Starting with Berry's hypothesis for fixed energy waves in a classically chaotic system, and casting it in a Green function form, we derive wavefunction correlations and density matrices for few or many particles. Universal features of fixed energy (microcanonical) random wavefunction correlation functions appear which reflect the emergence of the canonical ensemble as N↦∞. This arises through a little known asymptotic limit of Bessel functions. The Berry random wave hypothesis in many dimensions may be viewed as an alternative approach to quantum statistical mechanics, when extended to include constraints and potentials
I will explain how to use chaos decomposition technique to analyze the asymptotic behavior of geomet...
A key goal of quantum chaos is to establish a relationship between widely observed universal spectra...
We describe a novel approach for computing wave correlation functions inside finite spatial domains ...
We present an improved version of Berry's ansatz able to incorporate exactly the existence of bounda...
We present an improved version of Berry's ansatz able to incorporate exactly the existence of bounda...
We study chaotic eigenfunctions in wedge-shaped and rectangular regions using a generalization of Be...
We study a new statistics of wave functions in several chaotic and disordered systems: the random m...
The structure of wavefunctions strongly depends on the underlying classical dynamics. We illustrate...
In this work we shall test predictions of random wave models with microwave experiments. In wave or ...
We develop a statistical description of chaotic wave functions in closed systems obeying arbitrary b...
Abstract. We present new developments on the statistical properties of chaotic dynamical systems. We...
The existence of a formal analogy between quantum energy spectra and discrete time series has been r...
We derive a trace formula that expresses the level density of chaotic many-body systems as a smooth ...
Chaotic fluctuations of the order parameter in a coupled two-dimensional phase map model are numeric...
It might be anticipated that there is statistical universality in the long-time classical dynamics o...
I will explain how to use chaos decomposition technique to analyze the asymptotic behavior of geomet...
A key goal of quantum chaos is to establish a relationship between widely observed universal spectra...
We describe a novel approach for computing wave correlation functions inside finite spatial domains ...
We present an improved version of Berry's ansatz able to incorporate exactly the existence of bounda...
We present an improved version of Berry's ansatz able to incorporate exactly the existence of bounda...
We study chaotic eigenfunctions in wedge-shaped and rectangular regions using a generalization of Be...
We study a new statistics of wave functions in several chaotic and disordered systems: the random m...
The structure of wavefunctions strongly depends on the underlying classical dynamics. We illustrate...
In this work we shall test predictions of random wave models with microwave experiments. In wave or ...
We develop a statistical description of chaotic wave functions in closed systems obeying arbitrary b...
Abstract. We present new developments on the statistical properties of chaotic dynamical systems. We...
The existence of a formal analogy between quantum energy spectra and discrete time series has been r...
We derive a trace formula that expresses the level density of chaotic many-body systems as a smooth ...
Chaotic fluctuations of the order parameter in a coupled two-dimensional phase map model are numeric...
It might be anticipated that there is statistical universality in the long-time classical dynamics o...
I will explain how to use chaos decomposition technique to analyze the asymptotic behavior of geomet...
A key goal of quantum chaos is to establish a relationship between widely observed universal spectra...
We describe a novel approach for computing wave correlation functions inside finite spatial domains ...