In a two-dimensional microwave chaotic cavity Ohmic losses located at the contour of the cavity result in different broadenings of different modes. We provide an analytic description and establish the link between such an inhomogeneous damping and the complex (non-real) character of biorthogonal wave functions. This substantiates the corresponding recent experimental findings of Barthélemy et al. (Europhys. Lett., 70 (2005) 162)
The mathematical equivalence of the time-independent Schrödinger equation and the Helmholtz equation...
In this work we shall test predictions of random wave models with microwave experiments. In wave or ...
Complex wave systems can be classified in two categories, whatever the type of wave equation involve...
In a two-dimensional microwave chaotic cavity Ohmic losses located at the contour of the cavity resu...
submitted to PRLWe experimentally study the various manifestations of ohmic losses in a two-dimensio...
Mathias Fink, Professeur à l'ESPCI, Paris, Président; Patricio Leboeuf, Directeur de Recherche, Orsa...
Complexness of eigenfunctions was studied using the effective Hamiltonian formalism & RMT ...
International audienceAny measurement opens a wave system. This coupling to the continuum drasticall...
The exact elastodynamic scattering theory is constructed to describe the spectral properties of tw...
The signatures of classical chaos and the role of periodic orbits in the wave-mechanical eigenvalue ...
The exact elastodynamic scattering theory is constructed to describe the spectral properties of two-...
International audienceIn this article, we present a numerical investigation of three-dimensional ele...
We study the statistical properties of the impedance (Z) and scattering (S) matrices of open electro...
We consider a modification of isospectral cavities whereby the classical dynamics changes from pseud...
During the last few years we have studied the chaotic behavior of special Euclidian geometries, so-c...
The mathematical equivalence of the time-independent Schrödinger equation and the Helmholtz equation...
In this work we shall test predictions of random wave models with microwave experiments. In wave or ...
Complex wave systems can be classified in two categories, whatever the type of wave equation involve...
In a two-dimensional microwave chaotic cavity Ohmic losses located at the contour of the cavity resu...
submitted to PRLWe experimentally study the various manifestations of ohmic losses in a two-dimensio...
Mathias Fink, Professeur à l'ESPCI, Paris, Président; Patricio Leboeuf, Directeur de Recherche, Orsa...
Complexness of eigenfunctions was studied using the effective Hamiltonian formalism & RMT ...
International audienceAny measurement opens a wave system. This coupling to the continuum drasticall...
The exact elastodynamic scattering theory is constructed to describe the spectral properties of tw...
The signatures of classical chaos and the role of periodic orbits in the wave-mechanical eigenvalue ...
The exact elastodynamic scattering theory is constructed to describe the spectral properties of two-...
International audienceIn this article, we present a numerical investigation of three-dimensional ele...
We study the statistical properties of the impedance (Z) and scattering (S) matrices of open electro...
We consider a modification of isospectral cavities whereby the classical dynamics changes from pseud...
During the last few years we have studied the chaotic behavior of special Euclidian geometries, so-c...
The mathematical equivalence of the time-independent Schrödinger equation and the Helmholtz equation...
In this work we shall test predictions of random wave models with microwave experiments. In wave or ...
Complex wave systems can be classified in two categories, whatever the type of wave equation involve...