R-sectoriality of higher-order elliptic systems on general bounded domains

Abstract

On bounded domains ⊂ Rd , d ≥ 2, reaching far beyond the scope of Lipschitz domains, we consider an elliptic system of order 2 m in divergence form with complex L∞-coefficients complemented with homogeneous mixed Dirichlet/Neumann boundary conditions. We prove that the Lp-realization of the corresponding operator A is R-sectorial of angle ω ∈ [0 , π2), where in the case 2m < d, p ∈ (2dd + 2 m - , 2dd - 2 m + ) for some > 0, and where p ∈ (1 , ∞) in the case 2m ≥ d. To perform this proof, we generalize the Lp-extrapolation theorem of Shen to the Banach space valued setting and to arbitrary Lebesgue-measurable underlying sets.