Heat kernels in the context of Kato potentials on arbitrary manifolds

Abstract

By introducing the concept of Kato control pairs for a given Riemannian minimal heat kernel, we prove that on every Riemannian manifold (M,g) the Kato class K(M,g) has a subspace of the form Lq(M,d), where has a continuous density with respect to the volume measure μg (where q depends on (M)). Using a local parabolic L1-mean value inequality, we prove the existence of such densities for every Riemannian manifold, which in particular implies Lqloc(M)⊂Kloc(M,g). Based on previously established results, the latter local fact can be applied to the question of essential self-adjointness of Schr\"odinger operators with singular magnetic and electric potentials. Finally, we also provide a Kato criterion in terms of minimal Riemannian submersions.