Lemma 115.11.5. Let $f : X \to Y$ be a morphism schemes. Assume
$X$ and $Y$ are integral schemes,
$f$ is locally of finite type and dominant,
$f$ is either quasi-compact or separated,
$f$ is generically finite, i.e., one of (1) – (5) of Morphisms, Lemma 29.51.7 holds.
Then there is a nonempty open $V \subset Y$ such that $f^{-1}(V) \to V$ is finite locally free of degree $\deg (X/Y)$. In particular, the degrees of the fibres of $f^{-1}(V) \to V$ are bounded by $\deg (X/Y)$.
Proof. We may choose $V$ such that $f^{-1}(V) \to V$ is finite. Then we may shrink $V$ and assume that $f^{-1}(V) \to V$ is flat and of finite presentation by generic flatness (Morphisms, Proposition 29.27.1). Then the morphism is finite locally free by Morphisms, Lemma 29.48.2. Since $V$ is irreducible the morphism has a fixed degree. The final statement follows from this and Morphisms, Lemma 29.57.3. $\square$
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