Add to ORKGWe consider the quantum mechanical equivalence of the Seiberg-Witten map in the context of the Weyl-Wigner-Groenewold-Moyal phase-space formalism in order to construct a quantum mechanics over noncommutative Heisenberg algebras. The formalism is then applied to the exactly soluble Landau and harmonic oscillator problems in the 2-dimensional noncommutative phase-space plane, in order to derive their correct energy spectra and corresponding Wigner distributions. We compare our results with others that have previously appeared in the literature
We extend the three-dimensional noncommutative relations of the position and momentum operators to t...
A method for constructing all admissible unitary non-equivalent Wigner quasiprobability distribution...
In this paper we construct a path integral formulation of quantum mechanics on noncommutative phase-...
We address the phase space formulation of a noncommutative extension of quantum mechanics in arbitra...
Texto completo: acesso restrito. p. 1-12Symplectic unitary representations for the Galilei group are...
We are interested in the similarities and differences between the quantum-classical (Q-C) and the no...
While Wigner functions forming phase space representation of quantum states is a well-known fact, th...
We are interested in the similarities and differences between the quantum-classical (Q-C) and the no...
We are interested in the similarities and differences between the quantum-classical (Q-C) and the no...
An electron moving on plane in a uniform magnetic field orthogonal to plane is known as the Landau p...
The KLM conditions are conditions that are necessary and sufficient for a phase-space function to be...
It is pointed out that the classical phase space distribution in action-angle (a-a) variables obtain...
We first introduce the Wigner-Weyl-Moyal formalism for a theory whose phase-space is an arbitrary Li...
It is pointed out that the classical phase space distribution in action-angle (a-a) variables obtain...
The algebraic structure underlying the method of the Wigner distribution in quantum mechanics and th...
We extend the three-dimensional noncommutative relations of the position and momentum operators to t...
A method for constructing all admissible unitary non-equivalent Wigner quasiprobability distribution...
In this paper we construct a path integral formulation of quantum mechanics on noncommutative phase-...
We address the phase space formulation of a noncommutative extension of quantum mechanics in arbitra...
Texto completo: acesso restrito. p. 1-12Symplectic unitary representations for the Galilei group are...
We are interested in the similarities and differences between the quantum-classical (Q-C) and the no...
While Wigner functions forming phase space representation of quantum states is a well-known fact, th...
We are interested in the similarities and differences between the quantum-classical (Q-C) and the no...
We are interested in the similarities and differences between the quantum-classical (Q-C) and the no...
An electron moving on plane in a uniform magnetic field orthogonal to plane is known as the Landau p...
The KLM conditions are conditions that are necessary and sufficient for a phase-space function to be...
It is pointed out that the classical phase space distribution in action-angle (a-a) variables obtain...
We first introduce the Wigner-Weyl-Moyal formalism for a theory whose phase-space is an arbitrary Li...
It is pointed out that the classical phase space distribution in action-angle (a-a) variables obtain...
The algebraic structure underlying the method of the Wigner distribution in quantum mechanics and th...
We extend the three-dimensional noncommutative relations of the position and momentum operators to t...
A method for constructing all admissible unitary non-equivalent Wigner quasiprobability distribution...
In this paper we construct a path integral formulation of quantum mechanics on noncommutative phase-...