Add to ORKGIn this paper we provide a method for constructing joint distributions for an arbitrary set of observables on finite dimensional Hilbert spaces irrespective of whether the observables commute or not. These distributions have a number of desirable properties: they agree with the standard quantum mechanical ones if the observables commute, they also depend continuously on the observables, and under unitary transformations they behave in a reasonable manner
The dynamics of the system in the space of random joint events is considered. The symmetric differen...
The aim of the paper is to derive essential elements of quantum mechanics from a parametric structur...
The dynamics of the system in the space of random joint events is considered. The symmetric differen...
summary:The notion of a joint distribution in $\sigma$-finite measures of observables of a quantum l...
A standard result in quantum mechanics is this: if two observables are commuting then they have a c...
summary:This paper i a continuation of the first part under the same title. The author studies a joi...
summary:This paper i a continuation of the first part under the same title. The author studies a joi...
Journal PaperThere has been considerable interest in the problem of joint representations for variab...
summary:The notion of a joint distribution in $\sigma$-finite measures of observables of a quantum l...
There is a contact problem between classical probability and quantum outcomes. Thus, a standard resu...
summary:A quantum version of Bochner's theorem characterising Fourier transforms of probability meas...
We explore the possibility of achieving the optimal joint measurement of noncommuting observables on...
The problem of simultaneous measurement of incompatible observables in quantum mechanics is studied ...
The problem of simultaneous measurement of incompatible observables in quantum mechanics is studied ...
The dynamics of the system in the space of random joint events is considered. The symmetric differen...
The dynamics of the system in the space of random joint events is considered. The symmetric differen...
The aim of the paper is to derive essential elements of quantum mechanics from a parametric structur...
The dynamics of the system in the space of random joint events is considered. The symmetric differen...
summary:The notion of a joint distribution in $\sigma$-finite measures of observables of a quantum l...
A standard result in quantum mechanics is this: if two observables are commuting then they have a c...
summary:This paper i a continuation of the first part under the same title. The author studies a joi...
summary:This paper i a continuation of the first part under the same title. The author studies a joi...
Journal PaperThere has been considerable interest in the problem of joint representations for variab...
summary:The notion of a joint distribution in $\sigma$-finite measures of observables of a quantum l...
There is a contact problem between classical probability and quantum outcomes. Thus, a standard resu...
summary:A quantum version of Bochner's theorem characterising Fourier transforms of probability meas...
We explore the possibility of achieving the optimal joint measurement of noncommuting observables on...
The problem of simultaneous measurement of incompatible observables in quantum mechanics is studied ...
The problem of simultaneous measurement of incompatible observables in quantum mechanics is studied ...
The dynamics of the system in the space of random joint events is considered. The symmetric differen...
The dynamics of the system in the space of random joint events is considered. The symmetric differen...
The aim of the paper is to derive essential elements of quantum mechanics from a parametric structur...
The dynamics of the system in the space of random joint events is considered. The symmetric differen...
