Hilbert and Quot Functors

Hilbert and Quot functors

In this section, we will give definitions of $\mathcal{H}ilb$ and $\mathcal{Q}uot$ functors, which are the basis of the most moduli functors. We will consider those noetherian schemes over some noetherian scheme $Y$ .

Definition 1. For $X$ projective scheme over $k$ , $\mathcal{L}$ is an invertible sheaf on $X$ , $\mathcal{F}$ is coherent sheaf on $X$ . Then the function $\Phi(l)=\chi(X,\mathcal{F}\otimes \mathcal{L}^{\otimes l})$ is a polynomial in $\mathbb{Q}[t]$ . We call this polynomial Hilbert polynomial respect to $\mathcal{L}$ of $\mathcal{F}$ . (If using $\mathcal{O}_{X}$ as the coherent sheaf, we’ll call it the Hilbert polynomial of $X$ .)

Let $\mathrm{NSch}/Y$ denote the category of noetherian schemes over $Y$ , we now give the definition of Hilbert functor.

Definition 2. Let $f:X\to Y$ be a projective morphism of noetherian schemes, $\mathcal{L}$ be an invertible sheaf on $X$ . Let $\Phi\in \mathbb{Q}[t]$ be a polynomial. Define the Hilbert functor $\mathcal{H}ilb_{X /Y}^{\Phi,\mathcal{L}}: (\mathrm{NSch} /Y)^{op}\to \mathrm{Set}$ by ${H}ilb_{X /Y}^{\Phi,\mathcal{L}}(S)=\{\text{closed subschemes } Z \text{ of }X_{S}(=X\times_{Y}S) \text{ flat over } S \text{ s.t. for each }s\in S, \Phi_{s}=\Phi\}$ . Here $\Phi_{s}$ it the Hilbert polynomial of fibre $Z_{s}$ with respect to $\mathcal{L}_{s}$ (pullback of $\mathcal{L}$ along $Z_{s}\to \{s\}\to S$ ).

To make this definition more concrete, we need a lemma:

Lemma 1. Let $f:X\to Y$ be a projective morphism of noetherian schemes. Let $\mathcal{F}$ be a coherent sheaf on $X$ . If $\mathcal{F}$ is flat over $Y$ , then the Hilbert polynomial $\Phi_{y}$ of $\mathcal{F}_{y}$ on $X_{y}$ viewed as a function in $y$ is locally constant on $Y$ . If $Y$ is integral, then the converse also holds.

Proof

Proof. Ha³ III theorem 9.9. ◻

This lemma implies the functor ${H}ilb_{X /Y}^{\Phi,\mathcal{L}}$ is well-defined since the fibre has the same Hilbert polynomial. We also give a generalization of Hilbert functor:

Definition 3. Let $f:X\to Y$ be a projective morphism of noetherian schemes and $\mathcal{L}$ an invertible sheaf on $X$ , $\mathcal{F}$ coherent sheaf on $X$ . Let $\Phi\in \mathbb{Q}[t]$ be a polynomial. Then the Quot functor $\mathcal{Q}uot_{\mathcal{F}/X /Y}^{\Phi,\mathcal{L}}:(\mathrm{NSch}/Y)^{op}\to \mathrm{Set}$ by $\mathcal{Q}uot_{\mathcal{F}/X /Y}^{\Phi,\mathcal{L}}(S)=\{\text{coherent quotients } \mathcal{G} \text{ of } \mathcal{F}_{S} (\text{pullback of }\mathcal{F} \text{ to }X_{S}) \text{ flat over } S \text{ with } \Phi_{s} = \Phi\}$ . Here $\Phi_{s}$ is the Hilbert polynomial of the sheaf $\mathcal{G}_{s}$ on the fibre $X_{s}$ of $X_{S}\to S$ over $s\in S$ with respect to $\mathcal{L}$ .

The Hilbert functor is the special case of Quot functor when $\mathcal{F}=\mathcal{O}_{X}$ (consider the coherent ideal sheaves and their quotients). Now for any morphism $v:T\to S$ over $Y$ , the functor structure of $\mathcal{Q}uot_{\mathcal{F}/X /Y}^{\Phi,\mathcal{L}}$ is given by pulling back elements in $\mathcal{Q}uot_{\mathcal{F}/X /Y}^{\Phi,\mathcal{L}}(S)$ via $v$ . To check the Hilbert polynomial is the same, we can use the following lemma:

Lemma 2. Let $f:X\to Y$ be a projective morphism of noetherian schemes, $\mathcal{L}$ an invertible sheaf on $X$ , $\mathcal{F}$ a coherent sheaf on $X$ and $\mathcal{F}\to \mathcal{G}$ a coherent quotient such that $\mathcal{G}$ is flat over $Y$ with Hilbert polynomial $\Phi$ with respect to $\mathcal{L}$ . Let $g:S\to Y$ be a morphism from a noetherian scheme. Then $\mathcal{F}_{S}\to \mathcal{G}_{S}$ is a coherent quotient with $\mathcal{G}_{S}$ flat over $S$ with the Hilbert polynomial $\Phi$ .

Proof

Proof. Only need to show the assertion for Hilbert polynomial. Let $g(s)=y$ be some point in $Y$ and the corresponding fibres be $X_{S,s}$ and $X_{y}$ . The bottom arrow pullback square

is from the field extension $k(y)\to k(s)$ and thus a flat morphism. By the flat base change, $H^{i}(X_{y},\mathcal{F}_{y})\otimes k(s)=H^{i}(X_{S,s},\mathcal{F}_{s})$ , so $\dim_{k(y)}H^{i}(X_{y},\mathcal{F}_{y})=\dim_{k(s)}H^{i}(X_{S,s},\mathcal{F}_{s})$ . So $\chi(X_{y},\mathcal{F}_{y})=\chi(X_{S,s},\mathcal{F}_{s})$ and the Hilbert polynomial is the same by the same arguments. ◻

Definition 4. We say the functor $\mathcal{Q}uot_{\mathcal{F}/X /Y}^{\Phi,\mathcal{L}}$ is representable if we have the following:

a scheme $Quot_{\mathcal{F}/X /Y}^{\Phi,\mathcal{L}}$ in $\mathrm{NSch} /Y$ called the Quot scheme.
a coherent sheaf $\mathfrak{G}\in \mathcal{Q}uot_{\mathcal{F}/X /Y}^{\Phi,\mathcal{L}}(Quot_{\mathcal{F}/X /Y}^{\Phi,\mathcal{L}})$ on $X\times_{Y}Quot_{\mathcal{F}/X /Y}^{\Phi,\mathcal{L}}$ called the universal family.
the fundamental isomorphism $\mathrm{Hom}_{\mathrm{Sch}/Y}(S,Quot_{\mathcal{F}/X /Y}^{\Phi,\mathcal{L}})\xrightarrow{\simeq}\mathcal{Q}uot_{\mathcal{F}/X /Y}^{\Phi,\mathcal{L}}(S)$ which sends a morphism $S\to Quot_{\mathcal{F}/X /Y}^{\Phi,\mathcal{L}}$ to the pullback of $\mathfrak{G}$ via the induced morphism $X_{S}\to X\times_{Y} Quot_{\mathcal{F}/X /Y}^{\Phi,\mathcal{L}}$ .

When $\mathcal{F}=\mathcal{O}_{X}$ , we denote the $Quot_{\mathcal{F}/X /Y}^{\Phi,\mathcal{L}}$ by $Hilb_{X /Y}^{\Phi,\mathcal{L}}$ and call it the Hilbert scheme of $X$ over $Y$ respect to $\mathcal{L}$ .

