Morphism of varieties: Difference between revisions

Latest revision as of 16:27, 12 May 2008

Let $X$ and $Y$ be two varieties over a field $k$ (which we usually assume to be algebraically closed). A morphism from $X$ to $Y$ is a continuous map $ϕ : X \to Y$ such that:

For any open set $V \subseteq Y$ and any regular function $f : V \to k$ the map $ϕ \circ f : f^{- 1} (V) \to k$ is also a regular function.

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 For any open set <math>V \subseteq Y</math> and any [[regular function]] <math>f: V \to k</math> the map <math>\phi \circ f: f^{-1}(V) \to k</math> is also a regular function.
+==Related notions==
+* [[Rational map of varieties]]
+* [[Birational map of varieties]]
+* [[Isomorphism of varieties]]