The Maximal Ideal Space of a Ring of Measurable Functions
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Publication:5538521
DOI10.2307/2373081zbMath0156.36904OpenAlexW2331290611MaRDI QIDQ5538521
Publication date: 1966
Published in: American Journal of Mathematics (Search for Journal in Brave)
Full work available at URL: https://doi.org/10.2307/2373081
Related Items (12)
Strong singularity, disjointness, and strong finite additivity of finitely additive measures ⋮ Classical extensions of the ring of continuous functions and the corresponding preimages of a completely regular space ⋮ Rings and sheaves ⋮ Hyperstonean cover and second dual extension ⋮ The extension and completion of the universal measure and the dual of the space of measures ⋮ Ideals in rings and intermediate rings of measurable functions ⋮ Markov Operators and Quasi-Stonian Spaces ⋮ The dual of a space of vector measures ⋮ On the universal measure space ⋮ Recent progress in rings and subrings of real valued measurable functions ⋮ The representation of linear operators on spaces of finitely additive set functions ⋮ Isomorphisms of subspaces of vector-valued continuous functions
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