Example 1. Let $f:X\to Y$ be a projective morphism of noetherian schemes, $\mathcal{L}=\mathcal{O}_{X}(1)$ , $\Phi=1$ . Then the closed subschemes of fibre of $f$ with Hilbert polynomial $\Phi$ are those closed points(Just note that $\deg \Phi=\dim \mathrm{Supp}\mathcal{O}_{X_{y}}$ ). We guess: $Hilb_{X /Y}^{\Phi,\mathcal{L}}=X$ and the universal family is the sheaf associated to the diagonal subscheme $\Delta$ of $X\times_{Y} X$ . Now we check it. If $S\in \mathrm{NSch}/ Y$ and $Z\subset X_{S}$ a closed subscheme flat over $S$ with fibres having Hilbert polynomial $\Phi$ , then $Z\to S$ is an isomorphism(consider those fibres). So we have the morphism $S\to X$ and $S\to \Delta$ as desired.

The Grassmannian

We start with an example

Example 2. Let $k$ be an algebraically closed field, $V$ an $n$ -dimensional vector space, $d\geq 0$ . The Grassmannian $Grass(V,d)$ is the space which parametrized the $(n-d)$ -dimensional subspace of $V$ . Let $W$ be a $d$ -dimensional $k$ vector space. Then any subspace $V'$ of $V$ of dimension $n-d$ is kernel of some $\phi:V\to W$ , and the matrix represented $M_{\phi}$ representing $\phi$ (up to an isomorphism of $W$ ). The set of all $d\times n$ matrices over $k$ is parametrized by the affine space $\mathbb{A}^{dn}$ and the subset of rank $d$ form an open set $U\subset \mathbb{A}^{dn}$ . So $Grass(V,d)$ is the quotient of $U$ by $GL(k,d)$ .

The Grassmannian can be described as follows: For any point in $Grass(V,d)$ , which is represented by a matrix $M$ , with entries $m_{ij}$ and columns $\gamma_{1},\dots, \gamma_{n}$ . Let $M_{I}$ be the $d\times d$ submatrix of $M$ with index set $I\subset \{1,\dots, n\}$ . After choosing appropriate representitives, we may assume $M_{I}$ is the identity matrix, and then the other entries not in $M_{I}$ are uniquely determined. So all points $M$ of $Grass(V,d)$ with $M_{I}\neq 0$ simply correspond to the points of $\mathbb{A}^{dn-d^{2}}$ . Let $G_{I}$ be the set of such points. For $I, J$ two index sets of columns, we let $G_{I,J}$ be the set of those points $M\in G_{I}$ with $\det M_{J}\neq 0$ . Define a morphism $f_{I,J}:G_{I,J}\to G_{J,I}$ by mapping $M$ to $M_{J}^{-1}M$ . If $I,J,K$ are three index sets of columns, then $f_{I,J}=f_{J,K}\circ f_{I,J}$ . $f_{I,I}=id$ so $f_{I,J}$ are all isomorphisms. We can give $Grass(V,d)$ a scheme structure by gluing $G_{I}$ via $f_{I,J}$ .

We will need the existence of Grassmannian.

Theorem 1. Let $Y$ be noetherian scheme and $\mathcal{E}$ a locally free sheaf of rank $n$ . Then there exists a unique (up to isomorphism) scheme $Grass(\mathcal{E},d)$ with a closed immersion into $\mathbb{P}(\wedge^{d}\mathcal{E})$ and the induced morphism $\pi: Grass(\mathcal{E},d)\to Y$ and a rank $d$ locally free quotient sheaf $\pi^{*}\mathcal{E}\to \mathfrak{G}$ satisfying: for any morhism $g:S\to Y$ and any rank $d$ locally free quotient $g^{*}\mathcal{E}\to \mathcal{G}$ , there’s a unique morphism $h:S\to Grass(\mathcal{E},d)$ over $Y$ s.t. $g^{*}\mathcal{E}\to \mathcal{G}$ is the pullback of $\pi^{*}\mathcal{E}\to \mathfrak{G}$ .

Proof

Proof. Omitted. See G&W² theorem 8.17. ◻

Corollary 1. Let $X=Y$ be noetherian scheme and $f:X\to Y$ the identity morphism, $\mathcal{L}=\mathcal{O}_{X}$ , $\mathcal{F}$ locally free sheaf of rank $n$ , $\Phi=d$ . Then $\mathcal{Q}uot_{\mathcal{F}/X /Y}^{\Phi,\mathcal{L}}$ is represented by $Grass(\mathcal{F},d)$ .

Proof

Proof. Let $g:S\to Y$ be a morphism from a noetherian scheme. The fibre $X_{s}=\mathrm{Spec} k(s)$ , and $\mathcal{F}_{s}$ is an $n$ -dimensional vector space. For $\mathcal{G}\in \mathcal{Q}uot_{\mathcal{F}/X /Y}^{\Phi,\mathcal{L}}(S)$ , consider $\mathcal{G}_{s}$ on the fibre $X_{s}$ , $\Phi_{s}=d$ so $\mathcal{G}_{s}$ is a $d$ -dimensional quotient of $\mathcal{F}_{s}$ . $\mathcal{G}$ is flat so it’s locally free of rank $d$ . By above theorem, the surjection $\mathcal{F}_{S}\to\mathcal{G}$ uniquely determines a morphism $h:S\to Grass(\mathcal{F},d)$ and $\pi^{*}\mathcal{F}\to \mathfrak{G}$ pulls back to $g^{*}\mathcal{F}\to \mathcal{G}$ . ◻

Castelnuovo-Mumford regularity

We start with a useful lemma:

Lemma 3. Let $X=\mathrm{Proj} A[t_{0},\dots,t_{n}]$ , $h\in A[t_{0},\dots, t_{n}]$ a homogeneous polynomial, and $H$ the closed subscheme defined by $h$ , $\mathcal{F}$ a coherent sheaf on $X$ . If $H$ does not contain any of the associated points of $\mathcal{F}$ , then the sequence $0\to \mathcal{F}\otimes \mathcal{O}(-H)\to \mathcal{F}\otimes\mathcal{O}_{X}\to \mathcal{F}\otimes\mathcal{O}_{H}\to 0$ is exact.

Proof

Proof. First the finiteness of associated points is by 05AF¹. The problem is local so we reduce to the affine case. The sequence $0\to \mathcal{O}_{X}(-H)\xrightarrow{\cdot h}\mathcal{O}_{X}\to \mathcal{O}_{H}\to 0$ is exact. Since $H$ does not contain any associated points of $\mathcal{F}$ , $h$ is not a zero divisor in $H^{0}(X,\mathcal{F})$ (c.f. 00LD¹). So $\mathcal{F}(-1)\xrightarrow{\cdot h}\mathcal{F}$ is injective. We have the desired exact sequence $0\to \mathcal{F}(-1)\xrightarrow{\cdot h}\mathcal{F}\to\mathcal{F}_{H}\to 0$ . ◻

Note that $\mathrm{Tor}_{1}(\mathcal{O}_{X},\mathcal{F})=0$ since $\mathcal{O}_{X}$ is flat, the exactness of the above sequence is equivalent to $\mathrm{Tor}_{1}(\mathcal{O}_{X},\mathcal{F})\to \mathrm{Tor}_{1}(\mathcal{O}_{H},\mathcal{F})$ is surjective. So we have $\mathrm{Tor}_{1}(\mathcal{O}_{H},\mathcal{F})=0$ .

Definition 5. Let $X$ be a projective scheme over a field $k$ , let $\mathcal{F}$ be a coherent sheaf on $X$ . The sheaf $\mathcal{F}$ is said to be $m$ -regular if $H^{p}(X,\mathcal{F}(m-p))=0$ for any $p>0$ (with the respect to a very ample sheaf $\mathcal{O}_{X}(1)$ ).

We give two useful theorems. They will be used in the proof of the main theorem.

Theorem 2. Let $X$ be a projective scheme over a field $k$ . Let $\mathcal{F}$ be a coherent sheaf on $X$ which is $m$ -regular. Then we have the following properties:

$\mathcal{F}$ is $l$ -regular for any $l\geq m$ .
the natural map $H^{0}(X,\mathcal{O}_{X}(1))\otimes H^{0}(X,\mathcal{F}(l))\to H^{0}(X,\mathcal{F}(l+1))$ is surjective for any $l\geq m$ .
$\mathcal{F}(l)$ is generated by global sections for any $l\geq m$ .

