Understanding the demarcation line between classical and quantum is an important issue in modern physics. The development of such an understanding requires a clear picture of the various concurrent notions of `classicality' in quantum theory presently in use. Here, we focus on the relationship between Kolmogorov consistency of measurement statistics -- the foundational footing of classical stochastic processes in standard probability theory -- and the commutativity (or absence thereof) of measurement operators -- a concept at the core of quantum theory. Kolmogorov consistency implies that the statistics of sequential measurements on a (possibly quantum) system could be explained entirely by means of a classical stochastic process, thereby p...
In the first part of this two-part article (Aerts & Sassoli de Bianchi, 2014), we have intro-duc...
Quantum mechanics is essentially a statistical theory. Classical mechanics, however, is usually not ...
In this paper, we extend the fluctuation theorems used for quantum channels to multitime processes. ...
In the histories formulation of quantum theory, sets of coarse-grained histories, that are called co...
This paper argues that von Neumann’s work on the theory of ‘rings of operators’ has the same role an...
Answers to the question how a classical world emerges from underlying quantum physics are revisited,...
There is a contact problem between classical probability and quantum outcomes. Thus, a standard resu...
Quantum probability is very different from classical probability. Part of this difference is manifes...
Quantum probability is very different from classical probability. Part of this difference is manifes...
In this article we propose a solution to the measurement problem in quantum mechanics. We point out ...
The claim that there is an inconsistency of quantum-classical dynamics [1] is investigated. We point...
Abstract It is shown that Kolmogorovian probability models, like stochastic mechanics, are compati...
Noncommutative mathematics is a significant new trend of mathematics. Initially motivated by the dev...
It is shown that Kolmogorovian probability models, like stochastic mechanics, are compatible with th...
At a fundamental level, the classical picture of the world is dead, and has been dead now for almost...
In the first part of this two-part article (Aerts & Sassoli de Bianchi, 2014), we have intro-duc...
Quantum mechanics is essentially a statistical theory. Classical mechanics, however, is usually not ...
In this paper, we extend the fluctuation theorems used for quantum channels to multitime processes. ...
In the histories formulation of quantum theory, sets of coarse-grained histories, that are called co...
This paper argues that von Neumann’s work on the theory of ‘rings of operators’ has the same role an...
Answers to the question how a classical world emerges from underlying quantum physics are revisited,...
There is a contact problem between classical probability and quantum outcomes. Thus, a standard resu...
Quantum probability is very different from classical probability. Part of this difference is manifes...
Quantum probability is very different from classical probability. Part of this difference is manifes...
In this article we propose a solution to the measurement problem in quantum mechanics. We point out ...
The claim that there is an inconsistency of quantum-classical dynamics [1] is investigated. We point...
Abstract It is shown that Kolmogorovian probability models, like stochastic mechanics, are compati...
Noncommutative mathematics is a significant new trend of mathematics. Initially motivated by the dev...
It is shown that Kolmogorovian probability models, like stochastic mechanics, are compatible with th...
At a fundamental level, the classical picture of the world is dead, and has been dead now for almost...
In the first part of this two-part article (Aerts & Sassoli de Bianchi, 2014), we have intro-duc...
Quantum mechanics is essentially a statistical theory. Classical mechanics, however, is usually not ...
In this paper, we extend the fluctuation theorems used for quantum channels to multitime processes. ...