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The Inner Corona Algebra of a C 0(X)-Algebra
Part of:
Generalities
Commutative Banach algebras and commutative topological algebras
Fairly general properties
Linear function spaces and their duals
Selfadjoint operator algebras
Maps and general types of spaces defined by maps
Peculiar spaces
Published online by Cambridge University Press: 19 September 2016
Abstract
Let A = C(X) ⊗ K(H), where X is a compact Hausdorff space and K(H) is the algebra of compact operators on a separable infinite-dimensional Hilbert space. Let A s be the algebra of strong*-continuous functions from X to K(H). Then A s /A is the inner corona algebra of A. We show that if X has no isolated points, then A s /A is an essential ideal of the corona algebra of A, and Prim(A s /A), the primitive ideal space of A s /A, is not weakly Lindelof. If X is also first countable, then there is a natural injection from the power set of X to the lattice of closed ideals of A s /A. If X = βℕ\ℕ and the continuum hypothesis (CH) is assumed, then the corona algebra of A is a proper subalgebra of the multiplier algebra of A s /A. Several of the results are obtained in the more general setting of C 0(X)-algebras.
MSC classification
Secondary:
46L05: General theory of $C^*$-algebras
46L08: $C^*$-modules
46L45: Decomposition theory for $C^*$-algebras
46E25: Rings and algebras of continuous, differentiable or analytic functions
46J10: Banach algebras of continuous functions, function algebras
54A35: Consistency and independence results
54C35: Function spaces
54D15: Higher separation axioms (completely regular, normal, perfectly or collectionwise normal, etc.)
54D35: Extensions of spaces (compactifications, supercompactifications, completions, etc.)
54G10: $P$-spaces
- Type
- Research Article
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- Copyright © Edinburgh Mathematical Society 2017