International audienceWe consider the propagation of waves in a waveguide with Neumann boundary conditions. We work at low wavenumber with only one propagating mode in the leads, all the other modes being evanescent. We assume that the waveguide is symmetric with respect to an axis orthogonal to the longitudinal direction and is endowed with a branch of height L whose width coincides with the wavelength of the propagating modes. In this setting, tuning the parameter L, we prove the existence of simple geometries where the transmission coefficient is equal to one (perfect invisibility). We also show that these geometries, for possibly different values of L, support so called trapped modes (non zero solutions of finite energy of the homogeneo...
Trapped modes of the Helmholtz equation are investigated in infinite, two-dimensional acoustic waveg...
Abstract. The eigenstates of an electron in an infinite quantum waveguide (e.g., a bent strip or a t...
The existence of an eigenvalue embedded in the continuous spectrum is proved for the Neumann problem...
International audienceWe consider the reflection-transmission problem in a waveguide with obstacle. ...
International audienceWe consider the time-harmonic scattering wave problem in a 2D waveguide at wav...
The existence of trapped modes near obstacles in two-dimensional waveguides is well established when...
International audienceWe consider a time-harmonic wave problem, appearing for example in water-waves...
In this paper we investigate the existence of embedded trapped modes for symmetric obstacles which a...
Acoustic resonance problems in closed systems can be solved numerically with finite element methods...
International audienceWe consider the propagation of acoustic waves at a given wavenumber in a waveg...
We consider structures of period 2 spanning a two-dimensional waveguide of width 2N. Scattering prob...
We prove the existence of trapped modes in the presence of two classes of obstacles in cylindrical a...
It is well known that trapped modes exist in certain types of acoustic waveguides. These modes corre...
Trapped modes within elastic waveguides are investigated employing asymptotic and numericalmethods. ...
International audienceWe are interested in a time harmonic acoustic problem in a waveguide with loca...
Trapped modes of the Helmholtz equation are investigated in infinite, two-dimensional acoustic waveg...
Abstract. The eigenstates of an electron in an infinite quantum waveguide (e.g., a bent strip or a t...
The existence of an eigenvalue embedded in the continuous spectrum is proved for the Neumann problem...
International audienceWe consider the reflection-transmission problem in a waveguide with obstacle. ...
International audienceWe consider the time-harmonic scattering wave problem in a 2D waveguide at wav...
The existence of trapped modes near obstacles in two-dimensional waveguides is well established when...
International audienceWe consider a time-harmonic wave problem, appearing for example in water-waves...
In this paper we investigate the existence of embedded trapped modes for symmetric obstacles which a...
Acoustic resonance problems in closed systems can be solved numerically with finite element methods...
International audienceWe consider the propagation of acoustic waves at a given wavenumber in a waveg...
We consider structures of period 2 spanning a two-dimensional waveguide of width 2N. Scattering prob...
We prove the existence of trapped modes in the presence of two classes of obstacles in cylindrical a...
It is well known that trapped modes exist in certain types of acoustic waveguides. These modes corre...
Trapped modes within elastic waveguides are investigated employing asymptotic and numericalmethods. ...
International audienceWe are interested in a time harmonic acoustic problem in a waveguide with loca...
Trapped modes of the Helmholtz equation are investigated in infinite, two-dimensional acoustic waveg...
Abstract. The eigenstates of an electron in an infinite quantum waveguide (e.g., a bent strip or a t...
The existence of an eigenvalue embedded in the continuous spectrum is proved for the Neumann problem...