On a geometric realization of C*-algebras

Abstract

Further to the functional representations of C*-algebras proposed by R. Cirelli, A. Mania and L. Pizzocchero, we consider in this article the uniform K\"ahler bundle (in short, UKB) description of some C*-algebraic subjects. In particular, we obtain an one-to-one correspondence between closed ideals of a C*-algebra A and full uniform K\"ahler sub bundles over open subsets of the base space of the UKB associated with A. In addition, we will present a geometric description of the pure state space of hereditary C*-subalgebras and show that that if B is a hereditary C*-subalgebra of A, the UKB of B is a kind of K\"ahler subbundle of the UKB of A. As a simple example, we consider hereditary C*-subalgebras of the C*-algebra of compact operators on a Hilbert space. Finally, we remark that hereditary C*-subalgebras also naturally can be characterized as uniform holomorphic Hilbert subbundles.