Quasi-ultrabarrelled space

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In functional analysis and related areas of mathematics, a quasi-ultrabarrelled space is a topological vector spaces (TVS) for which every bornivorous ultrabarrel is a neighbourhood of the origin.

Definition

A subset B₀ of a TVS X is called a bornivorous ultrabarrel if it is a closed, balanced, and bornivorous subset of X and if there exists a sequence ${(B_{i})}_{i = 1}^{\infty}$ of closed balanced and bornivorous subsets of X such that B_i+1 + B_i+1 ⊆ B_i for all i = 0, 1, .... In this case, ${(B_{i})}_{i = 1}^{\infty}$ is called a defining sequence for B₀. A TVS X is called quasi-ultrabarrelled if every bornivorous ultrabarrel in X is a neighbourhood of the origin.Template:Sfn

Properties

A locally convex quasi-ultrabarrelled space is quasi-barrelled.Template:Sfn

Examples and sufficient conditions

Ultrabarrelled spaces and ultrabornological spaces are quasi-ultrabarrelled. Complete and metrizable TVSs are quasi-ultrabarrelled.Template:Sfn

References

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Template:Functional analysis Template:Boundedness and bornology Template:Topological vector spaces

Quasi-ultrabarrelled space

Contents

Definition

Properties

Examples and sufficient conditions

See also

References

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Quasi-ultrabarrelled space

Definition

Properties

Examples and sufficient conditions

See also

References

Navigation menu

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