Order dual (functional analysis) explained

is the set

\operatorname{Pos}\left(X^*\right)-\operatorname{Pos}\left(X^*\right)

where

\operatorname{Pos}\left(X^*\right)

denotes the set of all positive linear functionals on

, where a linear function

is called positive if for all

x\inX,

x\geq0

implies

f(x)\geq0.

The order dual of

is denoted by

X⁺

. Along with the related concept of the order bound dual, this space plays an important role in the theory of ordered topological vector spaces.

Canonical ordering

An element

of the order dual of

is called positive if

x\geq0

implies

\operatorname{Re}f(x)\geq0.

The positive elements of the order dual form a cone that induces an ordering on

X⁺

called the canonical ordering.If

is an ordered vector space whose positive cone

is generating (that is,

X=C-C

) then the order dual with the canonical ordering is an ordered vector space.The order dual is the span of the set of positive linear functionals on

Properties

is generating and if

[0,x]+[0,y]=[0,x+y]

holds for all positive

and

, then the order dual is equal to the order bound dual, which is an order complete vector lattice under its canonical ordering.

The order dual of a vector lattice is an order complete vector lattice. The order dual of a vector lattice

can be finite dimension (possibly even

\{0\}

) even if

is infinite-dimensional.

Order bidual

Suppose that

is an ordered vector space such that the canonical order on

X⁺

makes

X⁺

into an ordered vector space. Then the order bidual is defined to be the order dual of

X⁺

and is denoted by

X⁺⁺

. If the positive cone of an ordered vector space

is generating and if

[0,x]+[0,y]=[0,x+y]

holds for all positive

and

, then

X⁺⁺

is an order complete vector lattice and the evaluation map

X\toX⁺⁺

is order preserving. In particular, if

is a vector lattice then

X⁺⁺

is an order complete vector lattice.

Minimal vector lattice

is a vector lattice and if

is a solid subspace of

X⁺

that separates points in

, then the evaluation map

X\toG⁺

defined by sending

x\inX

to the map

E_x:G⁺\to\Complex

given by

E_x(f):=f(x)

, is a lattice isomorphism of

onto a vector sublattice of

G⁺

. However, the image of this map is in general not order complete even if

is order complete. Indeed, a regularly ordered, order complete vector lattice need not be mapped by the evaluation map onto a band in the order bidual. An order complete, regularly ordered vector lattice whose canonical image in its order bidual is order complete is called minimal and is said to be of minimal type.

Examples

For any

1<p<infty

, the Banach lattice

L^p(\mu)

is order complete and of minimal type; in particular, the norm topology on this space is the finest locally convex topology for which every order convergent filter converges.

Properties

Let

be an order complete vector lattice of minimal type. For any

x\inX

such that

x>0,

the following are equivalent:

is a weak order unit.

For every non-0 positive linear functional

f(x)>0.

For each topology

\tau

such that

(X,\tau)

is a locally convex vector lattice,

is a quasi-interior point of its positive cone.

Related concepts

An ordered vector space

is called regularly ordered and its order is said to be regular if it is Archimedean ordered and

X⁺

distinguishes points in