Definition 103.7.1. Let $\mathcal{X}$ be an algebraic stack and let $\mathcal{F}$ in $\textit{Mod}(\mathcal{X}_{\acute{e}tale}, \mathcal{O}_\mathcal {X})$. We say $\mathcal{F}$ has the flat base change property1 if and only if $c_\varphi $ is an isomorphism whenever $f$ is flat.
103.7 Flat comparison maps
Let $\mathcal{X}$ be an algebraic stack and let $\mathcal{F}$ be an object of $\textit{Mod}(\mathcal{X}_{\acute{e}tale}, \mathcal{O}_\mathcal {X})$. Given an object $x$ of $\mathcal{X}$ lying over the scheme $U$ the restriction $\mathcal{F}|_{U_{\acute{e}tale}}$ is the restriction of $x^{-1}\mathcal{F}$ to the small étale site of $U$, see Sheaves on Stacks, Definition 96.9.2. Next, let $\varphi : x \to x'$ be a morphism of $\mathcal{X}$ lying over a morphism of schemes $f : U \to U'$. Thus a $2$-commutative diagram
\[ \xymatrix{ U \ar[rd]_ x \ar[rr]_ f & & U' \ar[ld]^{x'} \\ & \mathcal{X} } \]
Associated to $\varphi $ we obtain a comparison map between restrictions
103.7.0.1
\begin{equation} \label{stacks-cohomology-equation-comparison-modules} c_\varphi : f_{small}^*(\mathcal{F}|_{U'_{\acute{e}tale}}) \longrightarrow \mathcal{F}|_{U_{\acute{e}tale}} \end{equation}
see Sheaves on Stacks, Equation (96.9.4.1). In this situation we can consider the following property of $\mathcal{F}$.
Here is a lemma with some properties of this notion.
Lemma 103.7.2. Let $\mathcal{X}$ be an algebraic stack. Let $\mathcal{F}$ be an $\mathcal{O}_\mathcal {X}$-module on $\mathcal{X}_{\acute{e}tale}$.
If $\mathcal{F}$ has the flat base change property then for any morphism $g : \mathcal{Y} \to \mathcal{X}$ of algebraic stacks, the pullback $g^*\mathcal{F}$ does too.
The full subcategory of $\textit{Mod}(\mathcal{X}_{\acute{e}tale}, \mathcal{O}_\mathcal {X})$ consisting of modules with the flat base change property is a weak Serre subcategory.
Let $f_ i : \mathcal{X}_ i \to \mathcal{X}$ be a family of smooth morphisms of algebraic stacks such that $|\mathcal{X}| = \bigcup _ i |f_ i|(|\mathcal{X}_ i|)$. If each $f_ i^*\mathcal{F}$ has the flat base change property then so does $\mathcal{F}$.
The category of $\mathcal{O}_\mathcal {X}$-modules on $\mathcal{X}_{\acute{e}tale}$ with the flat base change property has colimits and they agree with colimits in $\textit{Mod}(\mathcal{X}_{\acute{e}tale}, \mathcal{O}_\mathcal {X})$.
Given $\mathcal{F}$ and $\mathcal{G}$ in $\textit{Mod}(\mathcal{X}_{\acute{e}tale}, \mathcal{O}_\mathcal {X})$ with the flat base change property then the tensor product $\mathcal{F} \otimes _{\mathcal{O}_\mathcal {X}} \mathcal{G}$ has the flat base change property.
Given $\mathcal{F}$ and $\mathcal{G}$ in $\textit{Mod}(\mathcal{X}_{\acute{e}tale}, \mathcal{O}_\mathcal {X})$ with $\mathcal{F}$ of finite presentation and $\mathcal{G}$ having the flat base change property then the sheaf $\mathop{\mathcal{H}\! \mathit{om}}\nolimits _{\mathcal{O}_\mathcal {X}}(\mathcal{F}, \mathcal{G})$ has the flat base change property.
Proof. Let $g : \mathcal{Y} \to \mathcal{X}$ be as in (1). Let $y$ be an object of $\mathcal{Y}$ lying over a scheme $V$. By Sheaves on Stacks, Lemma 96.9.3 we have $(g^*\mathcal{F})|_{V_{\acute{e}tale}} = \mathcal{F}|_{V_{\acute{e}tale}}$. Moreover a comparison mapping for the sheaf $g^*\mathcal{F}$ on $\mathcal{Y}$ is a special case of a comparison map for the sheaf $\mathcal{F}$ on $\mathcal{X}$, see Sheaves on Stacks, Lemma 96.9.3. In this way (1) is clear.
