English

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

Analysis of PDEs 2019-04-15 v1

Abstract

We consider a (generally, non-coercive) mixed boundary value problem in a bounded domain DD of Rn{\mathbb R}^n for a second order parameter-dependent elliptic differential operator A(x,,λ)A (x,\partial, \lambda) with complex-valued essentially bounded measured coefficients and complex parameter λ\lambda. The differential operator is assumed to be of divergent form in DD, the boundary operator B(x,)B (x,\partial) is of Robin type with possible pseudo-differential components on D\partial D. The boundary of DD is assumed to be a Lipschitz surface. Under these assumptions the pair (A(x,,λ),B)(A (x,\partial, \lambda),B) induces a holomorphic family of Fredholm operators L(λ):H+(D)H(D)L(\lambda): H^+(D) \to H^- (D) in suitable Hilbert spaces H+(D)H^+(D) , H(D)H^- (D) of Sobolev type. If the argument of the complex-valued multiplier of the parame\-ter in A(x,,λ)A (x,\partial, \lambda) is continuous and the coefficients related to second order derivatives of the operator are smooth then we prove that the operators L(λ)L(\lambda) are conti\-nu\-ously invertible for all λ\lambda with sufficiently large modulus λ|\lambda| on each ray on the complex plane C\mathbb C where the differential operator A(x,,λ)A (x,\partial, \lambda) is parameter-dependent elliptic. We also describe reasonable conditions for the system of root functions related to the family L(λ)L (\lambda) to be (doubly) complete in the spaces H+(D)H^+(D), H(D)H^- (D) and the Lebesgue space L2(D)L^2 (D).

Keywords

Cite

@article{arxiv.1904.06042,
  title  = {On non-coercive mixed problems for parameter-dependent elliptic operators},
  author = {A. Polkovnikov and A. Shlapunov},
  journal= {arXiv preprint arXiv:1904.06042},
  year   = {2019}
}
R2 v1 2026-06-23T08:37:31.405Z