Add to ORKGKolmogorov's axioms of probability theory are extended to conditional probabilities among distinct (and sometimes intertwining) contexts. Formally, this amounts to row stochastic matrices whose entries characterize the conditional probability to find some observable (postselection) in one context, given an observable (preselection) in another context. As the respective probabilities need not (but, depending on the physical/model realization, can) be of the Born rule type, this generalizes approaches to quantum probabilities by Auff\'eves and Grangier, which in turn are inspired by Gleason's theorem.Comment: 18 pages, 3 figures, greatly revise
Quantum bits can be isolated to perform useful information-theoretic tasks, even though physical sys...
Guerra Bobo (2013) has questioned whether Lüders conditionalization for quantum probabilities suppli...
Buschʼs theorem deriving the standard quantum probability rule can be regarded as a more general for...
Kolmogorov’s axioms of probability theory are extended to conditional probabilities among distinct (...
We investigate the consistency of conditional quantum probabilities. This is whether there is compat...
We discuss generalized pobabilistic models for which states not necessarily obey Kolmogorov's axioms...
We discuss generalized pobabilistic models for which states not necessarily obey Kolmogorov's axioms...
From Gleason's theorem we know that in principle every probability measure can be expressed by Hermi...
From Gleason's theorem we know that in principle every probability measure can be expressed by Hermi...
We develop and defend the thesis that the Hilbert space formalism of quantum mechanics is a new theo...
In this paper we will present a modified formulation of generalized probabilistic theories that will...
We discuss a scenario of bipartite steering with local subsystems of the parties modeled by certain ...
We study the origin of quantum probabilities as arising from non-Boolean propositional-operational s...
Buschs theorem deriving the standard quantum probability rule can be regarded as a more general form...
We study the origin of quantum probabilities as arising from non-Boolean propositional-operational s...
Quantum bits can be isolated to perform useful information-theoretic tasks, even though physical sys...
Guerra Bobo (2013) has questioned whether Lüders conditionalization for quantum probabilities suppli...
Buschʼs theorem deriving the standard quantum probability rule can be regarded as a more general for...
Kolmogorov’s axioms of probability theory are extended to conditional probabilities among distinct (...
We investigate the consistency of conditional quantum probabilities. This is whether there is compat...
We discuss generalized pobabilistic models for which states not necessarily obey Kolmogorov's axioms...
We discuss generalized pobabilistic models for which states not necessarily obey Kolmogorov's axioms...
From Gleason's theorem we know that in principle every probability measure can be expressed by Hermi...
From Gleason's theorem we know that in principle every probability measure can be expressed by Hermi...
We develop and defend the thesis that the Hilbert space formalism of quantum mechanics is a new theo...
In this paper we will present a modified formulation of generalized probabilistic theories that will...
We discuss a scenario of bipartite steering with local subsystems of the parties modeled by certain ...
We study the origin of quantum probabilities as arising from non-Boolean propositional-operational s...
Buschs theorem deriving the standard quantum probability rule can be regarded as a more general form...
We study the origin of quantum probabilities as arising from non-Boolean propositional-operational s...
Quantum bits can be isolated to perform useful information-theoretic tasks, even though physical sys...
Guerra Bobo (2013) has questioned whether Lüders conditionalization for quantum probabilities suppli...
Buschʼs theorem deriving the standard quantum probability rule can be regarded as a more general for...