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Ergodicity in Randomly Forced Rayleigh-B\'enard Convection

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arxiv 1511.01247 v1 pith:UEG23LW5 submitted 2015-11-04 math.AP

Ergodicity in Randomly Forced Rayleigh-B\'enard Convection

classification math.AP
keywords uniqueergodicityinvariantboussinesqconvectiondimensionsestablishexistence
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We consider the Boussinesq approximation for Rayleigh-B\'{e}nard convection perturbed by an additive noise and with boundary conditions corresponding to heating from below. In two space dimensions, with sufficient stochastic forcing in the temperature component and large Prandtl number, we establish the existence of a unique ergodic invariant measure. In three space dimensions, we prove the existence of a statistically invariant state, and establish unique ergodicity for the infinite Prandtl Boussinesq system. Throughout this work we provide streamlined proofs of unique ergodicity which invoke an asymptotic coupling argument, a delicate usage of the maximum principle, and exponential martingale inequalities. Lastly, we show that the background method of Constantin-Doering [CD96] can be applied in our stochastic setting, and prove bounds on the Nusselt number relative to the unique invariant measure.

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