Uniqueness and stability results for an inverse spectral problem in a periodic waveguide

Abstract

Let =ω× R where ω⊂ R2 be a bounded domain, and V : R a bounded potential which is 2π-periodic in the variable x3∈ R. We study the inverse problem consisting in the determination of V, through the boundary spectral data of the operator u Au := - u + Vu, acting on L2(ω×(0,2π)), with quasi-periodic and Dirichlet boundary conditions. More precisely we show that if for two potentials V1 and V2 we denote by (λ1,k)k and (λ2,k)k the eigenvalues associated to the operators A1 and A2 (that is the operator A with V := V1 or V:=V2), then if λ1,k - λ2,k 0 as k ∞ we have that V1 V2, provided one knows also that Σk≥ 1\|1,k - 2,k\|L2(∂ω×[0,2π])2 < ∞, where m,k := ∂φm,k/∂ n. We establish also an optimal Lipschitz stability estimate. The arguments developed here may be applied to other spectral inverse problems, and similar results can be obtained.