摘要
Further to the functional representations of C^*-algebras proposed by R. Cirelli and A. Manik, we consider the uniform Kahler bundle (UKB) description of some C^*-algebraic subjects. In particular, we obtain a one-to- one correspondence between closed ideals of a C^*-algebra A and full uniform Kahler subbundles over open subsets of the base space of the UKB associated with A. In addition, we present a geometric description of the pure state space of hereditary C^*-subalgebras and show that if B is a hereditary C^*-subalgebra of A, the UKB of B is a kind of Kahler 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 each hereditary C^*- subalgebra of A also can be naturally characterized as a uniform holomorphic Hilbert bundle.
Further to the functional representations of C^*-algebras proposed by R. Cirelli and A. Manik, we consider the uniform Kahler bundle (UKB) description of some C^*-algebraic subjects. In particular, we obtain a one-to- one correspondence between closed ideals of a C^*-algebra A and full uniform Kahler subbundles over open subsets of the base space of the UKB associated with A. In addition, we present a geometric description of the pure state space of hereditary C^*-subalgebras and show that if B is a hereditary C^*-subalgebra of A, the UKB of B is a kind of Kahler 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 each hereditary C^*- subalgebra of A also can be naturally characterized as a uniform holomorphic Hilbert bundle.
