AbstractThe infinite-dimensional Ornstein–Uhlenbeck process v is constructed from Brownian motion on the infinite-dimensional sphere SN−1(1) (the Wiener sphere) – or equivalently, by rescaling, on SN−1(N) – which is defined for infinite N by nonstandard analysis. This gives rigorous sense to the informal idea (due to Malliavin, Williams and others) that v can be thought of as Brownian motion on S∞(∞). An invariance principle follows easily. The paper is a sequel to Cutland and Ng (1993) where the uniform Loeb measure on SN−1(1) was shown to give a rigorous construction of Wiener measure
We establish large increment properties for infinite series of independent Ornstein-Uhlenbeck proces...
AbstractConsider a Wiener process W on a circle of circumference L. We prove the rather surprising r...
In this paper we investigate the existence and some useful properties of the Lévy areas of Ornstein-...
The infinite-dimensional Ornstein-Uhlenbeck process v is constructed from Brownian motion on the inf...
AbstractThe infinite-dimensional Ornstein–Uhlenbeck process v is constructed from Brownian motion on...
AbstractWe study the potential theory of a large class of infinite dimensional Lévy processes, inclu...
We use a Stochastic Differential Equation satisfied by Brownian motion taking values in the unit sph...
A class of infinite dimensional Ornstein-Uhlenbeck processes that arise as solutions of stochastic p...
The Brownian motion with multi-dimensional time parameter introduced by Paul Lévy can be viewed as a...
In the first part of this work we use Levy's characterization of Brownian motion and a Time-Change t...
A class of infinite dimensional Ornstein-Uhlenbeck processes that arise as solutions of stochastic p...
Beznea L, Cornea A, Röckner M. Potential theory of infinite dimensional Levy processes. Journal of F...
The indefinite integral of the homogenized Ornstein-Uhlenbeck process is a well-known model for phys...
Brownian motion has met growing interest in mathematics, physics and particularly in finance since i...
The Wasserstein space $\mathcal P_2$ consists of square integrable probability measures on $\R^d$ an...
We establish large increment properties for infinite series of independent Ornstein-Uhlenbeck proces...
AbstractConsider a Wiener process W on a circle of circumference L. We prove the rather surprising r...
In this paper we investigate the existence and some useful properties of the Lévy areas of Ornstein-...
The infinite-dimensional Ornstein-Uhlenbeck process v is constructed from Brownian motion on the inf...
AbstractThe infinite-dimensional Ornstein–Uhlenbeck process v is constructed from Brownian motion on...
AbstractWe study the potential theory of a large class of infinite dimensional Lévy processes, inclu...
We use a Stochastic Differential Equation satisfied by Brownian motion taking values in the unit sph...
A class of infinite dimensional Ornstein-Uhlenbeck processes that arise as solutions of stochastic p...
The Brownian motion with multi-dimensional time parameter introduced by Paul Lévy can be viewed as a...
In the first part of this work we use Levy's characterization of Brownian motion and a Time-Change t...
A class of infinite dimensional Ornstein-Uhlenbeck processes that arise as solutions of stochastic p...
Beznea L, Cornea A, Röckner M. Potential theory of infinite dimensional Levy processes. Journal of F...
The indefinite integral of the homogenized Ornstein-Uhlenbeck process is a well-known model for phys...
Brownian motion has met growing interest in mathematics, physics and particularly in finance since i...
The Wasserstein space $\mathcal P_2$ consists of square integrable probability measures on $\R^d$ an...
We establish large increment properties for infinite series of independent Ornstein-Uhlenbeck proces...
AbstractConsider a Wiener process W on a circle of circumference L. We prove the rather surprising r...
In this paper we investigate the existence and some useful properties of the Lévy areas of Ornstein-...