In this paper, a quantity that describes a response of a system’s eigenstates to a very small perturbation of physical relevance is studied as a measure for characterizing crossover from integrable to chaotic quantum systems. It is computed from the distribution of very small, rescaled components of perturbed eigenfunctions on the unperturbed basis. Physically, it gives a relative measure to prohibition of level transitions induced by the perturbation. Making use of this measure, numerical simulations in the so-called Lipkin-Meshkov-Glick model show in a clear way that the whole integrability-chaos transition region is divided into three subregions: a nearly integrable regime, a nearly chaotic regime, and a crossover regime
In many-body and other systems, the physics situation often allows one to interpret certain, distinc...
We test the prediction that quantum systems with chaotic classical analogs have spectral fluctuation...
Akemann G, Burda Z, Kieburg M. From integrable to chaotic systems: Universal local statistics of Lya...
In this paper, a quantity that describes a response of a system’s eigenstates to a very small pertur...
We study models of interacting fermions in one dimension to investigate the crossover from integrabi...
In the present paper the classical counterpart of the quantum avoided crossing method for detecting ...
The structure of wavefunctions of quantum systems strongly depends on the underlying classical dynam...
International audienceA quantity related to the elastic enhancement in nuclear reactions is introduc...
We review the fundamental concepts of quantum chaos in Hamiltonian systems. The quantum evolution of...
Quantum chaos is associated with the phenomenon of avoided level crossings on a large scale which le...
We introduce a quantitative measure of reversibility of quantum dynamics of classically chaotic syst...
Lecture notes for the Spring School "From quantum to classical" (CIRM, April 2019)Given a quantum Ha...
Although a closed quantum system lacks clear signatures of classical chaos, it has been shown numeri...
Integrable quantum systems of finite size are generically robust against weak enough integrability-b...
Quantum perturbation theory is used to examine the eigenvalues of a nonseparable Hamiltonian system ...
In many-body and other systems, the physics situation often allows one to interpret certain, distinc...
We test the prediction that quantum systems with chaotic classical analogs have spectral fluctuation...
Akemann G, Burda Z, Kieburg M. From integrable to chaotic systems: Universal local statistics of Lya...
In this paper, a quantity that describes a response of a system’s eigenstates to a very small pertur...
We study models of interacting fermions in one dimension to investigate the crossover from integrabi...
In the present paper the classical counterpart of the quantum avoided crossing method for detecting ...
The structure of wavefunctions of quantum systems strongly depends on the underlying classical dynam...
International audienceA quantity related to the elastic enhancement in nuclear reactions is introduc...
We review the fundamental concepts of quantum chaos in Hamiltonian systems. The quantum evolution of...
Quantum chaos is associated with the phenomenon of avoided level crossings on a large scale which le...
We introduce a quantitative measure of reversibility of quantum dynamics of classically chaotic syst...
Lecture notes for the Spring School "From quantum to classical" (CIRM, April 2019)Given a quantum Ha...
Although a closed quantum system lacks clear signatures of classical chaos, it has been shown numeri...
Integrable quantum systems of finite size are generically robust against weak enough integrability-b...
Quantum perturbation theory is used to examine the eigenvalues of a nonseparable Hamiltonian system ...
In many-body and other systems, the physics situation often allows one to interpret certain, distinc...
We test the prediction that quantum systems with chaotic classical analogs have spectral fluctuation...
Akemann G, Burda Z, Kieburg M. From integrable to chaotic systems: Universal local statistics of Lya...