Scattering in twisted waveguides

Abstract

We consider a twisted quantum waveguide i.e. a domain of the form θ : = rθ ω × R, where ω ⊂ R2 is a bounded domain, and rθ = rθ(x3) is a rotation by the angle θ(x3) depending on the longitudinal variable x3. We investigate the nature of the essential spectrum of the Dirichlet Laplacian Hθ, self-adjoint in L2 (θ), and consider related scattering problems. First, we show that if the derivative of the difference θ1 - θ2 decays fast enough as |x3| goes to infinity, then the wave operators for the operator pair (Hθ1, Hθ2) exist and are complete. Further, we concentrate on appropriate perturbations of constant twisting, i.e. θ' = β - ε, with constant β ∈ R, and ε which decays fast enough at infinity together with its first derivative. In this case the unperturbed operator corresponding to ε is an analytically fibered Hamiltonian with purely absolutely continuous spectrum. Obtaining Mourre estimates with a suitable conjugate operator, we prove, in particular, that the singular continuous spectrum of Hθ, is empty.