Add to ORKGDecoherent histories approach to quantum mechanics assigns probabilities to events that are not restricted to a single moment of time, provided that the decoherence condition holds for the set of events. The condition is however hardly satisfied in general, which has been considered to limit the usefulness of the histories approach. The present paper applies the histories approach to the tunneling time problem to show that, although the decoherence condition does not hold, the histories approach is still useful in predicting the central tendency and the dispersion of resident times. We consider such quantities that would become the average and the standard deviation of resident times if the decoherence condition held. Since the cond...
We study the tunneling through an oscillating delta barrier. Using time periodicity of the model, th...
The predictions of the Bohmian and the decoherent (or consistent) histories formulations of the quan...
We show the equivalence of the functions $G_{\rm p}(t)$ and $|\Psi(d,t)|^2$ for the ``passage time''...
We consider a number of aspects of the problem of defining time observables in quantum theory. Time ...
We consider a number of aspects of the problem of defining time observables in quantum theory. Time ...
Restricted Access. An open-access version is available at arXiv.org (one of the alternative location...
In this paper we study the construction of probability densities for time-of-flight in quantum mecha...
We show the equivalence of the functions G(p)(t) and \Psi(d,t)\(2) for the "passage time" in tunneli...
The decoherent histories approach is a particularly useful approach to quantum theory especially whe...
Abstract This work proposes a series of quantum experiments that can, at least in principle, allow f...
The theory of decoherent histories is checked for the requirement of statistical independence of sub...
International audienceThis paper relates both to the metaphysics of probability and to the physics o...
The decoherent (consistent) histories formalism has been proposed as a means of eliminating measurem...
We investigate the possibility of assigning consistent probabilities to sets of histories characteri...
This paper relates both to the metaphysics of probability and to the physics of time asymmetry. Usin...
We study the tunneling through an oscillating delta barrier. Using time periodicity of the model, th...
The predictions of the Bohmian and the decoherent (or consistent) histories formulations of the quan...
We show the equivalence of the functions $G_{\rm p}(t)$ and $|\Psi(d,t)|^2$ for the ``passage time''...
We consider a number of aspects of the problem of defining time observables in quantum theory. Time ...
We consider a number of aspects of the problem of defining time observables in quantum theory. Time ...
Restricted Access. An open-access version is available at arXiv.org (one of the alternative location...
In this paper we study the construction of probability densities for time-of-flight in quantum mecha...
We show the equivalence of the functions G(p)(t) and \Psi(d,t)\(2) for the "passage time" in tunneli...
The decoherent histories approach is a particularly useful approach to quantum theory especially whe...
Abstract This work proposes a series of quantum experiments that can, at least in principle, allow f...
The theory of decoherent histories is checked for the requirement of statistical independence of sub...
International audienceThis paper relates both to the metaphysics of probability and to the physics o...
The decoherent (consistent) histories formalism has been proposed as a means of eliminating measurem...
We investigate the possibility of assigning consistent probabilities to sets of histories characteri...
This paper relates both to the metaphysics of probability and to the physics of time asymmetry. Usin...
We study the tunneling through an oscillating delta barrier. Using time periodicity of the model, th...
The predictions of the Bohmian and the decoherent (or consistent) histories formulations of the quan...
We show the equivalence of the functions $G_{\rm p}(t)$ and $|\Psi(d,t)|^2$ for the ``passage time''...