Given a scheme $X$, we know that there is a bijection between the points in $X$ and closed, irreducible subsets of $X$. Does that mean that every such point defines a closed subscheme of $X$ as it is the case for affine schemes? (Even if we don't hit all closed subschemes)
2026-04-12 12:36:03.1775997363
Does every point of a scheme define a closed subscheme of that scheme?
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