Definition 26.3.3. Let $X$ be a locally ringed space. Let $U \subset X$ be an open subset. The locally ringed space $(U, \mathcal{O}_ U)$ of Example 26.3.2 above is the open subspace of $X$ associated to $U$.
Definition 26.3.3. Let $X$ be a locally ringed space. Let $U \subset X$ be an open subset. The locally ringed space $(U, \mathcal{O}_ U)$ of Example 26.3.2 above is the open subspace of $X$ associated to $U$.
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