Regularity theory for parabolic operators in the half-space with boundary degeneracy

Abstract

We study elliptic and parabolic problems governed by the singular elliptic operators align* L=yα1Tr (QD2xu)+2yα1+α22q· ∇xDy+γ yα2 Dyy+Cyα2-1Dy align* under Neumann boundary condition, in the half-space RN+1+=\(x,y): x ∈ RN, y>0\. We prove elliptic and parabolic Lp-estimates and solvability for the associated problems. In the language of semigroup theory, we prove that L generates an analytic semigroup, characterize its domain as a weighted Sobolev space and show that it has maximal regularity.