A real subfield $R\subseteq F$ of any number field has (finitely many) maximal real intermediate fields $R\subseteq R'\subseteq F$. Can I call such an $R'$ a real closure of $R$ relative to $F$?
Usually a closure operation has some relevant uniqueness, which this has not. For my purposes the interesting case is where $F$ is normal over $\mathbb{Q}$, and then the maximal intermediate real field is unique up to isomorphism over $\mathbb{Q}$, but generally not over $R$. This suggests closure is not a good term though it is handy for my purposes. Is there some more established term?