Proof

Proof. We first reduce to the case $X=\mathbb{P}_{k}^{n}$ . Let $i:X\to \mathbb{P}_{k}^{n}$ be the closed immersion. Note that $H^{i}(X,\mathcal{F}(l))=H^{i}(\mathbb{P}_{k}^{n},i_{*}\mathcal{F}(l))$ for any $i$ . Also $(i_{*}\mathcal{F})_{y}=\left\{\begin{aligned} &0& \text{if } y\neq i(x) \text{ for any }x\\ &\mathcal{F}_{x} &\text{if }y=i(x) \text{ for some }x \end{aligned}\right.$ . So $i_{*}\mathcal{F}(l)$ is generated by global sections if and only if $\mathcal{F}(l)$ is generated by global sections.

Now we assume $X=\mathbb{P}_{k}^{n}$ . Using the cohomology base change we may assume $k$ is infinite field. We use the induction on $n$ . The associated points of $\mathcal{F}$ forms a finite subset, so there’s a hyperplane $H$ which does not contain any associated point of $\mathcal{F}$ . Consider the exact sequence $0\to \mathcal{F}(m-i-1)\to \mathcal{F}(m-i)\to \mathcal{O}_{H}\to 0$ . Taking long exact sequence we get

\cdots\to H^{i}(X,\mathcal{F}(m-i))\to H^{i}(X,\mathcal{F}_{H}(m-i))\to H^{i+1}(X,\mathcal{F}(m-i-1))\to \cdots

so $\mathcal{F}_{H}$ is also $m$ -regular. Since $H\cong \mathbb{P}_{k}^{n-1}$ , by inductive hypothesis, the assertions also holds for $\mathcal{F}_{H}$ .

For 1, we can use induction on $l$ . From the exact sequence $H^{i}(X,\mathcal{F}(l-1))\to H^{i}(X,\mathcal{F}(l))\to H^{i}(X,\mathcal{F}_{H}(l))$ , the first and the last term vanishes by the inductive hypothesis. So $H^{i}(X,\mathcal{F}(l))=0$ and thus $\mathcal{F}$ is $l$ -regular.

For 2, consider the commutative diagram

The top morphism is the tensor product of two surjective morphism so it’s surjective. By inductive hypothesis, $\tau$ is also surjective, so $\nu\circ \mu$ is surjective and $H^{0}(X,\mathcal{F}(l+1))=\mathrm{im} \mu+\mathrm{ker}\nu$ . The bottom row is exact, we also have $H^{0}(X,\mathcal{F}(l+1))=\mathrm{im}\mu+\mathrm{im} \alpha$ . Note that $\alpha$ is given by tensoring the local section defining $H$ , so $\mathrm{im}\alpha\subset \mathrm{im}\mu$ . So $H^{0}(X,\mathcal{F}(l+1))=\mathrm{im} \mu$ .

For 3, consider the map $H^{0}(X,\mathcal{F}(l))\otimes H^{0}(X,\mathcal{O}_{X}(1))\to H^{0}(X,\mathcal{F}(l+1))$ which is surjective for all $l\geq m$ . For $p\gg 0$ , $\mathcal{F}(p+1)$ is generated by global sections, we only need to show $\mathcal{F}(p)$ is generated by global sections. It suffices to show $H^{0}(X,\mathcal{F}(p))\otimes_{k}\mathcal{O}_{X}\to \mathcal{F}(p)$ is surjective (consider the stalks!). Now consider the commutative diagram

$\alpha$ is surjective by 2 and $\beta_{p+1}$ is surjective since $\mathcal{F}(p+1)$ is generated by global sections. So $\beta_{p}$ is surjective, and $\mathcal{F}(p)$ is generated by global sections. ◻

Theorem 3. For any non-negative integer $p$ and $n$ , there exists a polynomial $\Psi_{p,n}\in \mathbb{Z}[x_{0},\dots,x_{n}]$ with the following property: Let $k$ be any field and $\mathcal{F}$ any coherent sheaf on $X=\mathbb{P}_{k}^{n}$ , which is a subsheaf of $\mathcal{O}_{X}^{p}$ . Let the Hilbert polynomial of $\mathcal{F}$ written in terms of binomial coefficients as $\chi(\mathcal{F}(r))=\sum\limits_{i=0}^{n}a_{i}\binom{n}{i}$ , where $a_{0},\dots, a_{n}\in \mathbb{Z}$ . Then $\mathcal{F}$ is $m$ -regular, $m=\Psi_{p,n}(a_{0},\dots,a_{n})$ .

Proof

Proof. We may use base change to assume $k$ is infinite. We proceed by induction on $n$ . The base case $n=0$ : it’s clear that any polynomial $\Psi_{p,0}$ satisfies the requirement. For $n\geq 1$ , let $H\subset X$ be a hyperplane which does not contain any of the associated points of $\mathcal{O}_{X}^{p} /\mathcal{F}$ . Then the torsion group $\mathrm{Tor}_{1}(\mathcal{O}_{H},\mathcal{O}_{X}^{p} /\mathcal{F})=0$ . Therefore the exact sequence $0\to \mathcal{F}\to \mathcal{O}_{X}^{p}\to \mathcal{O}_{X}^{p} /\mathcal{F}\to 0$ restrict to $H$ gives an exact sequence $0\to \mathcal{F}_{H}\to \mathcal{O}_{H}^{p}\to \mathcal{O}_{H}^{p} /\mathcal{F}\to 0$ , i.e. $\mathcal{F}_{H}$ is a subsheaf of $\mathcal{O}_{H}^{p}\cong \mathcal{O}_{\mathbb{P}_{k}^{n-1}}^{p}$ .

Consider the exact sequence $0\to \mathcal{F}(-1)\to \mathcal{F}\to \mathcal{F}_{H}\to 0$ , we have

\chi(\mathcal{F}_{H}(r))=\chi(\mathcal{F}(r))-\chi(\mathcal{F}(r-1))=\sum_{i=0}^{n}a_{i}\binom{r}{i}-\sum_{i=0}^{n}a_{i}\binom{r-1}{i-1}=\sum_{j=0}^{n-1}b_{j}\binom{r}{j}

where $b_{j}=g_{j}(a_{0},\dots,a_{n})$ , $g_{j}$ are polynomial with integral coefficients independent of $k$ and $\mathcal{F}$ . By inductive hypothesis on $n-1$ , there exists a polynomial $\Psi_{p,n-1}(x_{0},\dots,x_{n-1})$ such that $\mathcal{F}_{H}$ is $m_{0}$ -regular where $m_{0}=\Psi_{p,n-1}(b_{0},\dots,b_{n-1})=G(a_{0},\dots,a_{n})$ , where $G$ is a polynomial with integral coefficients independent of $k$ and the sheaf $\mathcal{F}$ . For $m\geq m_{0}-1$ , we get a long exact sequence

