A nice example from recent work in set theory.

Theorem (Viale). Assume Martin's maximum, and that every limit cardinal is a strong limit. Suppose that $N$ is an inner model, that $N$ has the same cardinals as $V$, and that $V$ is a forcing extension of $N$. Then every $\omega_1$-sequence of ordinals is in $N$.

We actually expect that the assumptions that limit cardinals are strong limit, and that $V$ is a forcing extension of $N$, can be removed.