Add to ORKGWe study some of the possibilities for formulating the Heisenberg relation of quantum mechanics in mathematical terms. In particular, we examine the framework discussed by Murray and von Neumann, the family (algebra) of operators affiliated with a finite factor (of infinite linear dimension)
These are the slides of a talk given at the INFN Workshop "Is Quantum Theory Exact? From Quantum Fo...
This dissertation investigates the properties of unbounded derivations on C*-algebras, namely the de...
This dissertation investigates the properties of unbounded derivations on C*-algebras, namely the de...
Abstract. We study some of the possibilities for formulating the Heisenberg relation of quantum mech...
Von Neumann algebras are self-adjoint, strong-operator closed subalgebras (containing the identity o...
Von Neumann algebras are self-adjoint, strong-operator closed subalgebras (containing the identity o...
I summarize Silberstein, et. al’s (2006) discussion of the derivation of the Heisenberg commutators,...
Quantum mechanics and the theory of operator algebras have been intertwined since their origin. In t...
Quantum mechanics and the theory of operator algebras have been intertwined since their origin. In t...
In the spirit of geometric quantisation we consider representations of the Heisenberg(–Weyl) group i...
I summarize Silberstein, et. al’s (2006) discussion of the derivation of the Heisenberg commutators,...
The article reconsiders quantum theory in terms of the following principle, which can be symbolicall...
The main algebraic foundations of quantum mechanics are quickly reviewed. They have been s...
This extended abstract was submitted to the "Foundations 2020: The 20th UK and European Conference o...
The main algebraic foundations of quantum mechanics are quickly reviewed. They have been s...
These are the slides of a talk given at the INFN Workshop "Is Quantum Theory Exact? From Quantum Fo...
This dissertation investigates the properties of unbounded derivations on C*-algebras, namely the de...
This dissertation investigates the properties of unbounded derivations on C*-algebras, namely the de...
Abstract. We study some of the possibilities for formulating the Heisenberg relation of quantum mech...
Von Neumann algebras are self-adjoint, strong-operator closed subalgebras (containing the identity o...
Von Neumann algebras are self-adjoint, strong-operator closed subalgebras (containing the identity o...
I summarize Silberstein, et. al’s (2006) discussion of the derivation of the Heisenberg commutators,...
Quantum mechanics and the theory of operator algebras have been intertwined since their origin. In t...
Quantum mechanics and the theory of operator algebras have been intertwined since their origin. In t...
In the spirit of geometric quantisation we consider representations of the Heisenberg(–Weyl) group i...
I summarize Silberstein, et. al’s (2006) discussion of the derivation of the Heisenberg commutators,...
The article reconsiders quantum theory in terms of the following principle, which can be symbolicall...
The main algebraic foundations of quantum mechanics are quickly reviewed. They have been s...
This extended abstract was submitted to the "Foundations 2020: The 20th UK and European Conference o...
The main algebraic foundations of quantum mechanics are quickly reviewed. They have been s...
These are the slides of a talk given at the INFN Workshop "Is Quantum Theory Exact? From Quantum Fo...
This dissertation investigates the properties of unbounded derivations on C*-algebras, namely the de...
This dissertation investigates the properties of unbounded derivations on C*-algebras, namely the de...