Archimedean ordered vector space explained

\leq

on a vector space

over the real or complex numbers is called Archimedean if for all

x\inX,

whenever there exists some

y\inX

such that

nx\leqy

for all positive integers

then necessarily

x\leq0.

An Archimedean (pre)ordered vector space is a (pre)ordered vector space whose order is Archimedean. A preordered vector space

is called almost Archimedean if for all

x\inX,

whenever there exists a

y\inX

such that

-n^-1y\leqx\leqn^-1y

for all positive integers

then

x=0.

Characterizations

(X,\leq)

with an order unit

is Archimedean preordered if and only if

nx\lequ

for all non-negative integers

implies

x\leq0.

Properties

Let

be an ordered vector space over the reals that is finite-dimensional. Then the order of

is Archimedean if and only if the positive cone of

is closed for the unique topology under which

is a Hausdorff TVS.

Order unit norm

Suppose

(X,\leq)

is an ordered vector space over the reals with an order unit

whose order is Archimedean and let

U=[-u,u].

Then the Minkowski functional

p_U

(defined by

p_U(x):=inf\left\{r>0:x\inr[-u,u]\right\}

) is a norm called the order unit norm. It satisfies

p_U(u)=1

and the closed unit ball determined by

p_U

is equal to

[-u,u]

(that is,

[-u,u]=\{x\inX:p_U(x)\leq1\}.

Examples

The space

l_infin(S,\R)

of bounded real-valued maps on a set

with the pointwise order is Archimedean ordered with an order unit

u:=1

(that is, the function that is identically

). The order unit norm on

l_infin(S,\R)

is identical to the usual sup norm:

\|f\|:=\sup|f(S)|.

Examples

Every order complete vector lattice is Archimedean ordered. A finite-dimensional vector lattice of dimension

is Archimedean ordered if and only if it is isomorphic to

\Rⁿ

with its canonical order. However, a totally ordered vector order of dimension

can not be Archimedean ordered. There exist ordered vector spaces that are almost Archimedean but not Archimedean.

\R²

over the reals with the lexicographic order is Archimedean ordered since

r(0,1)\leq(1,1)

for every

r>0

but

(0,1) ≠ (0,0).