Lp-Kato class measures and their relations with Sobolev embedding theorems for Dirichlet spaces

Abstract

In this paper, we discuss relationships between the continuous embeddings of Dirichlet spaces (F, E1) into Lebesgue spaces and the integrability of the associated resolvent kernel rα(x, y). For a positive measure μ, we consider the following two properties; the first one is that the Dirichlet space (F, E1) is continuously embedded into L2p(E;μ) (which we write as (Sob)p), and the second one is that the family of 1-order resolvent kernels \r1(x, y)\x∈ E is uniformly p-th integrable in y with respect to the measure μ (which we write as (Dyn)p). Under some assumptions, for a measure μ satisfying (Dyn)1, we prove (Dyn)p' implies (Sob)p for 1≤ p ≤ p'<∞, and prove (Sob)p' implies (Dyn)p for 1≤ p < p'<∞. To prove these results we introduce Lp-Kato class, an Lp-version of the set of Kato class measures, and discuss its properties. We also give variants of such relations corresponding to the Gagliardo-Nirenberg type interpolation inequalities. As an application, we discuss the continuity of intersection measures in time.