Elliptic operators with unbounded diffusion coefficients perturbed by inverse square potentials in Lp-spaces

Abstract

In this paper we give sufficient conditions on α ≥ 0 and c∈ R ensuring that the space of test functions Cc∞(RN) is a core for the operator L0u=(1+|x|α ) u+c|x|2u=:Lu+c|x|2u, and L0 with suitable domain generates a quasi-contractive and positivity preserving C0-semigroup in Lp(RN),\,1<p<∞. The proofs are based on some Lp-weighted Hardy's inequality and perturbation techniques.