Definition 65.12.1. Let $S \in \mathop{\mathrm{Ob}}\nolimits (\mathit{Sch}_{fppf})$ be a scheme. Let $F$ be an algebraic space over $S$.
A morphism of algebraic spaces over $S$ is called an open immersion if it is representable, and an open immersion in the sense of Definition 65.5.1.
An open subspace of $F$ is a subfunctor $F' \subset F$ such that $F'$ is an algebraic space and $F' \to F$ is an open immersion.
A morphism of algebraic spaces over $S$ is called a closed immersion if it is representable, and a closed immersion in the sense of Definition 65.5.1.
A closed subspace of $F$ is a subfunctor $F' \subset F$ such that $F'$ is an algebraic space and $F' \to F$ is a closed immersion.
A morphism of algebraic spaces over $S$ is called an immersion if it is representable, and an immersion in the sense of Definition 65.5.1.
A locally closed subspace of $F$ is a subfunctor $F' \subset F$ such that $F'$ is an algebraic space and $F' \to F$ is an immersion.
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