Separable polynomial

Template:Univariate polynomial upto associates property

Definition

Let $K$ be a field and $f (x) \in K [x]$ be a nonzero polynomial. We say that $f$ is a separable polynomial if the following equivalent conditions are satisfied:

$f (x)$ and its formal derivative $f^{'} (x)$ are relatively prime in $K [x]$ .
$f (x)$ splits completely into distinct linear factors over its splitting field.
For any field $L$ containing $K$ , $f$ is a square-free polynomial over $L$ , i.e., no square of a polynomial divides $f$ .