Spectral Asymptotics for Waveguides with Perturbed Periodic Twisting

Abstract

We consider the twisted waveguide θ, i.e. the domain obtained by the rotation of the bounded cross section ω ⊂ R2 of the straight tube : = ω × R at angle θ which depends on the variable along the axis of . We study the spectral properties of the Dirichlet Laplacian in θ, unitarily equivalent under the diffeomorphism θ to the operator Hθ', self-adjoint in L2(). We assume that θ' = β - ε where β is a 2π-periodic function, and ε decays at infinity. Then in the spectrum σ(Hβ) of the unperturbed operator Hβ there is a semi-bounded gap (-∞, E0+), and, possibly, a number of bounded open gaps ( Ej-, Ej+). Since ε decays at infinity, the essential spectra of Hβ and Hβ - ε coincide. We investigate the asymptotic behaviour of the discrete spectrum of Hβ - ε near an arbitrary fixed spectral edge Ej. We establish necessary and quite close sufficient conditions which guarantee the finiteness of σ disc(Hβ-ε) in a neighbourhood of Ej. In the case where the necessary conditions are violated, we obtain the main asymptotic term of the corresponding eigenvalue counting function. The effective Hamiltonian which governs the the asymptotics of σ disc(Hβ-ε) near Ej could be represented as a finite orthogonal sum of operators of the form -μd2dx2 - η ε, self-adjoint in L2( R); here, μ > 0 is a constant related to the so-called effective mass, while η is 2π-periodic function depending on β and ω.