Local regularity of set-indexed processes.
Seminar
Speaker
Alexandre Richard, Ecole Centrale Paris
Date
17/06/2012 - 16:00Add to Calendar
2012-06-17 16:00:00
2012-06-17 16:00:00
Local regularity of set-indexed processes.
Abstract: we present shortly the theory of set-indexed processes as it was introduced
by Ivanoff and Merzbach. We study the Hölder regularity of such processes. The first key
result is a Hölder-continuity Theorem derived from the approximation of the indexing collection
by a nested sequence of finite subcollections. Hölder-continuity based on the
increment definition for set-indexed processes is also considered. Then, the localization
of these properties leads to various definitions of Hölder exponents.
In the case of Gaussian processes, almost sure values are proved for the Hölder exponents. As an
application, the local regularity of the set-indexed fractional Brownian motion and
the Ornstein-Uhlenbeck process are proved to be constant along the sample paths, with probability one.
Finally, a weak continuity property which only considers single point jumps is presented. We shall
present how this property helps caracterising certain classes of Lévy processes.
אוניברסיטת בר-אילן - Department of Mathematics
mathoffice@math.biu.ac.il
Asia/Jerusalem
public
Abstract
Abstract: we present shortly the theory of set-indexed processes as it was introduced
by Ivanoff and Merzbach. We study the Hölder regularity of such processes. The first key
result is a Hölder-continuity Theorem derived from the approximation of the indexing collection
by a nested sequence of finite subcollections. Hölder-continuity based on the
increment definition for set-indexed processes is also considered. Then, the localization
of these properties leads to various definitions of Hölder exponents.
In the case of Gaussian processes, almost sure values are proved for the Hölder exponents. As an
application, the local regularity of the set-indexed fractional Brownian motion and
the Ornstein-Uhlenbeck process are proved to be constant along the sample paths, with probability one.
Finally, a weak continuity property which only considers single point jumps is presented. We shall
present how this property helps caracterising certain classes of Lévy processes.
Last Updated Date : 29/05/2012