The weighted Hardy inequality and self-adjointness of symmetric diffusion operators

Abstract

Let be a domain in d with boundary \!, d the Euclidean distance to the boundary and H=-(C\,∇) an elliptic operator with C=(\,ckl\,)>0 where ckl=clk are real, bounded, Lipschitz functions. We assume that C c\,d\,δ as d0 in the sense of asymptotic analysis where c is a strictly positive, bounded, Lipschitz function and δ≥0. We also assume that there is an r>0 and a bδ,r>0 such that the weighted Hardy inequality \[ ∫_\!\!r d\,δ\,|∇ |2≥ bδ,r\,2∫_\!\!r d\,δ-2\,| |2 \] is valid for all ∈ Cc∞(\!\!r) where \!\!r=\x∈: d(x)<r\. We then prove that the condition (2-δ)/2<bδ is sufficient for the essential self-adjointness of H on Cc∞() with bδ the supremum over r of all possible bδ,r in the Hardy inequality. This result extends all known results for domains with smooth boundaries and also gives information on self-adjointness for a large family of domains with rough, e.g.\ fractal, boundaries.