We analyze the behavior of quantum dynamical entropies production from sequences of quantum approximants approaching their (chaotic) classical limit. The model of the quantized hyperbolic automorphisms of the 2-torus is examined in detail and a semi-classical analysis is performed on it using coherent states, fulfilling an appropriate dynamical localization property. Correspondence between quantum dynamical entropies and the Kolmogorov-Sinai invariant is found only over timescales that are logarithmic in the quantization parameter
We revisit the notion of Kolmogorov-Sinai entropy for classical dynamical systems in terms of an alg...
We study the dynamical generation of entanglement for a two-body interacting system, starting from a...
Classical dynamical entropy is an important tool to analyse the efficiency of information transmissi...
Two non-commutative dynamical entropies are studied in connection with the classical limit. For syst...
The algebraic and the canonical approaches to the quantization of a class of classical symplectic dy...
The canonical quantization of any hyperbolic symplectomorphism $A$ of the 2-torus (in particular, o...
A quantum dynamical system, mimicking the classical phase doubling map $z ↦ z^2$ on the unit circle,...
Classical dynamical entropy is an important tool to analyse the efficiency of information transmissi...
We discuss the stochastic properties of the quantum version of a classical hyperbolic dynamical syst...
We define a new quantum dynamical entropy for a C*-algebra automorphism with an invariant state (and...
We discuss two mathematical problems arising in classical and quantum dynamics: the existence of wea...
We introduce a new characteristics of chaoticity of classical and quantum dynamical systems...
The quantum states of a dynamical system whose phase space is the two-torus are periodic up to phase...
In Quantum chaos we study the connection between classical chaotic systems and their quantum counter...
In this paper, a reference to the semiclassical model, in which quantum degrees of freedom interact ...
We revisit the notion of Kolmogorov-Sinai entropy for classical dynamical systems in terms of an alg...
We study the dynamical generation of entanglement for a two-body interacting system, starting from a...
Classical dynamical entropy is an important tool to analyse the efficiency of information transmissi...
Two non-commutative dynamical entropies are studied in connection with the classical limit. For syst...
The algebraic and the canonical approaches to the quantization of a class of classical symplectic dy...
The canonical quantization of any hyperbolic symplectomorphism $A$ of the 2-torus (in particular, o...
A quantum dynamical system, mimicking the classical phase doubling map $z ↦ z^2$ on the unit circle,...
Classical dynamical entropy is an important tool to analyse the efficiency of information transmissi...
We discuss the stochastic properties of the quantum version of a classical hyperbolic dynamical syst...
We define a new quantum dynamical entropy for a C*-algebra automorphism with an invariant state (and...
We discuss two mathematical problems arising in classical and quantum dynamics: the existence of wea...
We introduce a new characteristics of chaoticity of classical and quantum dynamical systems...
The quantum states of a dynamical system whose phase space is the two-torus are periodic up to phase...
In Quantum chaos we study the connection between classical chaotic systems and their quantum counter...
In this paper, a reference to the semiclassical model, in which quantum degrees of freedom interact ...
We revisit the notion of Kolmogorov-Sinai entropy for classical dynamical systems in terms of an alg...
We study the dynamical generation of entanglement for a two-body interacting system, starting from a...
Classical dynamical entropy is an important tool to analyse the efficiency of information transmissi...