Parabolic induction

Template:Distinguish In algebraic geometry Chow's lemma, named after Wei-Liang Chow, roughly says that a proper morphism is fairly close to being a projective morphism. More precisely, a version of it states the following:^[1]

If X is a scheme that is proper over a noetherian base S, then there exists a projective S-scheme X' and S-morphism ${\displaystyle f:X^{\prime }\to X}$ that induces ${\displaystyle f^{-1}(U)\simeq U}$ for some open dense subset U.

Chow's lemma is one of the foundational results in algebraic geometry.

Proof

The proof here is a standard one (cf. Template:Harvnb).

It is easy to reduce to the case when X is irreducible. X is noetherian since it is of finite type over a noetherian base. Thus, we can find a finite open affine cover ${\displaystyle X={\displaystyle \bigcup _{i=1}^n}{U}_i}$. ${\displaystyle U_i}$ are quasi-projective over S; there are open immersions over S ${\displaystyle {\varphi }_i:U_i\to P_i}$ into some projective S-schemes ${\displaystyle P_i}$. Put ${\displaystyle U=\cap U_i}$. U is nonempty since X is irreducible. Let

${\displaystyle \varphi :U\to P=P_1{\times }_S\cdots {\times }_S{P}_n.}$

be given by ${\displaystyle {\varphi }_i}$'s restricted to ${\displaystyle U}$ over S. Let

${\displaystyle \psi :U\to X{\times }_{S}P.}$

be given by ${\displaystyle U\hookrightarrow X}$ and ${\displaystyle \varphi }$ over S. ${\displaystyle \psi }$ is then an immersion; thus, it factors as an open immersion followed by a closed immersion ${\displaystyle X^{\prime }\to X{\times }_{S}P}$. Let ${\displaystyle f:X^{\prime }\to X}$ be the immersion followed by the projection. We claim f induces ${\displaystyle f^{-1}(U)\simeq U}$; for that, it is enough to show ${\displaystyle f^{-1}(U)=\psi (U)}$. But this means that ${\displaystyle \psi (U)}$ is closed in ${\displaystyle U{\times }_{S}P}$. ${\displaystyle \psi }$ factorizes as ${\displaystyle U\stackrel{{\mathrm{\Gamma }}_{\varphi }}{\to }U{\times }_{S}P\to X{\times }_{S}P}$. ${\displaystyle P}$ is separated over S and so the graph morphism ${\displaystyle {\mathrm{\Gamma }}_{\varphi }}$ is a closed immersion. This proves our contention.

It remains to show ${\displaystyle X^{\prime }}$ is projective over S. Let ${\displaystyle g:X^{\prime }\to P}$ be the closed immersion followed by the projection. Showing that g is a closed immersion shows ${\displaystyle X^{\prime }}$ is projective over S. This can be checked locally. Identifying ${\displaystyle U_i}$ with its image in ${\displaystyle P_i}$ we suppress ${\displaystyle {\varphi }_i}$ from our notation.

Let ${\displaystyle V_i=p_i^{-1}(U_i)}$ where ${\displaystyle p_i:P\to P_i}$. We claim ${\displaystyle g^{-1}(V_i)}$ are an open cover of ${\displaystyle X^{\prime }}$. This would follow from ${\displaystyle f^{-1}(U_i)\subset g^{-1}(V_i)}$ as sets. This in turn follows from ${\displaystyle f=p_i\circ g}$ on ${\displaystyle U_i}$ as functions on the underlying topological space. Since X is separated over S and ${\displaystyle U_i}$ is dense, this is clear from looking at the relevant commutative diagram. Now, ${\displaystyle X{\times }_{S}P\to P}$ is closed since it is a base extension of the proper morphism ${\displaystyle X\to S}$. Thus, ${\displaystyle g(X^{\prime })}$ is a closed subscheme covered by ${\displaystyle V_i}$ and so it is enough to show for each i ${\displaystyle g:g^{-1}(V_i)\to V_i}$, denoted by ${\displaystyle h}$, is a closed immersion.

Fix i. Let ${\displaystyle Z}$ be the graph of ${\displaystyle u:V_i\stackrel{p_i}{\to }{U}_i\hookrightarrow X}$. It is a closed subscheme of ${\displaystyle X{\times }_S{V}_i}$ since ${\displaystyle X}$ is separated over S. Let ${\displaystyle q_1:X{\times }_{S}P\to X,q_2:X{\times }_{S}P\to P}$ be the projections. We claim ${\displaystyle h}$ factors through ${\displaystyle Z}$, which would imply ${\displaystyle h}$ is a closed immersion. But for ${\displaystyle w:U^{\prime }\to V_i}$ we have:

${\displaystyle v={\mathrm{\Gamma }}_u\circ w\iff q_1\circ v=u\circ q_2\circ v\iff q_1\circ \psi =u\circ q_2\circ \psi \iff q_1\circ \psi =u\circ \varphi .}$

The last equality holds and thus there is w that satisfies the first equality. This proves our claim. ${\displaystyle ◻}$

References

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