Abbreviation: DCPO
A \emph{directed complete partial order} is a poset $\mathbf{P}=\langle P,\leq \rangle $ such that every directed subset of $P$ has a least upper bound: $\forall D\subseteq P\ (D\ne\emptyset\mbox{and}\forall x,y\in D\ \exists z\in D (x,y\le z)\Longrightarrow \exists z\in P(z=\bigvee D))$.
Let $\mathbf{P}$ and $\mathbf{Q}$ be directed complete partial orders. A morphism from $\mathbf{P}$ to $\mathbf{Q}$ is a function $f:Parrow Q$ that is \emph{Scott-continuous}, which means that $f$ preserves all directed joins:
$z=\bigvee D\Longrightarrow f(z)= \bigvee f[D]$
Example 1: $\langle \mathbb{R},\leq \rangle $, the real numbers with the standard order. Example 1: $\langle P(S),\subseteq \rangle $, the collection of subsets of a sets $S$, ordered by inclusion.
$\begin{array}{lr}
f(1)= &1
f(2)= &
f(3)= &
f(4)= &
f(5)= &
f(6)= &
\end{array}$