local field and number field

Question

Let $K$ be a local field (locally compact topological field) of characteristic zero. Is it true that $K$ is isomorphic to the completion of a number field under some valuations? If yes, then how to prove it?

I ask this question since in a paper it is said that $k_v^*/(k_v^*)^2$ where $k_v$ is the completion of a number field at some place $v$ has order 1, 2, 4 or 8. From the structure theory of local fields this order argument is incorrect for general local fields of characteristic zero.

If not every local field of characteristic zero comes from the completion of some number field and the above claim about the order of $k_v^*/(k_v^*)^2$ is correct. Can some one prove it or give a reference for it?

Answer 1

First of all, it is not correct to say that for a local field $K$, the group $K^\times/K^{\times 2}$ has order $1,2,4$, or $8$. To get a counter-example, think of a sufficiently ramified extension of $\mathbf{Q}_2$, or the local field $\mathbf{F}_2((T))$.

To compute this group for any local field $K$ with (finite) residue field $k$ of cardinality $q=p^f$ ($p$ prime), you have to use the structure of the multiplicative group $K^\times$, which turns out to be isomorphic --- after you choose a uniformiser of $K$ --- to the product $\mathbf{Z}\times k^\times \times U_1$, where $U_1$ is the group of $1$-units (Einseinheiten, the kernel of the map $\mathfrak{o}^\times\to k^\times$, where $\mathfrak{o}$ is the ring of integers of $K$). Now remark that $k^\times$ is cyclic of order $q-1$ and $U_1$ is a $\mathbf{Z}_p$-module (which is finitely generated of rank $[K:\mathbf{Q}_p]$ in the characteristic-$0$ case).

Answer 2

A nice reference for the relevant proof is http://math.stanford.edu/~conrad/676Page/handouts/localglobal.pdf.