A basic identity for Kolmogorov operators in the space of continuous functions related to RDEs with multiplicative noise

Abstract

We consider the Kolmogorov operator associated with a reaction-diffusion equation having polynomially growing reaction coefficient and perturbed by a noise of multiplicative type, in the Banach space E of continuous functions. By analyzing the smoothing properties of the associated transition semigroup, we prove a modification of the classical identit\'e du carr\'e di champs that applies to the present non-Hilbertian setting. As an application of this identity, we construct the Sobolev space W1,2(E;μ), where μ is an invariant measure for the system, and we prove the validity of the Poincar\'e inequality and of the spectral gap.