Mackey space

In mathematics, particularly in functional analysis, a Mackey space is a locally convex topological vector space X such that the topology of X coincides with the Mackey topology τ(X,X′), the finest topology which still preserves the continuous dual.

Examples

Examples of Mackey spaces include:

All bornological spaces.
All Hausdorff locally convex quasi-barrelled (and hence all Hausdorff locally convex barrelled spaces and all Hausdorff locally convex reflexive spaces).
All Hausdorff locally convex metrizable spaces.^[1]
All Hausdorff locally convex barreled spaces.^[1]
The product, locally convex direct sum, and the inductive limit of a family of Mackey spaces is a Mackey space.^[2]

Properties

A locally convex space $X$ with continuous dual $X'$ is a Mackey space if and only if each convex and $\sigma(X', X)$ -relatively compact subset of $X'$ is equicontinuous.
The completion of a Mackey space is again a Mackey space.^[3]
A separated quotient of a Mackey space is again a Mackey space.
A Mackey space need not be separable, complete, quasi-barrelled, nor $\sigma$ -quasi-barrelled.

References

↑ ^1.0 ^1.1 Schaefer (1999) p. 132
↑ Schaefer (1999) p. 138
↑ Schaefer (1999) p. 133

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[Schaefer_.281999.29_p._132-1] 1.0 ^1.1 Schaefer (1999) p. 132

[Schaefer_.281999.29_p._138-2] Schaefer (1999) p. 138

[3] Schaefer (1999) p. 133

[1]

[2]

[3]

v t e Functional analysis
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Analysis	Bochner space Differentiation in Fréchet spaces Derivatives (Fréchet Gâteaux functional holomorphic) Integrals (Bochner Dunford Gelfand–Pettis regulated weak) Functional calculus (Borel continuous holomorphic) Inverse function theorem (Nash–Moser theorem) Vector measure

Mackey space

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