Add to ORKGInternational audienceConsidering a minimal number of assumptions and in the context of the timeless formalism, conditional probabilities are derived for subsequent measurements in the non-relativistic regime. Only unitary transformations are considered with detection processes described by generalized measurements (POVM). One-time conditional probabilities are unambiguously derived via the Gleason-Bush theorem, including for puzzling cases like the Wigner's friend scenario where their form underlines the relativity aspect of measurements. No paradoxical situations emerge and the roles of Wigner and Wigner can be seen by his friend as being in a superposition
International audienceWe present a derivation of the third postulate of Relational Quantum Mechanics...
We define quantum-like probabilistic behaviour as behaviour which is impossible to describe by using...
Buschʼs theorem deriving the standard quantum probability rule can be regarded as a more general for...
It is well-known that the law of total probability does not generally hold in quantum theory. Howeve...
The notorious Wigner's friend thought experiment has in recent years received renewed interest espec...
We consider the successive measurement of position and momentum of a single particle. Let P be the c...
This paper provides a general method for defining a generalized quantum observable (or POVM) that su...
A theoretical aspect of quantum mechanical probabilities is studied. In particular, it is investigat...
As physics searches for invariants in observations, this paper looks for invariants of probabilistic...
We discuss the definition of quantum probability in the context of "timeless" general--relativistic ...
We prove a Gleason-type theorem for the quantum probability rule using frame functions defined on po...
The Born probability measure describes the statistics of measurements in which observers self-locate...
Weak measurements are currently used to directly measure wavefunctions (1),(2). In this note, we com...
Abstract. A physical and mathematical framework for the analysis of probabilities in quantum theory ...
In the first part of this two-part article (Aerts & Sassoli de Bianchi, 2014), we have intro-duc...
International audienceWe present a derivation of the third postulate of Relational Quantum Mechanics...
We define quantum-like probabilistic behaviour as behaviour which is impossible to describe by using...
Buschʼs theorem deriving the standard quantum probability rule can be regarded as a more general for...
It is well-known that the law of total probability does not generally hold in quantum theory. Howeve...
The notorious Wigner's friend thought experiment has in recent years received renewed interest espec...
We consider the successive measurement of position and momentum of a single particle. Let P be the c...
This paper provides a general method for defining a generalized quantum observable (or POVM) that su...
A theoretical aspect of quantum mechanical probabilities is studied. In particular, it is investigat...
As physics searches for invariants in observations, this paper looks for invariants of probabilistic...
We discuss the definition of quantum probability in the context of "timeless" general--relativistic ...
We prove a Gleason-type theorem for the quantum probability rule using frame functions defined on po...
The Born probability measure describes the statistics of measurements in which observers self-locate...
Weak measurements are currently used to directly measure wavefunctions (1),(2). In this note, we com...
Abstract. A physical and mathematical framework for the analysis of probabilities in quantum theory ...
In the first part of this two-part article (Aerts & Sassoli de Bianchi, 2014), we have intro-duc...
International audienceWe present a derivation of the third postulate of Relational Quantum Mechanics...
We define quantum-like probabilistic behaviour as behaviour which is impossible to describe by using...
Buschʼs theorem deriving the standard quantum probability rule can be regarded as a more general for...