On the existence of E0-semigroups -- the multiparameter case
Abstract
Let P ⊂ Rd be a closed convex cone. Assume that P is pointed, i.e. the intersection P -P=\0\ and P is spanning, i.e. P-P=Rd. Denote the interior of P by . Let E be a product system over . We show that there exists an infinite dimensional separable Hilbert space H and a semigroup α:=\αx\x ∈ P of unital normal *-endomorphisms of B(H) such that E is isomorphic to the product system associated to α.
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