0\to H^{0}(X,\mathcal{F}(m-1))\to H^{0}(X,\mathcal{F}(m))\xrightarrow{\nu_{m}}H^{0}(H,\mathcal{F}_{H}(m))\to H^{1}(X,\mathcal{F}(m))\to H^{1}(X,\mathcal{F}(m))\to \cdots

which for $i\geq 2$ gives isomorphisms $H^{i}(X,\mathcal{F}(-1))\cong H^{i}(X,\mathcal{F}(m))$ . As we have $H^{i}(X,\mathcal{F}(m))=0$ for $m\gg 0$ , these equalities show that $H^{i}(X,\mathcal{F}(m))=0$ for all $i\geq 2$ and $m\geq m_{0}-2$ . The surjections $H^{1}(X,\mathcal{F}(m-1))\to H^{1}(X,\mathcal{F}(m))$ show that the function $h^{1}(\mathcal{F}(m))=\dim_{k}H^{1}(X,\mathcal{F}(m))$ is descending for $m\geq m_{0}-2$ . We show that $h^{1}(\mathcal{F}(m))$ is strictly descending for $m\geq m_{0}$ till the value reaches 0, which would implies that $H^{1}(X,\mathcal{F}(m))=0$ for all $m\geq m_{0}+h^{1}(\mathcal{F}(m_{0}))$ : Note that $h^{1}(\mathcal{F}(m-1))\geq h^{1}(\mathcal{F}(m))$ for $m\geq m_{0}$ , and moreover eqality holds for some $m\geq m_{0}$ if and only if the restriction map $\nu_{m}:H^{0}(X,\mathcal{F}(m))\to H^{0}(X,\mathcal{F}_{H}(m))$ is surjective. $\mathcal{F}_{H}$ is $m_{0}$ -regular, $H^{0}(H,\mathcal{O}_{H}(1))\otimes H^{0}(H,\mathcal{F}_{H}(r))\to H^{0}(H,\mathcal{F}_{H}(r+1))$ is surjective. Using the commutative diagram

we know that $\nu_{m}:H^{0}(X,\mathcal{F}(r))\to H^{0}(H,\mathcal{F}_{H}(r))$ surjective implies $\nu_{j}:H^{0}(X,\mathcal{F}(j))\to H^{0}(H,\mathcal{F}_{H}(j))$ surjective for all $j\geq r$ , $r\geq m$ . So once $h^{1}(\mathcal{F}(j-1))=h^{1}(\mathcal{F}(j))$ then $h^{1}(\mathcal{F}(j-1))=h^{1}(\mathcal{F}(r))$ for any $r\geq j$ . Since $h^{1}(\mathcal{F}(j))=0$ for $j\gg 0$ , $h^{1}(\mathcal{F}(m))$ is strictly decreasing for $m\geq m_{0}$ till the value reaches 0.

Now we give a suitable upper bound for $h^{1}(\mathcal{F}(m_{0}))$ . Since $\mathcal{F}\subset \mathcal{O}_{X}^{p}$ , we have $h^{0}(\mathcal{F}(r))\leq p h^{0}(\mathcal{O}_{\mathbb{P}_{k}^{n}}(r))=p\binom{n+r}{n}$ . $h^{1}(\mathcal{F}(m))=0$ for $i\geq 2$ , $m\geq m_{0}-2$ , so

h^{1}(\mathcal{F}(m_{0}))=h^{0}(\mathcal{F}(m_{0}))-\chi(\mathcal{F}(m_{0}))\leq p\binom{n+m_{0}}{n}-\sum_{i=0}^{n}a_{i}\binom{m_{0}}{i}=P(a_{0},\dots,a_{n})

where $P(a_{0},\dots,a_{n})$ is a polynomial in $a_{0},\dots, a_{n}$ , by substituting $m_{0}=G(a_{0},\dots,a_{n})$ . Thus the coefficients of $P(x_{0},\dots,x_{n})$ is independent of $k$ and sheaf $\mathcal{F}$ . Since $h^{1}(\mathcal{F}(m_{0}))\geq 0$ , we must have $P(a_{0},\dots,a_{n})\geq 0$ . Therefore $H^{1}(X,\mathcal{F}(m))=0$ for $m\geq G(a_{0},\dots,a_{n})+P(a_{0},\dots,a_{n})$ . Take $\Psi_{p,n}(x_{0},\dots,x_{n})=G(x_{0},\dots,x_{n})+P(x_{0},\dots,x_{n})$ and noting that $P(a_{0},\dots,a_{n})\geq 0$ , we know $\mathcal{F}$ is $\Psi_{p,n}(a_{0},\dots,a_{n})$ -regular. ◻

Stratification of Hilbert polynomial

We state a commutative algebra lemma and its corollary first.

Lemma 4. Let $A$ be a noetherian domain, $B$ a finite type $A$ -algebra. Let $M$ be a finite type $B$ -module and. Then there exists $f\in A$ , $f\neq 0$ such that $M_{f}$ if free over $A$ .

Corollary 2 (generic flatness). Let $S$ be a noetherian integral scheme. Let $p:X\to S$ be a finite type morphism and let $\mathcal{F}$ be a coherent sheaf on $X$ . Then there exists a nonempty open subscheme $U\subset S$ such that the restriction of $\mathcal{F}$ to $X_{U}=p^{-1}(U)$ is flat over $\mathcal{O}_{U}$ .

Theorem 4 (base change without flatness). Let $f:X\to Y$ be a projective morphism, $u:Y'\to Y$ a morphism between noetherian schemes. Let $\mathcal{F}$ be a coherent sheaf on $X$ . Then the base change morphism $u^{*}f_{*}\mathcal{F}(d)\to f'_{*}u'^{*}\mathcal{F}(d)$ is an isomorphism for $d\gg 0$ .

Proof

Proof. The problem is local on $Y$ so we may assume $Y=\mathrm{Spec}A$ . We also reduce to the case $Y'=\mathrm{Spec} A'$ and $X=\mathbb{P}_{A}^{n}$ using flat base change. Take a resolution $\bigoplus\limits_{i}\mathcal{O}_{X}(a_{i})\to \bigoplus\limits_{j}\mathcal{O}_{X}(b_{j})\to \mathcal{F}\to 0$ and pull back this exact sequence via $u'$ , we get $\bigoplus\limits_{i}\mathcal{O}_{X'}(a_{i})\to \bigoplus\limits_{j}\mathcal{O}_{X'}(b_{j})\to u^{*}\mathcal{F}\to 0$ . After twisting by $\mathcal{O}_{X}(d)$ (resp. $\mathcal{O}_{X'}(d)$ ) for $d\gg 0$ , those higher cohomology vanish so apply $H^{0}$ gives a resolution of $H^{0}(X,\mathcal{F}(d))$ as $A$ -module and $H^{0}(X',u'^{*}\mathcal{F}(d))$ as $A'$ -module. Note the sections of $\mathcal{O}_{X}(a)$ are just the degree $a$ polynomials over $A$ , we have $H^{0}(X,\mathcal{O}_{X}(a))\otimes_{A} A'\cong H^{0}(X',\mathcal{O}_{X'}(a))$ . Tensoring $A'$ with the resolution of $H^{0}(X,\mathcal{F}(d))$ we get a resolution of $H^{0}(X,\mathcal{F}(d))\otimes_{A} A'$ , which is also a resolution of $H^{0}(X',u'^{*}\mathcal{F}(d))$ . Since the base change morphism commutes with those for $\mathcal{F}(d)$ , we conclude that the base change morphism of $\mathcal{F}(d)$ is an isomorphism. ◻

Theorem 5. Let $f:X\to Y$ be a projective morphism of noetherian schemes and $\mathcal{F}$ a coherent sheaf on $X$ . Then $f$ is flat over $Y$ if and only if $f_{*}\mathcal{F}(d)$ is finite rank locally free sheaf for $d\gg 0$ .

Proof

Proof. The problem is local on $Y$ so we may assume $Y=\mathrm{Spec}A$ , where $A$ is a noetherian local ring. Then the theorem becomes: $\mathcal{F}$ is flat if and only if $H^{0}(X,\mathcal{F}(d))$ is free $A$ -module for $d\gg 0$ . This is what we proved in Ha³ III theorem 9.9. ◻

Theorem 6. Let $f:X\to S$ be a projective morphism over noetherian scheme $S$ . Let $\mathcal{F}$ be a coherent sheaf on $X$ . For each polynomial $P$ there exists a locally closed subscheme $S_{p}$ of $S$ such that a morphism $\varphi:T\to S$ factors through $S_{p}$ if and only if $\varphi^{*}\mathcal{F}$ on $X_{T}$ is flat over $T$ with Hilbert polynomial $P$ . Moreover, $S_{P}$ is nonempty for finitely many $P$ and the disjoint union of inclusions $i:S'=\coprod\limits_{P}S_{P}\to S$ induces a bijection on underlying set.

