algebraic quantum field theory (perturbative, on curved spacetimes, homotopical)
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interacting field quantization
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Fell’s theorem is about a property of vector states of a C-star algebra, it says that if the kernels of two representations of the algebra coincide, then the vector states are mutually weak-* dense. This has a profound consequence for the AQFT interpretation: A state represents the physical state of a physical system. Since one can always only perform a finite number of measurements, with a finite precision, it is only possible to determine a weak-* neigborhood of a given state. This means that it is not possible - not even in principle - to distinguish representations with coinciding kernels by measurements.
For this reason representations with coinciding kernels are sometimes called physically equivalent in the AQFT literature.
Let A be a unital algebra and be two representations of A on a Hilbert space H.
equivalence theorem Every vector state of is the weak-* limit of vector states of iff the kernel of contains the kernel of .
Other theorems about the foundations and interpretation of quantum mechanics include:
Last revised on December 11, 2017 at 13:45:29. See the history of this page for a list of all contributions to it.