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barrel (Definition)

Let $ V$ be a topological vector space (TVS). A barrel $ B$ is a subset of $ V$ that is closed, convex, balanced, and absorbing. For example, in a Banach space $ A$, any ball $ \lbrace v\in A\mid \vert\vert v\vert\vert\le r\rbrace$ for some $ r>0$ is a barrel.

A topological vector space is said to be a barrelled space if it is locally convex, and every barrel is a neighborhood of 0. Every Banach space is a barrelled space.

A weaker form of a barrelled space is that of an infrabarrelled space. A TVS is said to be infrabarrelled if it is locally convex, and every barrel that absorbs every bounded set is a neighborhood of 0.

Let $ V$ be a vector space and $ \mathfrak{T}$ be the set of all those topologies on $ V$ making $ V$ a TVS. In other words, if $ T\in \mathfrak{T}$, then $ (V,T)$ is a topological vector space.

Let $ V$ and $ T\in \mathfrak{T}$ be defined as above. Then $ (V,T)$ being barrelled has an equivalent characterization below:

(*) for any $ T_1\in \mathfrak{T}$ such that there is a neighborhood base of 0 consisting of $ T$-closed sets, then $ T_1$ is coarser than $ T$.

A variation of a barrelled space is that of an ultrabarrelled space. A topological vector space is said to be ultrabarrelled if it satisfies (*) above. A locally convex ultrabarrelled space is barrelled.

Bibliography

1
H. H. Schaefer, Topological Vector Spaces, Springer-Verlag, New York (1970).
2
R. E. Edwards, Functional Analysis, Theory and Applications, Holt, Reinhart and Winston, New York (1965).



"barrel" is owned by CWoo.
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Other names:  barreled space, infrabarreled space, ultrabarreled space, barrelled, infrabarrelled, ultrabarrelled
Also defines:  barrelled space, infrabarrelled space, ultrabarrelled space
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Cross-references: variation, coarser, characterization, equivalent, topologies, vector space, bounded set, absorbs, neighborhood, ball, Banach space, absorbing, convex, closed, subset, topological vector space
There is 1 reference to this entry.

This is version 2 of barrel, born on 2007-02-11, modified 2007-02-15.
Object id is 8902, canonical name is Barrel.
Accessed 2710 times total.

Classification:
AMS MSC46A08 (Functional analysis :: Topological linear spaces and related structures :: Barrelled spaces, bornological spaces)
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