Proof

Proof. We first do for the special case $X=S$ . For any $s\in S$ , the fibre $\mathcal{F}_{s}$ is just the pullback of $\mathcal{F}$ to $\mathrm{Spec}k(s)$ and the Hilbert polynomial is degree 0 polynomial $e=\dim_{k(s)}\mathcal{F}_{s}\in \mathbb{Q}[t]$ . By the geometric Nakayama lemma, any basis $\mathcal{F}_{s}$ also gives a set of generators of $\mathcal{F}|_{U}$ for some $U$ contains $s$ . After shrinking to a smaller subset, we may assume there’s a surjective morphism $\mathcal{O}_{V}^{e}\to \mathcal{F}_{V}\to 0$ , and therefore an exact sequence $\mathcal{O}_{V}^{m}\xrightarrow{\psi} \mathcal{O}_{V}^{e}\xrightarrow{\phi}\mathcal{F}_{V}\to 0$ . Let $\mathcal{I}_{e}$ be the ideal sheaf corresponding to the $e\times m$ matrix $(\psi_{ij})$ of $\mathcal{O}_{V}^{m}\xrightarrow{\psi} \mathcal{O}_{V}^{e}$ . Let $V_{e}$ be the closed subscheme of $V$ defined by $\mathcal{I}_{e}$ . For any morphism $f:T\to V$ , the pullback $\mathcal{O}_{T}^{m}\to \mathcal{O}_{T}^{e}\to f^{*}\mathcal{F}\to 0$ is exact. Hence $f^{*}\mathcal{F}$ is free $\mathcal{O}_{T}$ -module if and only if $f^{*}\psi=0$ , i.e. $f$ factors through the subscheme $V_{e}$ defined by vanishing of all $\psi_{ij}$ . We established the strata for the special case.

Now we do the stratification for the general case. Let $Y$ be an irreducible component of $S$ . $U$ be the nonempty open subset of $Y$ which consists of all the points of $Y$ which are not in the other irreducible components of $S$ . Let $U$ have the reduced induced subscheme structure. Then it’s clear $U$ is an integral scheme and a locally closed subscheme of $S$ . By the generic flatness, $U$ has a nonempty open subscheme $V$ such that the restriction of $\mathcal{F}$ to $X_{V}$ is flat over $\mathcal{O}_{V}$ . Now repeating the argument with $S$ replaced by the reduced closed subscheme $S-V$ , it follows from the noetherian induction on $S$ that there exist finitely many reduced locally closed disjoint subscheme $V_{i}$ of $S$ such that on the underlying space $\left| S \right| =\cup \left| V_{i} \right|$ and the restriction of $\mathcal{F}$ to $X_{V_{i}}$ is flat over $\mathcal{O}_{V_{i}}$ . As $V_{i}$ noetherian, the Hilbert polynomials are locally constant. So there’re only finitely many distinct Hilbert polynomials.

Denote $f_{i}:X_{i}\to V_{i}$ be the pullbacks of $X\to S$ on $V_{i}$ and $\mathcal{F}_{i}=f_{i}^{*}\mathcal{F}$ . Then there’re finitely many polynomials $\{P_{1}(d),\dots, P_{m}(d)\}$ such that for each $s\in S$ , $P_{\mathcal{F}_{s}}(d)=P_{m}$ for some $m$ . Note that there’s $d_{i}$ such that $R^{q}f_{i*}\mathcal{F}_{i}(d)=0$ for all $d\geq d_{i}$ and then by base change, $f_{i*}\mathcal{F}_{i}(d)$ is locally free of rank $P_{\mathcal{F}_{s}}(d)$ and the base change map
$f_{i*}\mathcal{F}_{i}(d)\otimes k(s)\to H^{0}(X_{s},\mathcal{F}_{s}(d))$ is isomorphism. See Ha³ III theorem 12.11. Let $N=\max\{d_{1},\dots, d_{m}\}$ , we now have:

There are finitely many polynomials $P_{1},\dots, P_{m}$ such that for each $s\in S$ , $P_{\mathcal{F}_{s}}(d)=P_{i}(d)$ for some $i$ .
$H^{i}(X_{s},\mathcal{F}_{s}(d))=0$ for all $i>0$ and $d\geq N$ .
$f_{*}\mathcal{F}(d)\otimes k(s)\cong H^{0}(X_{s},\mathcal{F}_{s}(d))$ has dimension $P_{i}(d)$ for all $d\geq N$ .

Pick $n$ such that $\deg P_{\mathcal{F}_{s}}(d)\leq n$ for all $s\in S$ . We have the following fact:

Let $\mathrm{Pol}_{n}$ be the set of polynomials over $\mathbb{Q}$ of degree at most $n$ . Then for any $N$ , $\mathrm{Pol}_{n}\to \mathbb{Z}^{n+1}$ given by $P\mapsto (P(N),\dots, P(N+n))$ is a bijection.

Now apply the stratification for the special case of the coherent sheaves $\{\mathcal{E}_{i}:f_{*}\mathcal{F}(N+i)\}_{i=0}^{n}$ on $S$ . Thus for each $i$ and $e$ , we have a stratum $W_{i,e}$ by the base change properties 2. and 3., we have $e=\mathrm{rank}\mathcal{E}_{i}|_{W_{i,e}}=P_{\mathcal{F}_{s}}(N+i)$ . For any sequence $(e_{0},\dots,e_{n})\in \mathbb{Z}^{n+1}$ which by the fact above, corresponding to a polynomial $P$ , we know as the schematic intersection $W_{P}^{0}=\bigcap\limits_{i=0}^{n}W_{i,e}$ . By definition, a map $\varphi:T\to S$ factors through $W_{P}^{0}$ if and only if $\varphi^{*}f_{*}\mathcal{F}(N+i)$ is locally free of rank $e_{i}=P(N+i)$ for $i=0,\dots, n$ . In particular, $s\in W_{P}^{0}$ , if and only if $P_{\mathcal{F}_{s}}(d)=P(d)$ and so by the flatness the Hilbert polynomials $\{W_{P}^{0}\}$ is a finite locally closed stratification of $S$ which has the correct underlying space. We also need to determine the scheme structure. By 2., we know that the formation of $f_{*}\mathcal{F}(N+a)$ is compatible with arbitary base change for all $a\geq 0$ . Now for each $d\geq 0$ , apply the stratification to the sheaf $f_{*}\mathcal{F}(N+n+d)|_{W_{P}^{0}}$ to obtain a locally closed subscheme $W_{P}^{d}$ . On $W_{P}^{d}$ , the sheaf $f_{*}\mathcal{F}(N+d+n)|_{W_{P}^{d}}$ is locally free of rank $P(N+n+d)$ . Note at each closed point of $W_{P}^{0}$ , the rank of $f_{*}\mathcal{F}(N+n+d)$ is exactly $P(N+n+d)$ , so $W_{P}^{d}$ has the same underlying reduced subscheme. In particular, it’s a closed subscheme of $W_{P}^{0}$ and it is cut out by some ideal sheaf $\mathcal{I}_{P}^{d}$ . Consider the chain $I_{P}^{1}\subset \mathcal{I}_{P}^{1}+\mathcal{I}_{P}^{2}\subset \cdots$ . By the noetherian property, the chain is stabled and the final ideal sheaf is $\mathcal{I}$ . Let the closed subscheme corresponding to $\mathcal{I}$ be $S_{P}$ (or equivalently, $S_{P}$ is the schematic intersection of all $W_{P}^{d}$ ).

$S_{P}$ forms a stratification of $S$ . By the definition $\varphi:T\to S$ factors through $S_{P}$ if and only if for all $a\geq 0$ , $\varphi^{*}f_{*}\mathcal{F}(N+a)$ is locally free of rank $P(N+a)$ , but by the base change, $\varphi^{*}f_{*}\mathcal{F}(N+a)=(f_{T})_{*}\mathcal{F}_{T}(N+a)$ . Thus $\varphi:T\to S$ factors through $S_{P}$ if and only if $(f_{T})_{*}\mathcal{F}_{T}(N+a)$ is locally free of rank $P(N+a)$ for all $a\geq 0$ if and only if $\mathcal{F}_{T}$ is flat over $T$ with Hilbert polynomial $P(d)$ . ◻

Moreover, the pullback sheaf $\mathcal{F}_{S'}$ is flat over $S$ and any morphism $\varphi:T\to S$ factor through $S'$ if $\mathcal{F}_{T}$ is flat over $T$ .

