Definition:Immediate Predecessor Element

Definition
Let $\left({S, \preceq}\right)$ be a poset.

Let $a, b \in S$.

Then $a$ is an immediate predecessor (element) to $b$ iff:
 * $(1): \quad a \prec b$
 * $(2): \quad \neg \exists c \in S: a \prec c \prec b$

That is, there exists no element strictly between $a$ and $b$ in the ordering.

We say that $a$ immediately precedes $b$.

Also known as
Some sources just refer to a predecessor (element).

However, compare this with the definition on this site for predecessor element.

Also see

 * Precede
 * Strictly Precede


 * Immediate Successor Element