Faithfully flat descent

Template:Short description Faithfully flat descent is a technique from algebraic geometry, allowing one to draw conclusions about objects on the target of a faithfully flat morphism. Such morphisms, that are flat and surjective, are common, one example coming from an open cover.

In practice, from an affine point of view, this technique allows one to prove some statement about a ring or scheme after faithfully flat base change.

"Vanilla" faithfully flat descent is generally false; instead, faithfully flat descent is valid under some finiteness conditions (e.g., quasi-compact or locally of finite presentation).

A faithfully flat descent is a special case of Beck's monadicity theorem.^[1]

Given a faithfully flat ring homomorphism ${\displaystyle A\to B}$, the faithfully flat descent is, roughy, the statement that to give a module or an algebra over A is to give a module or an algebra over ${\displaystyle B}$ together with the so-called descent datum (or data). That is to say one can descend the objects (or even statements) on ${\displaystyle B}$ to ${\displaystyle A}$ provided some additional data.

For example, given some elements ${\displaystyle f_1,\dots ,f_r}$ generating the unit ideal of A, ${\displaystyle B=\prod _{i}A[f_i^{-1}]}$ is faithfully flat over ${\displaystyle A}$. Geometrically, ${\displaystyle \mathrm{Spec}(B)={\displaystyle \bigcup _{i=1}^r}\mathrm{Spec}(A[f_i^{-1}])}$ is an open cover of ${\displaystyle \mathrm{Spec}(A)}$ and so descending a module from ${\displaystyle B}$ to ${\displaystyle A}$ would mean gluing modules ${\displaystyle M_i}$ on ${\displaystyle A[f_i^{-1}]}$ to get a module on A; the descend datum in this case amounts to the gluing data; i.e., how ${\displaystyle M_i,M_j}$ are identified on overlaps ${\displaystyle \mathrm{Spec}(A[f_i^{-1},f_j^{-1}])}$.

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Let ${\displaystyle A\to B}$ be a faithfully flat ring homomorphism. Given an ${\displaystyle A}$-module ${\displaystyle M}$, we get the ${\displaystyle B}$-module ${\displaystyle N=M{\otimes }_{A}B}$ and because ${\displaystyle A\to B}$ is faithfully flat, we have the inclusion ${\displaystyle M\hookrightarrow M{\otimes }_{A}B}$. Moreover, we have the isomorphism ${\displaystyle \phi :N\otimes B\stackrel{\sim }{\to }N\otimes B}$ of ${\displaystyle B^{\otimes 2}}$-modules that is induced by the isomorphism ${\displaystyle B^{\otimes 2}\simeq B^{\otimes 2},x\otimes y\mapsto y\otimes x}$ and that satisfies the cocycle condition:

${\displaystyle {\phi }^1={\phi }^0\circ {\phi }^2}$

where ${\displaystyle {\phi }^i:N\otimes B^{\otimes 2}\stackrel{\sim }{\to }N\otimes B^{\otimes 2}}$ are given as:^[2]

${\displaystyle {\phi }^0(n\otimes b\otimes c)={\rho }^1(b)\phi (n\otimes c)}$

${\displaystyle {\phi }^1(n\otimes b\otimes c)={\rho }^2(b)\phi (n\otimes c)}$

${\displaystyle {\phi }^2(n\otimes b\otimes c)=\phi (n\otimes b)\otimes c}$

with ${\displaystyle {\rho }^i(x)(y_0\otimes \cdots \otimes y_r)=y_0\cdots y_{i-1}\otimes x\otimes y_i\cdots y_r}$. Note the isomorphisms ${\displaystyle {\phi }^i:N\otimes B^{\otimes 2}\stackrel{\sim }{\to }N\otimes B^{\otimes 2}}$ are determined only by ${\displaystyle \phi }$ and do not involve ${\displaystyle M.}$

Now, the most basic form of faithfully flat descent says that the above construction can be reversed; i.e., given a ${\displaystyle B}$-module ${\displaystyle N}$ and a ${\displaystyle B^{\otimes 2}}$-module isomorphism ${\displaystyle \phi :N\otimes B\stackrel{\sim }{\to }N\otimes B}$ such that ${\displaystyle {\phi }^1={\phi }^0\circ {\phi }^2}$, an invariant submodule:

${\displaystyle M=\{n\in N|\phi (n\otimes 1)=n\otimes 1\}\subset N}$

is such that ${\displaystyle M\otimes B=N}$.^[3]

Here is the precise definition of descent datum. Given a ring homomorphism ${\displaystyle A\to B}$, we write:

${\displaystyle d^i:B^{\otimes n}\to B^{\otimes n+1}}$

for the map given by inserting ${\displaystyle A\to B}$ in the i-th spot; i.e., ${\displaystyle d^0}$ is given as ${\displaystyle B^{\otimes n}\simeq A{\otimes }_A{B}^{\otimes n}\to B{\otimes }_A{B}^{\otimes n}=B^{\otimes n+1}}$, ${\displaystyle d^1}$ as ${\displaystyle B^{\otimes n}\simeq B\otimes A\otimes B^{\otimes n-1}\to B^{\otimes n+1}}$, etc. We also write ${\displaystyle -{\otimes }_{d^i}{B}^{\otimes n+1}}$ for tensoring over ${\displaystyle B^{\otimes n}}$ when ${\displaystyle B^{\otimes n+1}}$ is given the module structure by ${\displaystyle d^i}$.

