Under the general assumptions of quantum field theory in terms of local algebras of field operators fulfilling the split property, we prove that any two local coveriant implementations of the gauge group (or, in the case of a connected and simply connected Lie gauge group, any two choices of local current algebras) relative to a pair of double cones O 1, O 2, are related by a unitary equivalence induced by a unitary in the algebra of observables localized in
Fidaleo, F. (1986). On the local implementations of gauge symmetries in local quantum theory. COMMUNICATIONS IN MATHEMATICAL PHYSICS, 107(2), 233-240.
On the local implementations of gauge symmetries in local quantum theory
Fidaleo Francesco
1986-01-01
Abstract
Under the general assumptions of quantum field theory in terms of local algebras of field operators fulfilling the split property, we prove that any two local coveriant implementations of the gauge group (or, in the case of a connected and simply connected Lie gauge group, any two choices of local current algebras) relative to a pair of double cones O 1, O 2, are related by a unitary equivalence induced by a unitary in the algebra of observables localized inFile in questo prodotto:
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