Artin's criterion for representability - Revision history

Anton at 18:39, 9 July 2012

2012-07-09T18:39:31Z

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	:'''3c. ("algebraization")''' Given $\xi\in F(R)$ with $R$ a complete local noetherian ring, show that there is a finite type scheme $X$, $f\in F(X)$, and a closed point $x\in X$ such that $\widehat\O_{X,x}\cong R$ and the $\xi_i\in F(R/m^{i+1})$ are induced by $f$.		:'''3c. ("algebraization")''' Given $\xi\in F(R)$ with $R$ a complete local noetherian ring, show that there is a finite type scheme $X$, $f\in F(X)$, and a closed point $x\in X$ such that $\widehat\O_{X,x}\cong R$ and the $\xi_i\in F(R/m^{i+1})$ are induced by $f$.

	You don't actually need to check this, as Artin's theorem (Theorem 1.6 of <ref name="formalmoduliI" />) says it always works. (note: $\xi$ need not itself be induced by $f$; it's possible to have multiple algebraizations) The result is supposed to boil down to Artin's approximation theorem (Theorem 1.12 of <ref>Artin, [http://archive.numdam.org/ARCHIVE/PMIHES/PMIHES_1969__36_/PMIHES_1969__36__23_0/PMIHES_1969__36__23_0.pdf Algebraic approximation of structures over complete local rings]</ref>, but I don't understand how.		You don't actually need to check this, as Artin's theorem (Theorem 1.6 of <ref name="formalmoduliI" />) says it always works. (note: $\xi$ need not itself be induced by $f$; it's possible to have multiple algebraizations) The result is supposed to boil down to Artin's approximation theorem (Theorem 1.12 of <ref>Artin, [http://archive.numdam.org/ARCHIVE/PMIHES/PMIHES_1969__36_/PMIHES_1969__36__23_0/PMIHES_1969__36__23_0.pdf Algebraic approximation of structures over complete local rings]</ref>), but I don't understand how.

	:'''3d. ("openness of versality")''' Given a finite type scheme $X$ and $f\in F(X)$ which is formally smooth at a closed point $x\in X$, show there is an open neighborhood $U$ of $x\in X$ so that $f\|_U$ is (formally?) smooth.		:'''3d. ("openness of versality")''' Given a finite type scheme $X$ and $f\in F(X)$ which is formally smooth at a closed point $x\in X$, show there is an open neighborhood $U$ of $x\in X$ so that $f\|_U$ is (formally?) smooth.

Anton at 17:48, 14 December 2011

2011-12-14T17:48:54Z

← Older revision		Revision as of 09:48, 14 December 2011
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	:'''3c. ("algebraization")''' Given $\xi\in F(R)$ with $R$ a complete local noetherian ring, show that there is a finite type scheme $X$, $f\in F(X)$, and a closed point $x\in X$ such that $\widehat\O_{X,x}\cong R$ and the $\xi_i\in F(R/m^{i+1})$ are induced by $f$.		:'''3c. ("algebraization")''' Given $\xi\in F(R)$ with $R$ a complete local noetherian ring, show that there is a finite type scheme $X$, $f\in F(X)$, and a closed point $x\in X$ such that $\widehat\O_{X,x}\cong R$ and the $\xi_i\in F(R/m^{i+1})$ are induced by $f$.

	You don't actually need to check this, as Artin's theorem (Theorem 1.6 of <ref name="formalmoduliI" />) says it always works. (note: $\xi$ need not itself be induced by $f$; it's possible to have multiple algebraizations)		You don't actually need to check this, as Artin's theorem (Theorem 1.6 of <ref name="formalmoduliI" />) says it always works. (note: $\xi$ need not itself be induced by $f$; it's possible to have multiple algebraizations) The result is supposed to boil down to Artin's approximation theorem (Theorem 1.12 of <ref>Artin, [http://archive.numdam.org/ARCHIVE/PMIHES/PMIHES_1969__36_/PMIHES_1969__36__23_0/PMIHES_1969__36__23_0.pdf Algebraic approximation of structures over complete local rings]</ref>, but I don't understand how.