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Now, given a ${\displaystyle B}$-module ${\displaystyle N}$ with a descent datum ${\displaystyle \phi }$, define ${\displaystyle M}$ to be the kernel of

${\displaystyle d^0-\phi \circ d^1:N\to N{\otimes }_{d^0}{B}^{\otimes 2}}$.

Consider the natural map

${\displaystyle M\otimes B\to N,x\otimes a\mapsto xa}$.

The key point is that this map is an isomorphism if ${\displaystyle A\to B}$ is faithfully flat.^[4] This is seen by considering the following:

${\displaystyle \begin{array}{ccccccc}0& \to & M{\otimes }_{A}B& \to & N{\otimes }_{A}B& \stackrel{d^0-\phi \circ d^1}{\to }& N{\otimes }_{d^0}{B}^{\otimes 2}{\otimes }_{A}B\\ & & \downarrow & & \phi \circ d^1\downarrow & & \downarrow \phi {\otimes }_{d^0,d^1}{B}^{\otimes 3}\circ d^2\\ 0& \to & N& \to & N{\otimes }_{d^0}{B}^{\otimes 2}& \stackrel{d^0-d^1}{\to }& N{\otimes }_{d^0,d^1}{B}^{\otimes 3}\end{array}}$

where the top row is exact by the flatness of B over A and the bottom row is the Amitsur complex, which is exact by a theorem of Grothendieck. The cocycle condition ensures that the above diagram is commutative. Since the second and the third vertical maps are isomorphisms, so is the first one.

The forgoing can be summarized simply as follows:

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The Zariski descent refers simply to the fact that a quasi-coherent sheaf can be obtained by gluing those on a (Zariski-)open cover. It is a special case of a faithfully flat descent but is frequently used to reduce the descent problem to the affine case.

In details, let ${\displaystyle 𝒬coh(X)}$ denote the category of quasi-coherent sheaves on a scheme X. Then Zariski descent states that, given quasi-coherent sheaves ${\displaystyle F_i}$ on open subsets ${\displaystyle U_i\subset X}$ with ${\displaystyle X=\bigcup U_i}$ and isomorphisms ${\displaystyle {\phi }_{ij}:F_i{|}_{U_i\cap U_j}\stackrel{\sim }{\to }{F}_j{|}_{U_i\cap U_j}}$ such that (1) ${\displaystyle {\phi }_{ii}=\mathrm{id}}$ and (2) ${\displaystyle {\phi }_{ik}={\phi }_{jk}\circ {\phi }_{ij}}$ on ${\displaystyle U_i\cap U_j\cap U_k}$, then exists a unique quasi-coherent sheaf ${\displaystyle F}$ on X such that ${\displaystyle F{|}_{U_i}\simeq F_i}$ in a compatible way (i.e., ${\displaystyle F{|}_{U_j}\simeq F_j}$ restricts to ${\displaystyle F{|}_{U_i\cap U_j}\simeq F_i{|}_{U_i\cap U_j}\stackrel{{\phi }_{ij}}{\to \sim }{F}_j{|}_{U_i\cap U_j}}$).^[5]

In a fancy language, the Zariski descent states that, with respect to the Zariski topology, ${\displaystyle 𝒬coh}$ is a stack; i.e., a category ${\displaystyle 𝒞}$ equipped with the functor ${\displaystyle p:𝒞\to }$ the category of (relative) schemes that has an effective descent theory. Here, let ${\displaystyle 𝒬coh}$ denote the category consisting of pairs ${\displaystyle (U,F)}$ consisting of a (Zariski)-open subset U and a quasi-coherent sheaf on it and ${\displaystyle p}$ the forgetful functor ${\displaystyle (U,F)\mapsto U}$.

There is a succinct statement for the major result in this area: (the prestack of quasi-coherent sheaves over a scheme S means that, for any S-scheme X, each X-point of the prestack is a quasi-coherent sheaf on X.)

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The proof uses Zariski descent and the faithfully flat descent in the affine case.

Here "quasi-compact" cannot be eliminated.^[6]

Let F be a finite Galois field extension of a field k. Then, for each vector space V over F,

${\displaystyle V{\otimes }_{k}F\simeq \prod _{\sigma }V,v\otimes a\mapsto \sigma (a)v}$

where the product runs over the elements in the Galois group of ${\displaystyle F/k}$.

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An étale descent is a consequence of a faithfully descent.

• Amitsur complex
• Hilbert scheme
• Quot scheme

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