Stability of square root domains associated with elliptic systems of PDEs on nonsmooth domains

Abstract

We discuss stability of square root domains for uniformly elliptic partial differential operators La,, = -∇· a ∇ in L2(), with mixed boundary conditions on ∂ , with respect to additive perturbations. We consider open, bounded, and connected sets ∈ Rn, n ∈ N \1\, that satisfy the interior corkscrew condition and prove stability of square root domains of the operator La,, with respect to additive potential perturbations V ∈ Lp() + L∞(), p>n/2. Special emphasis is put on the case of uniformly elliptic systems with mixed boundary conditions.