A result of H.-W. Wiesbrock is extended from the case of a common cyclic and separating vector for the half-sided modular inclusion N ⊂ M of von Neumann algebras to the case of a common faithful normal semi-finite weight and at the same time a gap in Wiesbrock's proof is filled in.
Araki, H., Zsido, L. (2005). Extension of the structure theorem of Borchers and its application to half-sided modular inclusions. REVIEWS IN MATHEMATICAL PHYSICS, 17(5), 491-543 [10.1142/S0129055X05002388].
Extension of the structure theorem of Borchers and its application to half-sided modular inclusions
ZSIDO, LASZLO
2005-01-01
Abstract
A result of H.-W. Wiesbrock is extended from the case of a common cyclic and separating vector for the half-sided modular inclusion N ⊂ M of von Neumann algebras to the case of a common faithful normal semi-finite weight and at the same time a gap in Wiesbrock's proof is filled in.File in questo prodotto:
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