What does for places mean to “ be ramified over $\mathbb Q$”?

Question

I saw the following sentences in a paper :

Let F be a number field containing the group of $2n$-th roots of unity. Let S be a finite set of places of F containing all the archimedean ones and all non-archimedean primes which are ramified over $\mathbb Q$.

I have a question here. What does for places mean to be ramified over $\mathbb Q$?