| dc.description.abstract | Separation properties of the Fell topology, on the spectrum G of a locally compact group
G, characterize important properties of G. We will develop three equivalent ways to
describe the Fell topology on the spectrum  of any C* algebra A. Specifically, we
show that both the relative weak*-topology on P(A), the set of pure states of A, and
the Jacobson topology on Prim(A), the set of all primative ideals on A, can be mapped
onto  so that both topologies agree with the Fell topology. We will also study the
correspondences, both between the set of strongly continuous unitary representations
of G and the irreducible representations of the group C*-algebra G*(G), and between
the continuous functions of positive type on G and the set of pure states of G*(G). As
well, we give a survey of results outlining the characterization of G by simple separation
properties of the Fell topology on G. | |