Grothendieck Existence Theorem

Theorem 7. Let $f:X\to Y$ be a projective morphism noetherian schemes. $\mathcal{L}=\mathcal{O}_{X}(1)$ is very ample sheaf over $Y$ . $\Phi\in \mathbb{Q}[t]$ is a polynomial. Let $\mathcal{F}$ be a coherent sheaf on $X$ which is a quotient of some sheaf $\mathcal{E}=\mathcal{O}_{X}(m)^{r}$ for some $r\in \mathbb{N}$ , $m\in \mathbb{Z}$ . Then the quotient functor $\mathcal{Q}uot_{\mathcal{F}/X /Y}^{\Phi,\mathcal{L}}$ is represented by a scheme $Quot_{\mathcal{F}/X /Y}^{\Phi,\mathcal{L}}$ which is projective over $Y$ .

Note if $Y$ is affine noetherian scheme, any coherent sheaf is a quotient of some $\mathcal{O}_{X}(m)^{r}$ . See Ha³ II theorem 5.18.

We will do the proof in a lemma and several steps.

Proof

Proof. Step 1. Replace $\mathcal{F}$ by $\mathcal{F}(-m)$ . Let $\Psi$ be the polynomial defined by $\Psi(t)=\Psi(t-m)$ . We have a natural isomorphism $\mathcal{Q}uot_{\mathcal{F}/X /Y}^{\Phi,\mathcal{L}}\to \mathcal{Q}uot_{\mathcal{F}(-m)/X /Y}^{\Psi,\mathcal{L}}$ by mapping the coherent quotient $\mathcal{F}_{S}\to \mathcal{G}$ to $\mathcal{F}_{S}(-m)\to \mathcal{G}(-m)$ for any noetherian scheme $S$ over $Y$ . So we may replace $\mathcal{F}$ by $\mathcal{F}(-m)$ and we may assume $\mathcal{E}=\mathcal{O}_{X}^{r}$ .

Step 2. Take a closed immersion $e:X\to \mathbb{P}_{Y}^{n}$ such that $\mathcal{L}=e^{*}\mathcal{O}_{\mathbb{P}_{Y}^{n}}(1)$ . Then there’s a natural isomorphism $\mathcal{Q}uot_{\mathcal{F}/X /Y}^{\Phi,\mathcal{L}}\to \mathcal{Q}uot_{e_{*}\mathcal{F}/\mathbb{P}_{Y}^{n} /Y}^{\Phi,\mathcal{O}_{\mathbb{P}_{Y}^{n}}(1)}$ : for any morphism $S\to Y$ from a noetherian scheme and any quotient $\mathcal{F}_{S}\to \mathcal{G}$ in $\mathcal{Q}uot_{\mathcal{F}/X /Y}^{\Phi,\mathcal{L}}(S)$ , the morphism $e_{S*}\mathcal{F}_{S}\to e_{S*}\mathcal{G}$ is a quotient in $\mathcal{Q}uot_{e_{*}\mathcal{F} \mathbb{P}_{Y}^{n}/ Y}^{\Phi,\mathcal{O}_{\mathbb{P}_{Y}^{n}(1)}}(S)$ , where $e_{S}$ is the pullback of $e$ along $S\to Y$ . It’s clear that $e_{S*}\mathcal{F}_{S}$ is the pullback of $e_{*}\mathcal{F}$ along $\mathbb{P}_{S}^{n}\to \mathbb{P}_{Y}^{n}$ .

Conversely, if $e_{S*}\mathcal{F}_{S}\to \mathcal{G}'$ is a quotient in $\mathcal{Q}uot_{e_{*}\mathcal{F} /\mathbb{P}_{Y}^{n}/ Y}^{\Phi,\mathcal{O}_{\mathbb{P}_{Y}^{n}}(1)}(S)$ , then $\mathcal{G}'$ is a $\mathcal{O}_{X}$ -module. Note that $X_{S}\to \mathbb{P}_{S}^{n}$ is a closed immersion and $\mathrm{Supp} \mathcal{G}'\subset \mathrm{im}(e_{S})$ , let $\mathcal{G}=e_{S}^{*}\mathcal{G}'$ , then $e_{S*}\mathcal{G}=\mathcal{G}'$ . SO the quotient $e_{S*}\mathcal{F}_{S}\to \mathcal{G}'$ is the direct image of $\mathcal{F}_{S}\to \mathcal{G}$ . The surjection $\mathcal{E}=\mathcal{O}_{X}^{r}\to \mathcal{F}$ gives the surjection $e_{*}\mathcal{E}\to \mathcal{e}_{*}\mathcal{F}$ and thus induces $\mathcal{O}_{\mathbb{P}_{Y}^{n}}^{r}\to e_{*}\mathcal{F}$ (note that $e$ is closed immersion thus $e_{*}$ is exact). Therefore we may assume $X=\mathbb{P}_{Y}^{n}$ , $\mathcal{L}=\mathcal{O}_{X}(1)$ and $\mathcal{E}=\mathcal{O}_{X}^{r}$ .

Step 3. The surjective morphism $\mathcal{E}=\mathcal{O}_{X}^{r}\to \mathcal{F}$ induces a natural transformation of functors $\mathcal{Q}uot_{\mathcal{F}/X /Y}^{\Phi,\mathcal{L}}\to \mathcal{Q}uot_{\mathcal{E}/X /Y}^{\Phi,\mathcal{L}}$ , which is defined by sending a quotient $\mathcal{F}_{S}\to \mathcal{G}$ in $\mathcal{Q}uot_{\mathcal{F}/X /Y}^{\Phi,\mathcal{L}}(S)$ to the induced quotient $\mathcal{E}_{S}\to \mathcal{G}$ . By the lemma below, if $\mathcal{Q}uot_{\mathcal{E}/X /Y}^{\Phi,\mathcal{L}}$ is represented by $Quot_{\mathcal{E}/X /Y}^{\Phi,\mathcal{L}}$ , then $\mathcal{Q}uot_{\mathcal{F}/X /Y}^{\Phi,\mathcal{L}}$ is represented by a closed subscheme $Quot_{\mathcal{F}/X /Y}^{\Phi,\mathcal{L}}$ of $Quot_{\mathcal{E}/X /Y}^{\Phi,\mathcal{L}}$ . Thus we may take $\mathcal{F}=\mathcal{E}=\mathcal{O}_{X}^{r}$ .

Step 4. We show that there’s $l\gg 0$ such that for any morphism $g:S\to Y$ and any quotient $\mathcal{F}_{S}\to \mathcal{G}$ in $\mathcal{Q}uot_{\mathcal{F}/X /Y}^{\Phi,\mathcal{L}}(S)$ with kernel $\mathcal{K}$ , the induced exact sequence

0\to f_{S*}\mathcal{K}(l)\to f_{S*}\mathcal{F}_{S}(l)\to f_{S*}\mathcal{G}(l)\to 0

is exact sequence of locally free sheaves.

