Morphism of schemes is defined as morphism between ringed spaces, and the morphism is not a map (pair of maps), so we cannnot define notion of bijectivity of morphism in the category of schemes, is my understanding correct?
2026-02-23 14:09:45.1771855785
Why there is no notion ´bijective´ regarding morphism of schemes?
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You can say that a morphism of schemes is bijective if its underlying map of topological spaces has that property.