Working in some suitable extension of ZF, can we have a sequence of external [not appear in instances of separation and replacement] automorphisms $(j_n)_{n \in \omega}$ over the universe that move ranks dowardly, i.e. for some ordinal $\alpha$ [externally non-standard] we have $j(\alpha) < \alpha$ and $V_{j(\alpha)} \subsetneq V_\alpha$, in such a manner that there exists a limit stage $V_\alpha$ for $\alpha = \beta + \gamma $ for some countable limit ordinal $\gamma$, and we have: $$V_{j_n(\alpha)+1} \subsetneq V_{j_{n+1}(\alpha) +1} \\ \bigcup^{n \in \omega} V_{j_n(\alpha)+1} = V_\alpha $$
A related question is if the above is possible, can that be done in an extension of ZF in which Global choice hold?
