Infrabarrelled space

If X is a Hausdorff locally convex space then the canonical injection from X into its bidual is a topological embedding if and only if X is infrabarrelled.[2]

Every quasi-complete infrabarrelled space is barrelled.[1]

Every barrelled space is infrabarrelled.[1] A closed vector subspace of an infrabarrelled space is, however, not necessarily infrabarrelled.[3]

Every product and locally convex direct sum of any family of infrabarrelled spaces is infrabarrelled.[3] Every separated quotient of an infrabarrelled space is infrabarrelled.[3]

• Barrelled space – A topological vector space with near minimum requirements for the Banach–Steinhaus theorem to hold.
• Quasibarrelled space

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• Köthe, Gottfried (1979). Topological Vector Spaces II. Grundlehren der mathematischen Wissenschaften. 237. New York: Springer Science & Business Media. ISBN 978-0-387-90400-9. OCLC 180577972.
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