Power-law random banded unitary matrices (PRBUM), whose matrix elements decay in a power-law fashion, were recently proposed to model the critical statistics of the Floquet eigenstates of periodically driven quantum systems. In this work, we numerically study in detail the statistical properties of PRBUM ensembles in the delocalization-localization transition regime. In particular, implications of the delocalization-localization transition for the fractal dimension of the eigenvectors, for the distribution function of the eigenvector components, and for the nearest neighbor spacing statistics of the eigenphases are examined. On the one hand, our results further indicate t...
Symmetries associated with complex conjugation and Hermitian conjugation, such as time-reversal symm...
The paper is devoted to the rigorous proof of the universality conjecture of the random matrix theor...
In this thesis we investigate the intersection of the three fields of random matrix theory, quantum ...
Abstract. We obtain the asymptotic behaviour of the nearest-neighbour level spacing distribution for...
Abstract. We investigate the localization properties of the eigenvectors of a banded random matrix e...
We present a random matrix theory for systems invariant under the joint action of parity, P, and tim...
In this thesis we begin by presenting an introduction on random matrices, their different classes an...
We study the statistics of the local resolvent and non-ergodic properties of eigenvectors for a gene...
International audienceWe explore the connections between dissipative quantum phase transitions and n...
Abstract. We study a model of complex band random matrices capable of describing the transitions bet...
We study the ensemble of complex symmetric matrices. The ensemble is useful in the study of the effe...
Phenomena in quantum chaotic systems such as spectral fluctuations are known to be described remark...
The Poisson/Gaudin--Mehta conjecture, a major open problem in random matrix theory, states that in t...
We consider N×N Hermitian random matrices with i.i.d. entries. The matrix is normalized so that the ...
Extremal spacings between eigenphases of random unitary matrices of size N pertaining to circular en...
Symmetries associated with complex conjugation and Hermitian conjugation, such as time-reversal symm...
The paper is devoted to the rigorous proof of the universality conjecture of the random matrix theor...
In this thesis we investigate the intersection of the three fields of random matrix theory, quantum ...
Abstract. We obtain the asymptotic behaviour of the nearest-neighbour level spacing distribution for...
Abstract. We investigate the localization properties of the eigenvectors of a banded random matrix e...
We present a random matrix theory for systems invariant under the joint action of parity, P, and tim...
In this thesis we begin by presenting an introduction on random matrices, their different classes an...
We study the statistics of the local resolvent and non-ergodic properties of eigenvectors for a gene...
International audienceWe explore the connections between dissipative quantum phase transitions and n...
Abstract. We study a model of complex band random matrices capable of describing the transitions bet...
We study the ensemble of complex symmetric matrices. The ensemble is useful in the study of the effe...
Phenomena in quantum chaotic systems such as spectral fluctuations are known to be described remark...
The Poisson/Gaudin--Mehta conjecture, a major open problem in random matrix theory, states that in t...
We consider N×N Hermitian random matrices with i.i.d. entries. The matrix is normalized so that the ...
Extremal spacings between eigenphases of random unitary matrices of size N pertaining to circular en...
Symmetries associated with complex conjugation and Hermitian conjugation, such as time-reversal symm...
The paper is devoted to the rigorous proof of the universality conjecture of the random matrix theor...
In this thesis we investigate the intersection of the three fields of random matrix theory, quantum ...