The exact solution of the classical torus automorphism, which partial case is Arnold Cat map is obtained and compared with the numerical solution. The torus, considered as the classical phase space admits the quantization in terms of the Weyl pair. The remarkable fact is that quantum map, as the evolution with respect to the discrete time, preserves the Weyl commutation relation. We have obtained also the operator solution of this quantum torus automorphism. © 2001 Elsevier Science Ltd.SCOPUS: cp.jinfo:eu-repo/semantics/publishe
Using the Bargmann-Husimi representation of quantum mechanics on a toroidal phase space, we study an...
We develop a new approach to the representation theory of quantum algebras supporting a torus action...
Abstract: We prove that, for the moduli space of flatSU(2)-connections on the 2-dimen-sional torus, ...
The Weyl quantization of classical observables on the torus (as phase space) without regularity assu...
The quantum states of a dynamical system whose phase space is the two-torus are periodic up to phase...
The algebraic and the canonical approaches to the quantization of a class of classical symplectic dy...
We discuss the stochastic properties of the quantum version of a classical hyperbolic dynamical syst...
The canonical quantization of any hyperbolic symplectomorphism $A$ of the 2-torus (in particular, o...
Abstract: We consider the quantized hyperbolic automorphisms on the 2-dimensional torus (or generali...
The problems encountered in trying to quantize the various cosmological models, are brought forward ...
Cat maps, linear automorphisms of the torus, are standard examples of classically chaotic systems, b...
We introduce Riemann-Hilbert problems determined by refined Donaldson-Thomas theory. They involve pi...
We analyze the behavior of quantum dynamical entropies production from sequences of quantum approxim...
In the setting of geometric quantization, we associate to any prequantum bundle automorphism a unita...
The implementation of modular invariance on the torus as a phase space at the quantum level is discu...
Using the Bargmann-Husimi representation of quantum mechanics on a toroidal phase space, we study an...
We develop a new approach to the representation theory of quantum algebras supporting a torus action...
Abstract: We prove that, for the moduli space of flatSU(2)-connections on the 2-dimen-sional torus, ...
The Weyl quantization of classical observables on the torus (as phase space) without regularity assu...
The quantum states of a dynamical system whose phase space is the two-torus are periodic up to phase...
The algebraic and the canonical approaches to the quantization of a class of classical symplectic dy...
We discuss the stochastic properties of the quantum version of a classical hyperbolic dynamical syst...
The canonical quantization of any hyperbolic symplectomorphism $A$ of the 2-torus (in particular, o...
Abstract: We consider the quantized hyperbolic automorphisms on the 2-dimensional torus (or generali...
The problems encountered in trying to quantize the various cosmological models, are brought forward ...
Cat maps, linear automorphisms of the torus, are standard examples of classically chaotic systems, b...
We introduce Riemann-Hilbert problems determined by refined Donaldson-Thomas theory. They involve pi...
We analyze the behavior of quantum dynamical entropies production from sequences of quantum approxim...
In the setting of geometric quantization, we associate to any prequantum bundle automorphism a unita...
The implementation of modular invariance on the torus as a phase space at the quantum level is discu...
Using the Bargmann-Husimi representation of quantum mechanics on a toroidal phase space, we study an...
We develop a new approach to the representation theory of quantum algebras supporting a torus action...
Abstract: We prove that, for the moduli space of flatSU(2)-connections on the 2-dimen-sional torus, ...