Quasi-complete space: Difference between revisions

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Template:Short description In functional analysis, a topological vector space (TVS) is said to be quasi-complete or boundedly completeTemplate:Sfn if every closed and bounded subset is complete.Template:Sfn This concept is of considerable importance for non-metrizable TVSs.Template:Sfn

Properties

Examples and sufficient conditions

Every complete TVS is quasi-complete.Template:Sfn The product of any collection of quasi-complete spaces is again quasi-complete.Template:Sfn The projective limit of any collection of quasi-complete spaces is again quasi-complete.Template:Sfn Every semi-reflexive space is quasi-complete.Template:Sfn

The quotient of a quasi-complete space by a closed vector subspace may fail to be quasi-complete.

Counter-examples

There exists an LB-space that is not quasi-complete.Template:Sfn

See also

References

Template:Reflist Template:Reflist

Bibliography

Template:Topological vector spaces

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