For any point $s\in S$ , the sequence $0\to \mathcal{K}_{s}\to \mathcal{F}_{s}\to \mathcal{G}_{s}\to 0$ is exact on the fibre $X_{s}=\mathbb{P}_{k(s)}^{n}$ since $\mathcal{G}_{s}$ is flat over $\mathcal{O}_{X_{s}}$ . $\mathcal{K}_{s}$ is a subsheaf of $\mathcal{F}_{s}=\mathcal{O}_{X_{s}}^{r}$ . Since the Hilbert polynomial of $\mathcal{K}_{s}$ is independent of $s$ , by regularity theorem, there’s $l\gg 0$ independent on $s$ such that $\mathcal{K}_{s}$ is $l$ -regular. So we have $H^{p}(X_{s},\mathcal{K}(l)_{s})=0$ for $p>0$ . The vanishing of $H^{p}(X_{s},\mathcal{F}_{S}(l)_{s})$ for $p>0$ implies that $H^{p}(X_{s},\mathcal{G}(l)_{s})=0$ and $\mathcal{K}(l)_{s}$ , $\mathcal{F}_{S}(l)_{s}$ and $\mathcal{G}(l)_{s}$ are generated by global sections. By Ha³ III theorem 12.11 and inverse induction, $R^{p}f_{S*}\mathcal{K}(l)=0$ , $R^{p}f_{S*}\mathcal{F}_{S}(l)=0$ and $R^{p}f_{S*}\mathcal{G}(l)=0$ if $p>0$ . So the sequence $0\to f_{S*}\mathcal{K}(l)\to f_{S*}\mathcal{F}_{S}(l)\to f_{S*}\mathcal{G}(l)\to 0$ is exact sequence of locally free sheaves. Then in the diagram

the maps $\alpha$ , $\beta$ , $\gamma$ are surjective: The problem is local so we may assume $Y$ is affine. For any $s\in S$ , by Ha³ III theorem 12.11, $f_{S*}\mathcal{K}(l)\otimes k(s)=H^{0}(X_{s},\mathcal{K}(l)\otimes k(s))\to H^{0}(X_{s},\mathcal{K}(l)_{s})$ is an isomorphism. Now the pullback of sheaf $f_{S*}\mathcal{K}(l)\otimes k(s)$ on $X_{s}$ is $f_{S*}\mathcal{K}(l)\otimes k(s)\otimes \mathcal{O}_{X_{s}}\cong H^{0}(X_{s},\mathcal{K}(l)_{s})\otimes\mathcal{O}_{X_{s}}$ . Since $\mathcal{K}(l)_{s}$ is generated by global sections, there’s a surjection $f_{S*}\mathcal{K}(l)\otimes k(s)\otimes\mathcal{O}_{X_{s}}\to \mathcal{K}(l)_{s}$ . So $\alpha$ is surjection on each $X_{s}$ . Similar for $\gamma$ and $\beta$ .

Step 5. In Step 4, we constructed $f_{S*}\mathcal{F}_{S}(l)\to f_{S*}\mathcal{G}$ which is actually an element of $\mathcal{Q}uot_{f_{*}\mathcal{F}(l) /X/Y}^{\Phi(l),\mathcal{O}_{Y}}(S)$ where $\Phi(l)$ is the constant polynomial(We are using the isomorphism $f_{S*}\mathcal{F}_{S}(l)\cong g^{*}f_{*}\mathcal{F}(l)$ which follows from the fact that $X=\mathbb{P}_{Y}^{n}$ , $\mathcal{F}=\mathcal{O}_{X}^{r}$ and the natural map $g^{*}f_{*}\mathcal{F}(l)\otimes k(s)\to f_{S*}\mathcal{F}_{S}(l)\otimes k(s)$ is isomorphism for each $s\in S$ ). We get a natural transformation $\mathcal{Q}uot_{\mathcal{F} /X/Y}^{\Phi,\mathcal{L}}\to \mathcal{Q}uot_{f_{*}\mathcal{F}(l) /X/Y}^{\Phi(l),\mathcal{O}_{Y}}$ , which is injective in the sense that for any morphism $g:S\to Y$ between noetherian schemes, the map $\mathcal{Q}uot_{\mathcal{F} / X /Y}^{\Phi,\mathcal{L}}(S)\to \mathcal{Q}uot_{f_{*}\mathcal{F}(l) /X/Y}^{\Phi(l),\mathcal{O}_{Y}}(S)$ is injective: If $\mathcal{F}_{S}\to \mathcal{G}$ and $\mathcal{F}_{S}\to \mathcal{G}'$ induces the same quotient $f_{S*}\mathcal{F}_{S}(l)\to f_{S*}\mathcal{G}(l)$ and $f_{S*}\mathcal{F}_{S}(l)\to f_{S*}\mathcal{G}'(l)$ . Then $f_{S*}\mathcal{K}(l)=f_{S*}\mathcal{K}'(l)$ where $\mathcal{K}$ and $\mathcal{K}'$ are the corresponding kernels. Thus $f_{S}^{*}f_{S*}\mathcal{K}(l)=f_{S}^{*}f_{S*}\mathcal{K}'(l)$ . Note that the diagram in Step 4 shows both $\mathcal{K}(l)$ and $\mathcal{K}'(l)$ are the image of $f_{S}^{*}f_{S*}\mathcal{K}(l)$ under $f_{S}^{*}f_{S*}\mathcal{F}(l)\to \mathcal{F}(l)$ . So $\mathcal{K}(l)=\mathcal{K}'(l)$ and $\mathcal{K}=\mathcal{K}'$ . So $\mathcal{F}_{S}\to \mathcal{G}$ and $\mathcal{F}_{S}\to \mathcal{G}'$ are the same.

Step 6. From the corollary above $\mathcal{Q}uot_{f_{*}\mathcal{F}(l) /X/Y}^{\Phi(l),\mathcal{O}_{Y}}$ is represented by Grassmannian $G=Grass(f_{*}\mathcal{F}(l),\Phi(l))$ which is a closed subscheme of $\mathbb{P}^{\wedge^{\Phi(l)}f_{*}\mathcal{F}(l)}$ and hence projective over $Y$ . Let $\mathcal{M}=f_{*}\mathcal{F}(l)$ , let $\mathfrak{G}$ be the universal family on $G$ which comes with a surjection $\pi^{*}\mathcal{M}\to \mathfrak{G}$ whose kernel is denoted by $\mathcal{L}$ , where $\pi$ it the structure morphism $G\to Y$ . Pullback all the sheaves along $f_{G}$ , we have $0\to f_{G}^{*}\mathcal{L}\to f_{G}^{*}\pi^{*}\mathcal{M}\to f_{G}^{*}\mathfrak{G}\to 0$ exact. Since $\pi^{*}\mathcal{M}=f_{G*}\mathcal{F}_{G}(l)$ , we have $f_{G}^{*}\pi^{*}\mathcal{M}=f_{G}^{*}f_{G*}\mathcal{F}_{G}(l)$ . Then the natural morphism $f_{G}^{*}f_{G*}\mathcal{F}_{G}(l)\to \mathcal{F}_{G}(l)$ induces a morphism $f_{G}^{*}\mathcal{L}\to \mathcal{G}(l)$ , denote the cokernel by $\mathcal{R}$ . Then we have an exact sequence $f_{G}^{*}\mathcal{L}\to \mathcal{F}_{G}(l)\to \mathcal{R}\to 0$ . Now let $g:S\to Y$ be our morphism, $\mathcal{F}_{S}\to \mathcal{G}$ be a quotient in $\mathcal{Q}uot_{\mathcal{F} /X /Y}^{\Phi,\mathcal{L}}(S)$ and $f_{S*}\mathcal{F}_{S}(l)\to f_{S*}\mathcal{G}(l)$ the corresponding quotient in $\mathcal{Q}uot_{f_{*}\mathcal{F}(l) /X/Y}^{\Phi(l),\mathcal{O}_{Y}}(S)$ . Then there’s a unique morphism $h:S\to G$ such that $0\to f_{S*}\mathcal{K}(l)\to f_{S*}\mathcal{F}(l)\to f_{S*}\mathcal{G}(l)\to 0$ is the pullback of $0\to \mathcal{L}\to \pi^{*}\mathcal{M}\to \mathfrak{G}\to 0$ along $h$ . Using the facts that $g^{*}\mathcal{M}=f_{S*}\mathcal{F}_{S}(l)$ and $\mathfrak{G}$ is locally free. We know the sequence $0\to f_{G}^{*}\mathcal{L}\to f_{G}^{*}\pi^{*}\mathcal{M}\to f_{G}^{*}\mathfrak{G}\to 0$ pulls back via the induced morphism $X_{S}\to X_{G}$ to the exact sequence $0\to f_{S}^{*}f_{S*}\mathcal{K}(l)\to f_{S}^{*}f_{S*}\mathcal{F}_{S}(l)\to f_{S}^{*}f_{S*}\mathcal{G}(l)\to 0$ . Therefore the morphism $c$ pulls back $f_{G}^{*}\mathcal{G}\to \mathcal{F}_{G}\to \mathcal{R}$ to $f_{S}^{*}f_{S*}\mathcal{K}(l)\to \mathcal{F}_{S}(l)\to \mathcal{G}(l)\to 0$ . In particular, $\mathcal{R}(-l)$ is the pullback of $\mathcal{G}$ which is flat over $S$ .

