Add to ORKGFor a general Hamiltonian appropriate to a single canonical degree of freedom, a universal propagator with the property that it correctly evolves the coherent-state Hilbert space representatives for an arbitrary fiducial vector is characterized and defined. The universal propagator is explicitly constructed for the harmonic oscillator, with a result that differs from the conventional propagators for this system
In this second of a series of articles, a pair of quantized free oscillators is transformed into a r...
In this work, we derived a semiclassical approximation for the matrix elements of a quantum propagat...
The dynamical evolution is described within the phase-space formalism by means of the Moyal propaga...
In earlier work universal propagators were introduced for the Heisenberg -Weyl group, the affine gro...
We construct a representation of the coherent state path integral using the Weyl symbol of the Hamil...
Coherent states for a family of isospectral oscillator Hamiltonians are derived from a suitable choi...
In the probability representation of quantum mechanics, quantum states are represented by a classica...
Coherent states possess a regularized path integral and gives a natural relation between classical v...
A finite dimensional system with a quadratic Hamiltonian constraint is Dirac quantized in holomorphi...
The main properties of standard quantum mechanical coherent states and the two generalizations of Kl...
I consider the time evolution of generalized coherent states based on non-standard fiducial vectors,...
We study special systems with infinitely many degrees of freedom with regard to dynamical evolution ...
The construction of oscillator-like systems connected with the given set of orthogonal polynomials a...
AbstractThe Weyl correspondence that associates a quantum-mechanical operator to a Hamiltonian funct...
A unitary operator which relates the system of a particle in a linear potential with time-dependent ...
In this second of a series of articles, a pair of quantized free oscillators is transformed into a r...
In this work, we derived a semiclassical approximation for the matrix elements of a quantum propagat...
The dynamical evolution is described within the phase-space formalism by means of the Moyal propaga...
In earlier work universal propagators were introduced for the Heisenberg -Weyl group, the affine gro...
We construct a representation of the coherent state path integral using the Weyl symbol of the Hamil...
Coherent states for a family of isospectral oscillator Hamiltonians are derived from a suitable choi...
In the probability representation of quantum mechanics, quantum states are represented by a classica...
Coherent states possess a regularized path integral and gives a natural relation between classical v...
A finite dimensional system with a quadratic Hamiltonian constraint is Dirac quantized in holomorphi...
The main properties of standard quantum mechanical coherent states and the two generalizations of Kl...
I consider the time evolution of generalized coherent states based on non-standard fiducial vectors,...
We study special systems with infinitely many degrees of freedom with regard to dynamical evolution ...
The construction of oscillator-like systems connected with the given set of orthogonal polynomials a...
AbstractThe Weyl correspondence that associates a quantum-mechanical operator to a Hamiltonian funct...
A unitary operator which relates the system of a particle in a linear potential with time-dependent ...
In this second of a series of articles, a pair of quantized free oscillators is transformed into a r...
In this work, we derived a semiclassical approximation for the matrix elements of a quantum propagat...
The dynamical evolution is described within the phase-space formalism by means of the Moyal propaga...