- 01-113 Martin Hairer
- Exponential Mixing for a Stochastic PDE Driven by Denerate Noise
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Mar 28, 01
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Abstract. We study stochastic partial differential equations of the
reaction-diffusion type. We show that, even if the forcing is
very degenerate (i.e. has not full rank), one has exponential
convergence towards the invariant measure. The convergence takes
place in the topology induced by a weighted variation norm and
uses a kind of (uniform) Doeblin condition.
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