Dual topology

In functional analysis and related areas of mathematics a dual topology is a locally convex topology on a vector space that is induced by the continuous dual of the vector space, by means of the bilinear form associated with the dual pair.
The different dual topologies for a given dual pair are characterized by the Mackey–Arens theorem. All locally convex topologies with their continuous dual are trivially a dual pair and the locally convex topology is a dual topology.
Several topological properties depend only on the dual pair and not on the chosen dual topology and thus it is often possible to substitute a complicated dual topology by a simpler one.

Definition

Given a dual pair, a dual topology on is a locally convex topology so that
Here denotes the continuous dual of and means that there is a linear isomorphism

Properties

Theorem : Given a dual pair, the bounded set (topological [vector space)|bounded set]s under any dual topology are identical.

Under any dual topology the same sets are barrelled.

Characterization of dual topologies

The Mackey–Arens theorem, named after George Mackey and Richard Arens, characterizes all possible dual topologies on a locally convex space.
The theorem shows that the coarsest dual topology is the weak topology, the topology of uniform convergence on all finite subsets of, and the finest topology is the Mackey topology, the topology of uniform convergence on all absolutely convex weakly compact subsets of.

Mackey–Arens theorem

Given a dual pair with a locally convex space and its continuous dual, then is a dual topology on if and only if it is a topology of [uniform convergence] on a family of absolutely convex and weakly compact subsets of