We present a novel approach to study the statistical properties of eigenfunctions in quantum systems with chaotic classical counterpart. The method is based on a far reaching generalization of an old suggestion, made by Berry in 1977, saying that irregular eigenfunctions can be described as Gaussian-distributed random functions. The so-called Gaussian conjecture is supplemented with a well controlled approximation for the two-point spatial correlation function, the only microscopic input of the theory. The method employed to construct the correlation function makes use of the semiclassical expression for the quantum propagator in terms of classical trajectories due to Gutzwiller. After a short introduction, we present analytic and numeri...
We discover a class of chaotic quantum systems for which we obtain some analytically exact eigenfunc...
We investigate analytically and numerically the eigenstate thermalization hypothesis (ETH) in terms ...
Quantum chaos of many-body systems has been swiftly developing into a vibrant research area at the i...
We present a novel approach to study the statistical properties of eigenfunctions in quantum systems...
We present a semiclassical approach to eigenfunction statistics in chaotic and weakly disordered qua...
The semiclassical approximation has been the main tool to connect classical and quantum mechanics, a...
We develop a statistical description of chaotic wave functions in closed systems obeying arbitrary b...
The structure of wavefunctions of quantum systems strongly depends on the underlying classical dynam...
Electronic transport through chaotic quantum dots exhibits universal, system independent, properties...
We present an improved version of Berry's ansatz able to incorporate exactly the existence of bounda...
International audienceThe eigenfunctions of quantized chaotic systems cannot be described by explici...
This thesis is concerned with the application and extension of semiclassical methods, involving corr...
We semiclassically derive the leading off-diagonal correction to the spectral form factor of quantum...
The statistical properties of the energy spectrum of classically chaotic closed quantum systems are ...
We define a random model for the moments of the new eigenfunctions of a point scat-terer on a 2-dime...
We discover a class of chaotic quantum systems for which we obtain some analytically exact eigenfunc...
We investigate analytically and numerically the eigenstate thermalization hypothesis (ETH) in terms ...
Quantum chaos of many-body systems has been swiftly developing into a vibrant research area at the i...
We present a novel approach to study the statistical properties of eigenfunctions in quantum systems...
We present a semiclassical approach to eigenfunction statistics in chaotic and weakly disordered qua...
The semiclassical approximation has been the main tool to connect classical and quantum mechanics, a...
We develop a statistical description of chaotic wave functions in closed systems obeying arbitrary b...
The structure of wavefunctions of quantum systems strongly depends on the underlying classical dynam...
Electronic transport through chaotic quantum dots exhibits universal, system independent, properties...
We present an improved version of Berry's ansatz able to incorporate exactly the existence of bounda...
International audienceThe eigenfunctions of quantized chaotic systems cannot be described by explici...
This thesis is concerned with the application and extension of semiclassical methods, involving corr...
We semiclassically derive the leading off-diagonal correction to the spectral form factor of quantum...
The statistical properties of the energy spectrum of classically chaotic closed quantum systems are ...
We define a random model for the moments of the new eigenfunctions of a point scat-terer on a 2-dime...
We discover a class of chaotic quantum systems for which we obtain some analytically exact eigenfunc...
We investigate analytically and numerically the eigenstate thermalization hypothesis (ETH) in terms ...
Quantum chaos of many-body systems has been swiftly developing into a vibrant research area at the i...