	:'''3d. ("openness of versality")''' Given a finite type scheme $X$ and $f\in F(X)$ which is formally smooth at a closed point $x\in X$, show there is an open neighborhood $U$ of $x\in X$ so that $f\|_U$ is (formally?) smooth.		:'''3d. ("openness of versality")''' Given a finite type scheme $X$ and $f\in F(X)$ which is formally smooth at a closed point $x\in X$, show there is an open neighborhood $U$ of $x\in X$ so that $f\|_U$ is (formally?) smooth.

Anton at 17:37, 14 December 2011

2011-12-14T17:37:36Z

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			'''Note:''' This page is not yet suitable for human consumption. I'll add it to [[:Category:Blog]] when it is done. However, if you do read it and have some feedback (e.g. corrections or clarifications), please do let me know or leave a comment on [[Talk:Artin's_criterion_for_representability\|the discussion page]].

	{{todo\|write this page}}		{{todo\|write this page}}

Anton at 17:33, 14 December 2011

2011-12-14T17:33:02Z

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	You verify Schelessinger's conditions by using deformation theory to get your hands on $F(A)$. If $F$ parameterizes flat families of foos, then use deformation theory of foos.		You verify Schelessinger's conditions by using deformation theory to get your hands on $F(A)$. If $F$ parameterizes flat families of foos, then use deformation theory of foos.

	:'''3b. ("effectivization")''' Given a compatible family $\xi_i\in F(R/m^{i+1}$ which is formally smooth at the closed point, show that it is actually induced by some $\xi\in F(R)$ which is formally smoth at the closed point.		:'''3b. ("effectivization")''' Given a compatible family $\xi_i\in F(R/m^{i+1})$ which is formally smooth at the closed point, show that it is actually induced by some $\xi\in F(R)$ which is formally smoth at the closed point.

	If $F$ parameterizes things that are controlled by coherent sheaves, this is where you can use Grothendieck's existence theorem.<ref>[http://www.numdam.org/numdam-bin/item?id=PMIHES_1961__11__5_0 EGA III$_1$] 5.1.4</ref> {{todo\|once this is written, add a link from [[Research#Grothendieck's Existence Theorem for good moduli spaces]]}}		If $F$ parameterizes things that are controlled by coherent sheaves, this is where you can use Grothendieck's existence theorem.<ref>[http://www.numdam.org/numdam-bin/item?id=PMIHES_1961__11__5_0 EGA III$_1$] 5.1.4</ref> {{todo\|once this is written, add a link from [[Research#Grothendieck's Existence Theorem for good moduli spaces]]}}

	But GET gives you more that you need. There are other approaches to effectivization; see §3{{todo\|?}} of <ref name="formalmoduliI">Artin, [http://stacky.net/posted/Artin%20-%20Algebraization%20of%20Formal%20Moduli%20I.djvu Algebraization of Formal Moduli I]</ref>		But GET gives you more that you need. There are other approaches to effectivization; see §3{{todo\|?}} of <ref name="formalmoduliI">Artin, [http://stacky.net/posted/Artin%20-%20Algebraization%20of%20Formal%20Moduli%20I.djvu Algebraization of Formal Moduli I]</ref>

			{{todo\|Matt tells me that Martin uses a trick where he shows effectivizes (and algebraizes?) by showing that there is some other functor with the same completed local ring (?)}}

	:'''3c. ("algebraization")''' Given $\xi\in F(R)$ with $R$ a complete local noetherian ring, show that there is a finite type scheme $X$, $f\in F(X)$, and a closed point $x\in X$ such that $\widehat\O_{X,x}\cong R$ and the $\xi_i\in F(R/m^{i+1})$ are induced by $f$.		:'''3c. ("algebraization")''' Given $\xi\in F(R)$ with $R$ a complete local noetherian ring, show that there is a finite type scheme $X$, $f\in F(X)$, and a closed point $x\in X$ such that $\widehat\O_{X,x}\cong R$ and the $\xi_i\in F(R/m^{i+1})$ are induced by $f$.

Anton: /* Notes and references */

2011-12-14T17:30:09Z

Notes and references

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	= Notes and references =		= Notes and references =
	<references />		<references />

			[[Category:Note]]

Anton: Created page with "{{todo|write this page}} We work over an excellent base $\ast$ (need not be a Dedekind domainConrad and de Jong, [http://math.stanford.edu/~conrad/papers/approx.pdf Approxi..."

