We present an improved version of Berry's ansatz able to incorporate exactly the existence of boundaries and the correct normalization of the eigenfunction into an ensemble of random waves. We then reformulate the Random Wave conjecture showing that in its new version it is a statement about the universal nature of eigenfunction fluctuations in systems with chaotic classical dynamics. The emergence of the universal results requires the use of both semiclassical methods and a new expansion for a very old problem in quantum statistical physics
Abstract. The statistical properties of the spectrum of systems which have a chaotic classical limit...
The structure of wavefunctions of quantum systems strongly depends on the underlying classical dynam...
We consider Gaussian Laplace eigenfunctions on the two-dimensional flat torus (arithmetic random wav...
We present an improved version of Berry's ansatz able to incorporate exactly the existence of bounda...
The structure of wavefunctions strongly depends on the underlying classical dynamics. We illustrate...
Starting with Berry's hypothesis for fixed energy waves in a classically chaotic system, and casting...
We develop a statistical description of chaotic wave functions in closed systems obeying arbitrary b...
We study a new statistics of wave functions in several chaotic and disordered systems: the random m...
The growth of the maximum norms of quantum eigenstates of classically chaotic systems with increasin...
We present a semiclassical approach to eigenfunction statistics in chaotic and weakly disordered qua...
We study chaotic eigenfunctions in wedge-shaped and rectangular regions using a generalization of Be...
We prove two results on arithmetic quantum chaos for dihedral Maaß forms, both of which are manifest...
Quantum counterparts of certain simple classical systems can exhibit chaotic behaviour through the s...
The distribution of the eigenvalues of a quantum Hamiltonian is a central subject that is studied in...
The behaviour of quantum chaotic states of billiard systems is believed to be well described by Berr...
Abstract. The statistical properties of the spectrum of systems which have a chaotic classical limit...
The structure of wavefunctions of quantum systems strongly depends on the underlying classical dynam...
We consider Gaussian Laplace eigenfunctions on the two-dimensional flat torus (arithmetic random wav...
We present an improved version of Berry's ansatz able to incorporate exactly the existence of bounda...
The structure of wavefunctions strongly depends on the underlying classical dynamics. We illustrate...
Starting with Berry's hypothesis for fixed energy waves in a classically chaotic system, and casting...
We develop a statistical description of chaotic wave functions in closed systems obeying arbitrary b...
We study a new statistics of wave functions in several chaotic and disordered systems: the random m...
The growth of the maximum norms of quantum eigenstates of classically chaotic systems with increasin...
We present a semiclassical approach to eigenfunction statistics in chaotic and weakly disordered qua...
We study chaotic eigenfunctions in wedge-shaped and rectangular regions using a generalization of Be...
We prove two results on arithmetic quantum chaos for dihedral Maaß forms, both of which are manifest...
Quantum counterparts of certain simple classical systems can exhibit chaotic behaviour through the s...
The distribution of the eigenvalues of a quantum Hamiltonian is a central subject that is studied in...
The behaviour of quantum chaotic states of billiard systems is believed to be well described by Berr...
Abstract. The statistical properties of the spectrum of systems which have a chaotic classical limit...
The structure of wavefunctions of quantum systems strongly depends on the underlying classical dynam...
We consider Gaussian Laplace eigenfunctions on the two-dimensional flat torus (arithmetic random wav...