We show that a special entropic quantifier, called the statistical complexity, becomes maximal at the transition between super-Poisson and sub-Poisson regimes. This acquires important connotations given the fact that these regimes are usually associated with, respectively, classical and quantum processes
We study the dynamical generation of entanglement for a two-body interacting system, starting from a...
We propose a phase-space Wigner harmonics entropy measure for many-body quantum dynamical complexity...
We propose a phase-space Wigner harmonics entropy measure for many-body quantum dynamical complexity...
We show that a special entropic quantifier, called the statistical complexity, becomes maximal at th...
We show that a special entropic quantifier, called the statistical complexity, becomes maximal at th...
We show that a special entropic quantifier, called the statistical complexity, becomes maximal at th...
We show that a special entropic quantifier, called the statistical complexity, becomes maximal at th...
We investigate the classical limit of the dynamics of a semiclassical system that represents the int...
We investigate the classical limit of the dynamics of a semiclassical system that represents the int...
We investigate the classical limit of the dynamics of a semiclassical system that represents the int...
By recourse to the concept of Statistical Complexity we study here the classical-quantum transition ...
We introduce a quantum version for the statistical complexity measure, in the context of quantum inf...
We study the quantum-to-classical transition in a chaotic system surrounded by a diffusive environme...
We propose a phase-space Wigner harmonics entropy measure for many-body quantum dynamical complexity...
We propose a phase-space Wigner harmonics entropy measure for many-body quantum dynamical complexity...
We study the dynamical generation of entanglement for a two-body interacting system, starting from a...
We propose a phase-space Wigner harmonics entropy measure for many-body quantum dynamical complexity...
We propose a phase-space Wigner harmonics entropy measure for many-body quantum dynamical complexity...
We show that a special entropic quantifier, called the statistical complexity, becomes maximal at th...
We show that a special entropic quantifier, called the statistical complexity, becomes maximal at th...
We show that a special entropic quantifier, called the statistical complexity, becomes maximal at th...
We show that a special entropic quantifier, called the statistical complexity, becomes maximal at th...
We investigate the classical limit of the dynamics of a semiclassical system that represents the int...
We investigate the classical limit of the dynamics of a semiclassical system that represents the int...
We investigate the classical limit of the dynamics of a semiclassical system that represents the int...
By recourse to the concept of Statistical Complexity we study here the classical-quantum transition ...
We introduce a quantum version for the statistical complexity measure, in the context of quantum inf...
We study the quantum-to-classical transition in a chaotic system surrounded by a diffusive environme...
We propose a phase-space Wigner harmonics entropy measure for many-body quantum dynamical complexity...
We propose a phase-space Wigner harmonics entropy measure for many-body quantum dynamical complexity...
We study the dynamical generation of entanglement for a two-body interacting system, starting from a...
We propose a phase-space Wigner harmonics entropy measure for many-body quantum dynamical complexity...
We propose a phase-space Wigner harmonics entropy measure for many-body quantum dynamical complexity...
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