I am interested in a morphism of $S$-schemes $f : X \to Y$ such that $X$ and $Y$ are proper over $S$ and there is some $s_0 \in S$ such that $f : X_{s_0} \to Y_{s_0}$ is a closed immersion. Is it true that there is an open neighborhood $U \subset S$ of $s_0$ so that $X_U \to Y_U$ is a closed imme...