Add to ORKGThis paper considers states on the Weyl algebra of the canonical commutation relations over the phase space R^{2n}. We show that a state is regular iff its classical limit is a countably additive Borel probability measure on R^{2n}. It follows that one can "reduce" the state space of the Weyl algebra by altering the collection of quantum mechanical observables so that all states are ones whose classical limit is physical
I review the formalism of classical extensions of quantum mechanics introduced by Beltrametti and Bu...
In this paper we argue that the emergence of the classical world from the underlying quantum reality...
In quantum field theory, the generating functional is the functional Fourier transform of e^iS, with...
This paper considers states on the Weyl algebra of the canonical commutation relations over the phas...
We point out a correspondence between classical and quantum states, by showing that for every classi...
We discuss the descriptions of states of physical systems in classical and quantum mechanics. We sho...
The classical-statistical limit of quantum mechanics is studied. It is proved that the limit $\hbar ...
A formalism is developed for describing approximate classical behaviour in finite (but possibly larg...
De Finetti theorems tell us that if we expect the likelihood of outcomes to be independent of their ...
For a wide set of quantum systems it is demonstrated that the quantum regime can be considered as th...
On the basis of a suggestive definition of a classical extension of quantum mechanics in terms of st...
We argue against claims that the classical ℏ→0 limit is "singular" in a way that frustrates an elimi...
In this paper the generalized quantum states, i.e. positive and normalized linear functionals on $C^...
We provide a novel perspective on "regularity" as a property of representations of the Weyl algebra....
In classical coding, a single quantum state is encoded into classical information. Decoding this cla...
I review the formalism of classical extensions of quantum mechanics introduced by Beltrametti and Bu...
In this paper we argue that the emergence of the classical world from the underlying quantum reality...
In quantum field theory, the generating functional is the functional Fourier transform of e^iS, with...
This paper considers states on the Weyl algebra of the canonical commutation relations over the phas...
We point out a correspondence between classical and quantum states, by showing that for every classi...
We discuss the descriptions of states of physical systems in classical and quantum mechanics. We sho...
The classical-statistical limit of quantum mechanics is studied. It is proved that the limit $\hbar ...
A formalism is developed for describing approximate classical behaviour in finite (but possibly larg...
De Finetti theorems tell us that if we expect the likelihood of outcomes to be independent of their ...
For a wide set of quantum systems it is demonstrated that the quantum regime can be considered as th...
On the basis of a suggestive definition of a classical extension of quantum mechanics in terms of st...
We argue against claims that the classical ℏ→0 limit is "singular" in a way that frustrates an elimi...
In this paper the generalized quantum states, i.e. positive and normalized linear functionals on $C^...
We provide a novel perspective on "regularity" as a property of representations of the Weyl algebra....
In classical coding, a single quantum state is encoded into classical information. Decoding this cla...
I review the formalism of classical extensions of quantum mechanics introduced by Beltrametti and Bu...
In this paper we argue that the emergence of the classical world from the underlying quantum reality...
In quantum field theory, the generating functional is the functional Fourier transform of e^iS, with...