In many-body and other systems, the physics situation often allows one to interpret certain, distinct states by means of a simple picture. In this interpretation, the distinct states are not eigenstates of the full Hamiltonian. Hence, there is an interaction that makes the distinct states act as doorways into background states which are modeled statistically. The crucial quantities are the overlaps between the eigenstates of the full Hamiltonian and the doorway states, that is, the coupling coefficients occurring in the expansion of true eigenstates in the simple model basis. Recently, the distribution of the maximum coupling coefficients was introduced as a new, highly sensitive statistical observable. In the particularly important regime ...
Quantum systems with discrete symmetries can usually be desymmetrized, but this strategy fails when ...
The distortion of the regular motion in a quantum system by its coupling to the continuum of decay c...
The random-matrix-theory approach to the avoided-crossings probability distribution for quantum chao...
In a unifying way, the doorway mechanism explains spectral properties in a rich variety of open meso...
In a unifying way, the doorway mechanism explains spectral properties in a rich variety of open meso...
By coupling a doorway state to a see of random background states, we develop the theory of doorway s...
The doorway-mediated mechanism for dynamical processes represents the first step beyond statistical ...
We calculate the survival probability of a special state which couples randomly to a regular or chao...
Scattering on a resonance state coupled to a complicated background is a typical problem for mesosco...
We employ the random matrix theory (RMT) framework to revisit the distribution of resonance widths i...
To model a complex system intrinsically separated by a barrier, we use two random Hamiltonians, coup...
The level and width statistics of the two kinds of the random matrix models coupled to the continuum...
The statistical properties of interacting strongly chaotic systems are investigated for varying inte...
In this paper, a quantity that describes a response of a system’s eigenstates to a very small pertur...
Statistical properties of cross sections are studied for an open system of interacting fermions. The...
Quantum systems with discrete symmetries can usually be desymmetrized, but this strategy fails when ...
The distortion of the regular motion in a quantum system by its coupling to the continuum of decay c...
The random-matrix-theory approach to the avoided-crossings probability distribution for quantum chao...
In a unifying way, the doorway mechanism explains spectral properties in a rich variety of open meso...
In a unifying way, the doorway mechanism explains spectral properties in a rich variety of open meso...
By coupling a doorway state to a see of random background states, we develop the theory of doorway s...
The doorway-mediated mechanism for dynamical processes represents the first step beyond statistical ...
We calculate the survival probability of a special state which couples randomly to a regular or chao...
Scattering on a resonance state coupled to a complicated background is a typical problem for mesosco...
We employ the random matrix theory (RMT) framework to revisit the distribution of resonance widths i...
To model a complex system intrinsically separated by a barrier, we use two random Hamiltonians, coup...
The level and width statistics of the two kinds of the random matrix models coupled to the continuum...
The statistical properties of interacting strongly chaotic systems are investigated for varying inte...
In this paper, a quantity that describes a response of a system’s eigenstates to a very small pertur...
Statistical properties of cross sections are studied for an open system of interacting fermions. The...
Quantum systems with discrete symmetries can usually be desymmetrized, but this strategy fails when ...
The distortion of the regular motion in a quantum system by its coupling to the continuum of decay c...
The random-matrix-theory approach to the avoided-crossings probability distribution for quantum chao...