On the dual of complex Olshanskii semigroups
Abstract
Let G be a connected Lie group and G its unitary dual. We are interested in the part ⊂ G which corresponds to the unitary highest weight representations of G. Then there are several topologies on : The euclidean topology TE which comes from the identification of with the set of highest weights, the induced topology TI induced from the Fell topology on G and finally a natural topology TS which comes from the hull kernel topology of certain CCR C*-algebras which are related to the holomorphic extemsion of unitary highest weight representations to complex Olshanskii semigroups S. One of the main results in this paper is the inclusion chain TS⊂ TI⊂ TE. Further we exhibit very large interesting subspaces of where these topologies coincide. Finally we show that the Borel structures on induced from the three different topologies coincide.
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