Generalized Ornstein--Uhlenbeck Semigroups in weighted Lp-spaces on Riemannian Manifolds

Abstract

Let E be a Hermitian vector bundle over a Riemannian manifold M with metric g, let ∇ be a metric covariant derivative on E. We study the generalized Ornstein-Uhlenbeck differential expression P∇=∇∇ u+∇(dφ)u-∇Xu+Vu, where ∇ is the formal adjoint of ∇, (dφ) is the vector field corresponding to dφ via g, X is a smooth real vector field on M, and V is a self-adjoint locally integrable section of the bundle End E. We show that (the negative of) the maximal realization -Hp, of P∇ generates an analytic quasi-contractive semigroup in Lpμ(E), 1<p<∞, where dμ=e-φdg, with g being the volume measure. Additionally, we describe a Feynman-Kac representation for the semigroup generated by -Hp,. For the Ornstein-Uhlenbeck differential expression acting on functions, that is, Pd= u+(dφ)u-Xu+Vu, where is the (non-negative) scalar Laplacian on M and V is a locally integrable real-valued function, we consider another way of realizing Pd as an operator in Lpμ(M) and, by imposing certain geometric conditions on M, we prove another semigroup generation result.