Let $K \neq \mathbb{Q} $ be a finite extension of $\mathbb{Q}$. For a given integer $n$, how to construct an unramified extension of $K$ of degree $n$ ?
EDIT: If not then under what conditions on $K$, the above construction is possible ?
$\begingroup$
$\endgroup$
4
-
1$\begingroup$ Adjoin a suitable root of unity. $\endgroup$– LSpiceCommented Mar 11, 2015 at 19:09
-
2$\begingroup$ the $n$th cyclotomic field over $\mathbb{Q}$ is ramified at all primes dividing $n$. $\endgroup$– Will ChenCommented Mar 11, 2015 at 19:55
-
2$\begingroup$ If $K$ is a local field, then there exists a unique unramified extension of each degree. See Serre's book on local fields. $\endgroup$– Daniel LoughranCommented Mar 11, 2015 at 20:58
-
2$\begingroup$ See some previous MO questions: mathoverflow.net/questions/26491/… and mathoverflow.net/questions/41219/…. The first link shows $\mathbf Q(i)$ has no everywhere unramified extensions of degree greater than $1$, abelian or otherwise. So in that sense it is just like $\mathbf Q$. $\endgroup$– KConradCommented Mar 12, 2015 at 0:30
Add a comment
|