We present a unified framework for the quantization of a family of discrete dynamical systems of varying degrees of ``chaoticity". The systems to be quantized are piecewise affine maps on the two-torus, viewed as phase space, and include the automorphisms, translations and skew translations. We then treat some discontinuous transformations such as the Baker map and the sawtooth-like maps. Our approach extends some ideas from geometric quantization and it is both conceptually and calculationally simple
In a previous paper we introduced examples of Hamiltonian mappings with phase space structures resem...
En Chaos quantique, nous étudions la connexion entre les systèmes chaotiques classiques et leurs hom...
For Hamiltonian systems with two degrees of freedom, quantum invariants as constructed via time aver...
The algebraic and the canonical approaches to the quantization of a class of classical symplectic dy...
A fully geometric procedure of quantization that utilizes a natural and necessary metric on phase sp...
International audienceFor general quantum systems the semiclassical behaviour of eigenfunctions in r...
grantor: University of TorontoA theory of quantization is given, for a model with symmetry...
The exact solution of the classical torus automorphism, which partial case is Arnold Cat map is obta...
The aim of this work is to study classically chaotic quantum systems. We restrict ourselves to one-d...
The problem of quantizing a symplectic manifold (M,ω) can be formulated in terms of the A-model of a...
AbstractThis paper has two themes that are intertwined. The first is the dynamics of certain piecewi...
The problem of computing any-order expectations of trajectories generated by discrete-time one-dimen...
Geometric quantization is a natural way to construct quantum models starting from classical data. In...
Abstract: For general quantum systems the semiclassical behaviour of eigenfunctions in relation to t...
We construct explicitly the quantization of classical linear maps of SL(2,{\Bbb R}) on toroidal phas...
In a previous paper we introduced examples of Hamiltonian mappings with phase space structures resem...
En Chaos quantique, nous étudions la connexion entre les systèmes chaotiques classiques et leurs hom...
For Hamiltonian systems with two degrees of freedom, quantum invariants as constructed via time aver...
The algebraic and the canonical approaches to the quantization of a class of classical symplectic dy...
A fully geometric procedure of quantization that utilizes a natural and necessary metric on phase sp...
International audienceFor general quantum systems the semiclassical behaviour of eigenfunctions in r...
grantor: University of TorontoA theory of quantization is given, for a model with symmetry...
The exact solution of the classical torus automorphism, which partial case is Arnold Cat map is obta...
The aim of this work is to study classically chaotic quantum systems. We restrict ourselves to one-d...
The problem of quantizing a symplectic manifold (M,ω) can be formulated in terms of the A-model of a...
AbstractThis paper has two themes that are intertwined. The first is the dynamics of certain piecewi...
The problem of computing any-order expectations of trajectories generated by discrete-time one-dimen...
Geometric quantization is a natural way to construct quantum models starting from classical data. In...
Abstract: For general quantum systems the semiclassical behaviour of eigenfunctions in relation to t...
We construct explicitly the quantization of classical linear maps of SL(2,{\Bbb R}) on toroidal phas...
In a previous paper we introduced examples of Hamiltonian mappings with phase space structures resem...
En Chaos quantique, nous étudions la connexion entre les systèmes chaotiques classiques et leurs hom...
For Hamiltonian systems with two degrees of freedom, quantum invariants as constructed via time aver...