Using the stratification of $G$ for the sheaf $\mathcal{R}(-l)$ , we know that the morphism $h:S\to G$ factors through the locally closed subscheme $G'$ . On the other hand, any morphism $S\to G$ over $Y$ which factors through $G'$ is will give a quotient of $\mathcal{F}_{S}$ in $\mathcal{Q}uot_{\mathcal{F} /X /Y}^{\Phi,\mathcal{L}}(S)$ which is the pullback of the quotient $\mathcal{F}_{S}\to \mathcal{R}(-l)$ . Thus the scheme $G'$ with the universal family $\mathcal{F}_{G}\to \mathcal{R}(-l)$ restricted to $X_{G'}$ represents the functor $\mathcal{Q}uot_{\mathcal{F} /X /Y}^{\Phi,\mathcal{L}}$ .

Step 7. We need to show $G'$ is closed subset of $G$ . $G$ is projective so we only need to show $G'$ is proper. We check this by valuation criterion. For DVR $R$ and it’s field of fraction $K$ , let $T=\mathrm{Spec}K$ and $S=\mathrm{Spec}R$ . Consider the commutative diagram

which induces the commutative diagram

If we pullback $\mathcal{F}_{G}\to \mathcal{R}(-l)$ , we will get $\mathcal{F}_{T}\to \mathcal{G}$ in $\mathcal{Q}uot_{\mathcal{F} /X /Y}^{\Phi,\mathcal{L}}(T)$ , from which we also get a morphism $j'_{*}\mathcal{F}_{T}\to j'_{*}\mathcal{G}$ . On the other hand, since $\mathcal{F}_{T}=j'^{*}\mathcal{F}_{S}$ , there’s a natural morphism $\mathcal{F}_{S}\to j'_{*}\mathcal{F}_{T}$ and thus a morphism $\varphi:\mathcal{F}_{S}\to j'_{*}\mathcal{G}$ , a quotient $\mathcal{F}_{S}\to \mathcal{H}$ , where $\mathcal{H}$ is the image of $\varphi$ . Since $\mathcal{G}$ is flat over $T$ , $j'_{*}$ is flat over $S$ . Moreover, since $R$ is DVR, any subsheaf of $j'_{*}\mathcal{G}$ is flat over $\mathrm{Spec}R$ hence $\mathcal{H}$ is flat over $S$ ( $R$ is PID so flat $\iff$ torsion free). Thus the Hilbert polynomial of $\mathcal{H}$ on the fibres of $X_{S}\to S$ is the same over the points of $S$ . Therefore the quotient $\mathcal{F}_{S}\to\mathcal{H}$ is an element in $\mathcal{Q}uot_{\mathcal{F} /X /Y}^{\Phi,\mathcal{L}}(S)$ . By our construction, the pullback of $\mathcal{F}_{S}\to \mathcal{H}$ to $X_{T}$ coincide with $\mathcal{F}_{T}\to \mathcal{G}$ . Moreover, the arguments in Step 6 show that $\mathcal{F}_{G}\to \mathcal{R}(-l)$ pulls back to $\mathcal{F}_{S}\to \mathcal{H}$ . Therefore there’s a unique morphism $S\to G'$ over $Y$ which restricts to the given morphism $T\to G'$ . Properness is done by valuation criterion. ◻

Lemma 5. Let $f:X\to Y$ be projective morphism of noetherian schemes, $\mathcal{O}_{X}(1)$ a very ample sheaf on $Y$ , and $\Phi\in \mathbb{Q}[t]$ a polynomial. Let $\mathcal{F}'\to \mathcal{F}$ be a surjective morphism of coherent sheaves on $X$ . If $\mathcal{Q}uot_{\mathcal{F}' /X/Y}^{\Phi,\mathcal{L}}$ is represented by a scheme $Quot_{\mathcal{F}' /X/Y}^{\Phi,\mathcal{L}}$ , then $\mathcal{Q}uot_{\mathcal{F} /X/Y}^{\Phi,\mathcal{L}}$ is represented by a closed subscheme of $Quot_{\mathcal{F}' /X/Y}^{\Phi,\mathcal{L}}$ .

Proof

Proof. Let $Q'=Quot_{\mathcal{F}' /X/Y}^{\Phi,\mathcal{L}}$ , and $\mathfrak{G}'$ be the universal family on $X_{Q'}$ which comes with a surjective morphism $\mathcal{F}'_{Q'}\to \mathfrak{G}'$ whose kernel is denoted by $\mathcal{L}$ . The given morphism $\mathcal{F}'\to \mathcal{F}$ also gives a surjective morphism $\mathcal{F}'_{Q'}\to \mathcal{F}_{Q'}$ whose kernel is denoted by $\mathcal{N}$ . Put $\mathcal{R}=\mathcal{F}'_{Q'} /(\mathcal{L}+\mathcal{N})$ , we have a commutative diagram

Let $Q=Q'_{\Phi}$ be the locally closed subscheme of $Q'$ corresponding to $\Phi$ given by the stratification of $Q'$ for the sheaf $\mathcal{R}$ . Now let $g:S\to Y$ be the morphism from a noetherian scheme, $\mathcal{F}_{S}\to \mathcal{G}$ be an element in $\mathcal{Q}uot_{\mathcal{F} /X/Y}^{\Phi,\mathcal{L}}$ . The surjection $\mathcal{F}'_{S}\to \mathcal{F}_{S}$ composed with $\mathcal{F}_{S}\to \mathcal{G}$ gives a quotient $\mathcal{F}_{S}'\to \mathcal{G}$ in $\mathcal{Q}uot_{\mathcal{F} /X/Y}^{\Phi,\mathcal{L}}(S)$ . Thus we have a natural transformation $\mathcal{Q}uot_{\mathcal{F} /X/Y}^{\Phi,\mathcal{L}}(S)\to \mathcal{Q}uot_{\mathcal{F}' /X/Y}^{\Phi,\mathcal{L}}(S)$ . Moreover, the quotient $\mathcal{F}_{S}'\to \mathcal{G}$ uniquely determines a morphism $h:S\to Q'$ such that $c:X_{S}\to X_{Q'}$ is the induced morphism then the quotient $\mathcal{F}_{Q}'\to \mathfrak{G}$ is pulled back to $\mathcal{F}_{S}'\to \mathcal{G}$ via $c$ . So we have the commutative diagram

By the construction, the morphism $\alpha$ factors through the morphism $\beta$ hence the image of $c^{*}\mathcal{L}$ contains the image of $c^{*}\mathcal{N}$ , which implies that the image of $c^{*}\mathcal{L}$ is equal to the image of $c^{*}(\mathcal{L}+\mathcal{N})$ . Thus $\gamma$ is an isomorphism. This also implies that $h:S\to Q'$ factors through $Q$ . Therefore the functor $\mathcal{Q}uot_{\mathcal{F} /X/Y}^{\Phi,\mathcal{L}}$ is represented by the scheme $Q$ and the quotient $\mathcal{F}_{Q}\to \mathcal{R}$ restricted to $X_{Q}$ . $Q$ is a closed subscheme of $Q'$ by valuation criterion for properness similar to the proof of the main theorem. ◻

Reference

[1]: The Stacks Project Authors. Stacks project, 2024.

[2]: Ulrich Görtz and Torsten Wedhorn. Algebraic Geometry I: Schemes. Springer, 2010.

[3]: Robin Hartshorne. Algebraic geometry, volume 52. Springer Science & Business Media, 2013.