Order unit

An order unit is an element of an ordered vector space which can be used to bound all elements from above.^[1] In this way (as seen in the first example below) the order unit generalizes the unit element in the reals.

According to H. H. Schaefer, "most of the ordered vector spaces occurring in analysis do not have order units."^[2]

For the ordering cone ${\displaystyle K\subseteq X}$ in the vector space ${\displaystyle X}$, the element ${\displaystyle e\in K}$ is an order unit (more precisely a ${\displaystyle K}$-order unit) if for every ${\displaystyle x\in X}$ there exists a ${\displaystyle {\lambda }_x>0}$ such that ${\displaystyle {\lambda }_{x}e-x\in K}$ (that is, ${\displaystyle x{\le }_K{\lambda }_{x}e}$).^[3]

The order units of an ordering cone ${\displaystyle K\subseteq X}$ are those elements in the algebraic interior of ${\displaystyle K;}$ that is, given by ${\displaystyle \mathrm{core}(K).}$^[3]

Let ${\displaystyle X=ℝ}$ be the real numbers and ${\displaystyle K={ℝ}_{+}=\{x\in ℝ:x\ge 0\},}$ then the unit element ${\displaystyle 1}$ is an order unit.

Let ${\displaystyle X={ℝ}^n}$ and ${\displaystyle K={ℝ}_{+}^n=\{x_i\in ℝ:\text{ for all }i=1,\dots ,n:x_i\ge 0\},}$ then the unit element ${\displaystyle \overrightarrow{1}=(1,\dots ,1)}$ is an order unit.

Each interior point of the positive cone of an ordered topological vector space is an order unit.^[2]

Each order unit of an ordered TVS is interior to the positive cone for the order topology.^[2]

If ${\displaystyle (X,\le )}$ is a preordered vector space over the reals with order unit ${\displaystyle u,}$ then the map ${\displaystyle p(x):=\inf \{t\in ℝ:x\le tu\}}$ is a sublinear functional.^[4]

Suppose ${\displaystyle (X,\le )}$ is an ordered vector space over the reals with order unit ${\displaystyle u}$ whose order is Archimedean and let ${\displaystyle U=[-u,u].}$ Then the Minkowski functional ${\displaystyle p_U}$ of ${\displaystyle U,}$ defined by ${\displaystyle p_U(x):=\inf \{r>0:x\in r[-u,u]\},}$ is a norm called the order unit norm. It satisfies ${\displaystyle p_U(u)=1}$ and the closed unit ball determined by ${\displaystyle p_U}$ is equal to ${\displaystyle [-u,u];}$ that is, ${\displaystyle [-u,u]=\{x\in X:p_U(x)\le 1\}.}$^[4]

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