Lemma 37.68.4. Let $Z \to S$ and $X \to S$ be morphisms of schemes. Assume $Z \to S$ is finite locally free and $X \to S$ is separated and locally quasi-finite. Then $\mathit{Mor}_ S(Z, X)$ is representable by a scheme.
Lemma 37.68.4. Let $Z \to S$ and $X \to S$ be morphisms of schemes. Assume $Z \to S$ is finite locally free and $X \to S$ is separated and locally quasi-finite. Then $\mathit{Mor}_ S(Z, X)$ is representable by a scheme.
Proof. This follows from Lemmas 37.68.3 and 37.45.1. $\square$
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