2011-12-14T17:29:36Z

Created page with "{{todo|write this page}} We work over an excellent base $\ast$ (need not be a Dedekind domain<ref>Conrad and de Jong, [http://math.stanford.edu/~conrad/papers/approx.pdf Approxi..."

New page

{{todo|write this page}}

We work over an excellent base $\ast$ (need not be a Dedekind domain<ref>Conrad and de Jong, [http://math.stanford.edu/~conrad/papers/approx.pdf Approximation of versal deformations] {{todo|read that paper; find precise ref}}</ref>).

:A functor $F:Sch^{op}\to Set$ is a locally finitely presented algebraic space if and only if the following are true:
:'''0.''' $F$ is locally finitely presented (i.e. it commutes with filtered(?) projective limits); ref to theorem that for schemes/algspaces this agrees with usual notion.
:'''1.''' $F$ is an fppf sheaf (is etale sheaf enough?)
:'''2.''' $F$ has representable diagonal (can this be removed in light of that result in the stacks project? i.e. is it any easier to check representability of the cover constructed in the subsequent steps?)
:'''3a. ("prorepresentability")''' For any field $k$ of finite type over $\ast$, and any point $\xi_0\in F(k)$, there is a ''formal versal deformation'' of $\xi_0$. That is, there is a complete local noetherian ring $R$ with residue field $k$ and a compatible family $\xi_i\in F(R/m^{i+1})$ (such that $\xi_0=\xi_0$) such that the "formal morphism" $Spec(R)\to F$ is formally smooth at the closed point.

This is done with Schlessinger's criteria.<ref>Schlessinger, [http://www.jstor.org/stable/1994967 Functors of Artin rings]</ref>{{todo|explain criteria}} Only need H1-3 to get a formal versal deformation, but may as well mention that H4 will give you a universal deformation.

You verify Schelessinger's conditions by using deformation theory to get your hands on $F(A)$. If $F$ parameterizes flat families of foos, then use deformation theory of foos.

:'''3b. ("effectivization")''' Given a compatible family $\xi_i\in F(R/m^{i+1}$ which is formally smooth at the closed point, show that it is actually induced by some $\xi\in F(R)$ which is formally smoth at the closed point.

If $F$ parameterizes things that are controlled by coherent sheaves, this is where you can use Grothendieck's existence theorem.<ref>[http://www.numdam.org/numdam-bin/item?id=PMIHES_1961__11__5_0 EGA III$_1$] 5.1.4</ref> {{todo|once this is written, add a link from [[Research#Grothendieck's Existence Theorem for good moduli spaces]]}}

But GET gives you more that you need. There are other approaches to effectivization; see §3{{todo|?}} of <ref name="formalmoduliI">Artin, [http://stacky.net/posted/Artin%20-%20Algebraization%20of%20Formal%20Moduli%20I.djvu Algebraization of Formal Moduli I]</ref>

:'''3c. ("algebraization")''' Given $\xi\in F(R)$ with $R$ a complete local noetherian ring, show that there is a finite type scheme $X$, $f\in F(X)$, and a closed point $x\in X$ such that $\widehat\O_{X,x}\cong R$ and the $\xi_i\in F(R/m^{i+1})$ are induced by $f$.

You don't actually need to check this, as Artin's theorem (Theorem 1.6 of <ref name="formalmoduliI" />) says it always works. (note: $\xi$ need not itself be induced by $f$; it's possible to have multiple algebraizations)

:'''3d. ("openness of versality")''' Given a finite type scheme $X$ and $f\in F(X)$ which is formally smooth at a closed point $x\in X$, show there is an open neighborhood $U$ of $x\in X$ so that $f|_U$ is (formally?) smooth.

If the deformation theory is unobstructed, openness of versality should be essentially automatic.

Putting these steps together produces a smooth surjection from a scheme to $F$ (note that $F$ must be locally finitely presented to know that the map is a surjection). This shows that $F$ is an algebraic stack, but since it's a functor, it's an algebraic space.

If you want to check that $F$ is an algebraic stack, the same criterion works (in particular, Artin's theorem in step 3c applies to the functor of isomorphism classes of the stack), but you have to allow finite separable field extensions in step

= Notes and references =
<references />