Restricted hypercontractivity on the Poisson space
classification
🧮 math.PR
keywords
inequalitymappingspoissonrestrictedassociatedbuildclassicalcomplement
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We show that the Ornstein-Uhlenbeck semigroup associated with a general Poisson random measure is hypercontractive, whenever it is restricted to non-increasing mappings on configuration spaces. We deduce from this result some versions of Talagrand's $L^1$-$L^2$ inequality for increasing and concave mappings, and we build examples showing that such an estimate represents a strict improvement of the classical Poincar\'e inequality. We complement our finding with several results of independent interest, such as gradient estimates.
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