Let $K$ be a complete valued field extension of $\mathbb{Q}_p$ with possibly imperfect residual field $k$. Assume that there exists a ring endomorphism $\sigma: K\to K$ lifting the $p$-th power map of $k$.
The question is : given an (arbitrary) finite extension $L/K$, is it true that there exists a finite extension $M/L$ together with a Frobenius endomorphism lifting $\sigma$, or a power of $\sigma$ ?
The answer is yes if $K/\mathbb{Q}_p$ is finite (and hence $\sigma$ is bijective). In fact (up to my mistakes) by Galois theory arguments any Galois extension has a Frobenius automorphism lifting $\sigma$.
The answer is also positive if $L/K$ is unramified. In other words this means (by definition) that $L = K \otimes_{C(k)} C(k')$, where $k'/k$ is any field extension and $C(k)$, $C(k')$ are Cohen rings of $k$, and $k'$ respectively (Cohen rings are the analogous of Witt Vectors for imperfect fields). In fact maps between fields of characteristic $p$ lifts (not uniquely, hence not functorially) to their Cohen rings.
Do you have any information about the existence of such a Frobenius in the ramified case ? I need a Frobenius up to possibly extend my field $L$.
