On self-adjointness of symmetric diffusion operators

Abstract: Let Ω be a domain in R d with boundary Γ and let d Γ denote the Euclidean distance to Γ. Further let H = − div(C∇) where C = ( c kl ) > 0 with c kl = c lk are real, bounded, Lipschitz continuous functions and D(H) = C ∞ c (Ω). Assume also that there is a δ ≥ 0 suchto be bounded on Γ r . Then we prove that if Ω is a C 2 -domain, or if Ω = R d \S where S is a countable set of positively separated points, or if Ω = R d \Π with Π a convex set whose boundary has Hausdorff dimension d H ∈ {1, . . . , d − 1} then the… Show more

The weighted Hardy constant

The weighted Hardy constant