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Hypercontractivity for Functional Stochastic Partial Differential Equations

Probability 2015-09-07 v2
Authors: Jianhai Bao , Feng-Yu Wang , Chenggui Yuan
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Abstract

Explicit sufficient conditions on the hypercontractivity are presented for two classes of functional stochastic partial differential equations driven by, respectively, non-degenerate and degenerate Gaussian noises. Consequently, these conditions imply that the associated Markov semigroup is L2L^2-compact and exponentially convergent to the stationary distribution in entropy, variance and total variational norm. As the log-Sobolev inequality is invalid under the framework, we apply a criterion presented in the recent paper \cite{Wang14} using Harnack inequality, coupling property and Gaussian concentration property of the stationary distribution. To verify the concentration property, we prove a Fernique type inequality for infinite-dimensional Gaussian processes which might be interesting by itself.

Keywords

sobolev inequalities harnack inequality stochastic partial differential equations

Cite

@article{arxiv.1503.02255,
  title  = {Hypercontractivity for Functional Stochastic Partial Differential Equations},
  author = {Jianhai Bao and Feng-Yu Wang and Chenggui Yuan},
  journal= {arXiv preprint arXiv:1503.02255},
  year   = {2015}
}

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17 pages

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