt described by a standard Brownian motion in on some time interval [0,t]. This...
AbstractWe consider the path Zt described by a standard Brownian motion in Rd on some time interval ...
Abstract.We consider two measure families related to Brownian motion conditioned to be in a tubular ...
Title: On Selected Geometric Properties of Brownian Motion Paths Author: Mgr. Ondřej Honzl E-mail Ad...
We present a study of the distance between a Brownian motion and a submanifold of a complete Riemann...
summary:We show that whenever the $q$-dimensional Minkowski content of a subset $A\subset \mathbb R^...
We study the functional Ω↦E(Ω), where Ω runs in the set of all compact domains of fixed volume v in ...
AbstractConsider the mean distance of Brownian motion on Riemannian manifolds. We obtain the first t...
Let be a one-parameter family of positive integral operators on a locally compact space . For a poss...
On the infinite dimensional space E of continuous paths from [0, 1] to Rn, n≥ 1 , endowed with ...