Definition 10.155.3. Let $(R, \mathfrak m, \kappa )$ be a local ring.
The local ring map $R \to R^ h$ constructed in Lemma 10.155.1 is called the henselization of $R$.
Given a separable algebraic closure $\kappa \subset \kappa ^{sep}$ the local ring map $R \to R^{sh}$ constructed in Lemma 10.155.2 is called the strict henselization of $R$ with respect to $\kappa \subset \kappa ^{sep}$.
A local ring map $R \to R^{sh}$ is called a strict henselization of $R$ if it is isomorphic to one of the local ring maps constructed in Lemma 10.155.2
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