Add to ORKGWe advance the notion of a classical density matrix, as a classical analogue of the quantum mechanical statistical operator, and investigate its main properties. In the case of composite systems a partial trace-like operation performed upon the global classical density matrix leads to a marginal density matrix describing a subsystem. In the case of dynamically independent subsystems (that is, non-interacting subsystems) this marginal density matrix evolves locally, its behavior being completely determined by the local phase-space flow associated with the subsystem under consideration. However, and in contrast with the case of ordinary marginal probability densities, the marginal classical density matrix contains information concerning the s...
We obtain a classical analog of the quantum covariance matrix by performing its classical approximat...
While in relativity theory space evolves over time into a single entity known as spacetime, quantum ...
We first introduce and discuss density operator interpretations of quantum theory as a special case ...
We advance the notion of a classical density matrix, as a classical analogue of the quantum mechanic...
In this paper, a reference to the semiclassical model, in which quantum degrees of freedom interact ...
Physical systems that dissipate, mix and develop turbulence also irreversibly transport statistical ...
The statistical mechanics of systems whose evolution is governed by mixed quantum-classical dynamics...
In a previous paper, a statistical method of constructing quantum models of classical properties has...
Abstract It is well known that density matrices can be used in quantum mechanics to represent the in...
It is a popular idea that a multi-partite quantum system represented by a density matrix having no p...
We define and explore the classical counterpart of entanglement in complete analogy with quantum mec...
In this paper, a reference to the semiclassical model, in which quantum degrees of freedom interact ...
A motivation is given for expressing classical mechanics in terms of diagonal projection matrices an...
This work presents a comparison of Quantum and Statistical Mechanics at Planck scale. The statistica...
We obtain a classical analog of the quantum covariance matrix by performing its classical approximat...
We obtain a classical analog of the quantum covariance matrix by performing its classical approximat...
While in relativity theory space evolves over time into a single entity known as spacetime, quantum ...
We first introduce and discuss density operator interpretations of quantum theory as a special case ...
We advance the notion of a classical density matrix, as a classical analogue of the quantum mechanic...
In this paper, a reference to the semiclassical model, in which quantum degrees of freedom interact ...
Physical systems that dissipate, mix and develop turbulence also irreversibly transport statistical ...
The statistical mechanics of systems whose evolution is governed by mixed quantum-classical dynamics...
In a previous paper, a statistical method of constructing quantum models of classical properties has...
Abstract It is well known that density matrices can be used in quantum mechanics to represent the in...
It is a popular idea that a multi-partite quantum system represented by a density matrix having no p...
We define and explore the classical counterpart of entanglement in complete analogy with quantum mec...
In this paper, a reference to the semiclassical model, in which quantum degrees of freedom interact ...
A motivation is given for expressing classical mechanics in terms of diagonal projection matrices an...
This work presents a comparison of Quantum and Statistical Mechanics at Planck scale. The statistica...
We obtain a classical analog of the quantum covariance matrix by performing its classical approximat...
We obtain a classical analog of the quantum covariance matrix by performing its classical approximat...
While in relativity theory space evolves over time into a single entity known as spacetime, quantum ...
We first introduce and discuss density operator interpretations of quantum theory as a special case ...