Abstract

By the method of coupling and Girsanov transformation, Harnack inequalities (F.-Y. Wang, 1997) and strong Feller property are proved for the transition semigroup associated with the multivalued stochastic evolution equation on a Gelfand triple. The concentration property of the invariant measure for the semigroup is investigated. As applications of Harnack inequalities, explicit upper bounds of the Lp-norm of the density, contractivity, compactness and entropy-cost inequality for the semigroup are also presented.

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