Proposition 10.158.9. Let $K/k$ be a field extension. If the characteristic of $k$ is zero then
$K$ is separable over $k$,
$K$ is geometrically reduced over $k$,
$K$ is formally smooth over $k$,
$H_1(L_{K/k}) = 0$, and
the map $K \otimes _ k \Omega _{k/\mathbf{Z}} \to \Omega _{K/\mathbf{Z}}$ is injective.
If the characteristic of $k$ is $p > 0$, then the following are equivalent:
$K$ is separable over $k$,
the ring $K \otimes _ k k^{1/p}$ is reduced,
$K$ is geometrically reduced over $k$,
the map $K \otimes _ k \Omega _{k/\mathbf{F}_ p} \to \Omega _{K/\mathbf{F}_ p}$ is injective,
$H_1(L_{K/k}) = 0$, and
$K$ is formally smooth over $k$.
Comments (0)
There are also: