On non-coercive mixed problems for parameter-dependent elliptic operators

Abstract

We consider a (generally, non-coercive) mixed boundary value problem in a bounded domain D of Rn for a second order parameter-dependent elliptic differential operator A (x,∂, λ) with complex-valued essentially bounded measured coefficients and complex parameter λ. The differential operator is assumed to be of divergent form in D, the boundary operator B (x,∂) is of Robin type with possible pseudo-differential components on ∂ D. The boundary of D is assumed to be a Lipschitz surface. Under these assumptions the pair (A (x,∂, λ),B) induces a holomorphic family of Fredholm operators L(λ): H+(D) H- (D) in suitable Hilbert spaces H+(D) , H- (D) of Sobolev type. If the argument of the complex-valued multiplier of the parame\-ter in A (x,∂, λ) is continuous and the coefficients related to second order derivatives of the operator are smooth then we prove that the operators L(λ) are conti\-nu\-ously invertible for all λ with sufficiently large modulus |λ| on each ray on the complex plane C where the differential operator A (x,∂, λ) is parameter-dependent elliptic. We also describe reasonable conditions for the system of root functions related to the family L (λ) to be (doubly) complete in the spaces H+(D), H- (D) and the Lebesgue space L2 (D).