We measure the amplitude of the elastomechanical displacement at a fine grid of points on a free plate having the shape of a Sinai stadium. The obtained displacement field formally corresponds to a wave function in a quantum system. While the distribution of the squared amplitudes agrees with the prediction of random matrix theory (RMT), there is a strong deviation of the spatial correlator from the standard prediction for quantum chaotic systems. We show that this is due to the presence of two modes, leading to a beating phenomenon. We construct a proper extension of the spatial correlator within the framework of RMT
Ocean acoustic propagation can be formulated as a wave guide with a weakly random medium generating ...
This paper reports on a joint theoretical and experimental study of the Pauli quantum-mechanical str...
In order to investigate general relationships between waves and rays in chaotic systems, I study the...
Chaotic Hamiltonians are known to follow Random Matrix Theory (RMT) ensembles in the apparent random...
In this work we shall test predictions of random wave models with microwave experiments. In wave or ...
We set up and analyze a random matrix model to study energy localization and its time behavior in tw...
We investigate the fluctuation properties of the eigenvalues of the Laplacian in two dimensions with...
The signatures of classical chaos and the role of periodic orbits in the wave-mechanical eigenvalue ...
A key goal of quantum chaos is to establish a relationship between widely observed universal spectra...
Abstract. The statistical properties of the spectrum of systems which have a chaotic classical limit...
International audienceAny measurement opens a wave system. This coupling to the continuum drasticall...
We describe a novel approach for computing wave correlation functions inside finite spatial domains ...
In the field of Wave Chaos, statistics of ideal closed systems are nowadays well understood. However...
Quantum chaotic systems are often defined via the assertion that their spectral statistics coincides...
We discuss and briefly overview recent progress with studying fluctuations in scattering on a resona...
Ocean acoustic propagation can be formulated as a wave guide with a weakly random medium generating ...
This paper reports on a joint theoretical and experimental study of the Pauli quantum-mechanical str...
In order to investigate general relationships between waves and rays in chaotic systems, I study the...
Chaotic Hamiltonians are known to follow Random Matrix Theory (RMT) ensembles in the apparent random...
In this work we shall test predictions of random wave models with microwave experiments. In wave or ...
We set up and analyze a random matrix model to study energy localization and its time behavior in tw...
We investigate the fluctuation properties of the eigenvalues of the Laplacian in two dimensions with...
The signatures of classical chaos and the role of periodic orbits in the wave-mechanical eigenvalue ...
A key goal of quantum chaos is to establish a relationship between widely observed universal spectra...
Abstract. The statistical properties of the spectrum of systems which have a chaotic classical limit...
International audienceAny measurement opens a wave system. This coupling to the continuum drasticall...
We describe a novel approach for computing wave correlation functions inside finite spatial domains ...
In the field of Wave Chaos, statistics of ideal closed systems are nowadays well understood. However...
Quantum chaotic systems are often defined via the assertion that their spectral statistics coincides...
We discuss and briefly overview recent progress with studying fluctuations in scattering on a resona...
Ocean acoustic propagation can be formulated as a wave guide with a weakly random medium generating ...
This paper reports on a joint theoretical and experimental study of the Pauli quantum-mechanical str...
In order to investigate general relationships between waves and rays in chaotic systems, I study the...