We consider m spinless Bosons distributed over l degenerate single-particle states and interacting through a k-body random interaction with Gaussian probability distribution (the Bosonic embedded k-body ensembles). We address the cases of orthogonal and unitary symmetry in the limit of infinite matrix dimension, attained either as l goes against infiniti or as m goes adainst infiniti. We derive an eigenvalue expansion for the second moment of the many-body matrix elements of these ensembles. Using properties of this expansion, the supersymmetry technique, and the binary correlation method, we show that in the limit l goes against infiniti the ensembles have nearly the same spectral properties as the corresponding Fermionic embedded ensemble...
We numerically study the level statistics of the Gaussian β ensemble. These statistics generalize Wi...
A key goal of quantum chaos is to establish a relationship between widely observed universal spectra...
We investigate spectral statistics in spatially extended, chaotic many-body quantum systems with a c...
We consider m spinless Bosons distributed over l degenerate single-particle states and interacting t...
We consider m spinless Bosons distributed over I degenerate single-particle states and interacting t...
The k-body embedded ensembles of random matrices originally defined by Mon and French are investigat...
We investigate the shape of the spectrum and the spectral fluctuations of the k-body embedded Gauss...
The embedded ensembles were introduced by Mon and French (1975 Ann. Phys., NY 95 90) as physically m...
We extend the recent study of the k-body embedded Gaussian ensembles by L. Benet, T. Rupp. and H. A....
We extend the recent study of the k-body embedded Gaussian ensembles by L. Benet, T. Rupp, and H. A....
Embedded ensembles or random matrix ensembles generated by k-body interactions acting in many-partic...
We study the nearest-neighbor distributions of the k-body embedded ensembles of random matrices for ...
In this thesis we begin by presenting an introduction on random matrices, their different classes an...
We study eigenvectors in the deformed Gaussian unitary ensemble of random matrices $H=W\tilde{H}W$, ...
It has been recently shown numerically that the transition from integrability to chaos in quantum sy...
We numerically study the level statistics of the Gaussian β ensemble. These statistics generalize Wi...
A key goal of quantum chaos is to establish a relationship between widely observed universal spectra...
We investigate spectral statistics in spatially extended, chaotic many-body quantum systems with a c...
We consider m spinless Bosons distributed over l degenerate single-particle states and interacting t...
We consider m spinless Bosons distributed over I degenerate single-particle states and interacting t...
The k-body embedded ensembles of random matrices originally defined by Mon and French are investigat...
We investigate the shape of the spectrum and the spectral fluctuations of the k-body embedded Gauss...
The embedded ensembles were introduced by Mon and French (1975 Ann. Phys., NY 95 90) as physically m...
We extend the recent study of the k-body embedded Gaussian ensembles by L. Benet, T. Rupp. and H. A....
We extend the recent study of the k-body embedded Gaussian ensembles by L. Benet, T. Rupp, and H. A....
Embedded ensembles or random matrix ensembles generated by k-body interactions acting in many-partic...
We study the nearest-neighbor distributions of the k-body embedded ensembles of random matrices for ...
In this thesis we begin by presenting an introduction on random matrices, their different classes an...
We study eigenvectors in the deformed Gaussian unitary ensemble of random matrices $H=W\tilde{H}W$, ...
It has been recently shown numerically that the transition from integrability to chaos in quantum sy...
We numerically study the level statistics of the Gaussian β ensemble. These statistics generalize Wi...
A key goal of quantum chaos is to establish a relationship between widely observed universal spectra...
We investigate spectral statistics in spatially extended, chaotic many-body quantum systems with a c...