Gradient estimates for diffusion semigroups with singular coefficients

Uniform gradient estimates are derived for diffusion semigroups, possibly with potential, generated by second order elliptic operators having irregular and unbounded coefficients. We first consider the R^d -case, by using the coupling method. Due to the singularity of the coefficients, the coupling process we construct is not strongly Markovian, so that additional difficulties arise in the study. Then, more generally, we treat
the case of a possibly unbounded smooth domain of R^d with Dirichlet boundary conditions. We stress that the resulting estimates are new even in the R^d-case and that the coefficients can be Hölder continuous. Our results also imply a new Liouville theorem for space–time bounded harmonic functions with respect to the underlying diffusion semigroup.