On the scattering vibrations in waveguides

Abstract

It is known that the existence of eigenvalues of the Laplacian is an essential condition for resonance. That is, if the frequency of the time-harmonic forces belongs to some discrete set on the real axis then the solution of the corresponding non-stationary initial and boundary value problem for the wave equation with a time-harmonic right-hand side increases as t/spl rarr//spl infin/. However, the absence of eigenvalues does not imply the absence of resonances as it has been shown in Wermer (1987) for the case of cylindrical waveguides with constant cross-section. In this paper a class of non-trivial solutions of the homogeneous Dirichlet's boundary value problem for the Helmholtz equation in a two-dimensional waveguide with locally variable cross-section is studied. The feature of these solutions is that they can be not decreasing in infinity. The theorem of non-existence is obtained under fulfilment of one geometrical condition.