Attractors for SPDE driven by an FBM and nontrival multiplicative noise
Add to your list(s)
Download to your calendar using vCal
If you have a question about this talk, please contact Mustapha Amrani.
Stochastic Partial Differential Equations (SPDEs)
First we prove existence and uniqueness for solutions of SPDE driven by an FBM ($H>1/2$) with nontrivial multiplicative noise in the space of H{“o}lder continuous functions. Here $A$ is the negative generator of an analytic semigroup and $G$ satisfies regularity conditions. Later we use these solutions to generate a random dynamical system. This random dynamical system is smoothing and dissipative. These two properties then allow to conclude that this the SPDE has a random attractor.
This talk is part of the Isaac Newton Institute Seminar Series series.
This talk is included in these lists:
Note that ex-directory lists are not shown.
|
![[Search]](https://talks.cam.ac.uk/images/search.gif?1209136071)
|![[A-Z Index]](https://talks.cam.ac.uk/images/az.gif?1209136071)
|![[Contact]](https://talks.cam.ac.uk/images/contact.gif?1209136071)
![[University of Cambridge]](https://talks.cam.ac.uk/images/identifier2.gif?1209136071){kind=small}
![[Talks.cam]](https://talks.cam.ac.uk/images/talkslogosmall.gif?1209136071)
Wednesday 12 September 2012, 16:50-17:30