Proof of (2). We use the characterization of weak Serre subcategories of Homology, Lemma 12.10.3. Kernels and cokernels of maps between sheaves having the flat base change property also have the flat base change property. This is clear because $f_{small}^*$ is exact for a flat morphism of schemes and since the restriction functors $(-)|_{U_{\acute{e}tale}}$ are exact (because we are working in the étale topology). Finally, if $0 \to \mathcal{F}_1 \to \mathcal{F}_2 \to \mathcal{F}_3 \to 0$ is a short exact sequence of $\textit{Mod}(\mathcal{X}_{\acute{e}tale}, \mathcal{O}_\mathcal {X})$ and the outer two sheaves have the flat base change property then the middle one does as well, again because of the exactness of $f_{small}^*$ and the restriction functors (and the 5 lemma).
Proof of (3). Let $f_ i : \mathcal{X}_ i \to \mathcal{X}$ be a jointly surjective family of smooth morphisms of algebraic stacks and assume each $f_ i^*\mathcal{F}$ has the flat base change property. By part (1), the definition of an algebraic stack, and the fact that compositions of smooth morphisms are smooth (see Morphisms of Stacks, Lemma 101.33.2) we may assume that each $\mathcal{X}_ i$ is representable by a scheme. Let $\varphi : x \to x'$ be a morphism of $\mathcal{X}$ lying over a flat morphism $a : U \to U'$ of schemes. By Sheaves on Stacks, Lemma 96.19.10 there exists a jointly surjective family of étale morphisms $U'_ i \to U'$ such that $U'_ i \to U' \to \mathcal{X}$ factors through $\mathcal{X}_ i$. Thus we obtain commutative diagrams
\[ \xymatrix{ U_ i = U \times _{U'} U_ i' \ar[r]_-{a_ i} \ar[d] & U_ i' \ar[r]_{x_ i'} \ar[d] & \mathcal{X}_ i \ar[d]^{f_ i} \\ U \ar[r]^ a & U' \ar[r]^{x'} & \mathcal{X} } \]
Note that each $a_ i$ is a flat morphism of schemes as a base change of $a$. Denote $\psi _ i : x_ i \to x'_ i$ the morphism of $\mathcal{X}_ i$ lying over $a_ i$ with target $x_ i'$. By assumption the comparison maps $c_{\psi _ i} : (a_ i)_{small}^*\big (f_ i^*\mathcal{F}|_{(U'_ i)_{\acute{e}tale}}\big ) \to f_ i^*\mathcal{F}|_{(U_ i)_{\acute{e}tale}}$ is an isomorphism. Because the vertical arrows $U_ i' \to U'$ and $U_ i \to U$ are étale, the sheaves $f_ i^*\mathcal{F}|_{(U_ i')_{\acute{e}tale}}$ and $f_ i^*\mathcal{F}|_{(U_ i)_{\acute{e}tale}}$ are the restrictions of $\mathcal{F}|_{U'_{\acute{e}tale}}$ and $\mathcal{F}|_{U_{\acute{e}tale}}$ and the map $c_{\psi _ i}$ is the restriction of $c_\varphi $ to $(U_ i)_{\acute{e}tale}$, see Sheaves on Stacks, Lemma 96.9.3. Since $\{ U_ i \to U\} $ is an étale covering, this implies that the comparison map $c_\varphi $ is an isomorphism which is what we wanted to prove.
Proof of (4). Let $\mathcal{I} \to \textit{Mod}(\mathcal{X}_{\acute{e}tale}, \mathcal{O}_\mathcal {X})$, $i \mapsto \mathcal{F}_ i$ be a diagram and assume each $\mathcal{F}_ i$ has the flat base change property. Let $\varphi : x \to x'$ be a morphism of $\mathcal{X}$ lying over the flat morphism of schemes $f : U \to U'$. Recall that $\mathop{\mathrm{colim}}\nolimits _ i \mathcal{F}_ i$ is the sheafification of the presheaf colimit. As we are using the étale topology, it is clear that
\[ (\mathop{\mathrm{colim}}\nolimits _ i \mathcal{F}_ i)|_{U_{\acute{e}tale}} = \mathop{\mathrm{colim}}\nolimits _ i {\mathcal{F}_ i}|_{U_{\acute{e}tale}} \]
and similarly for the restriction to $U'_{\acute{e}tale}$. Hence
\begin{align*} f_{small}^*((\mathop{\mathrm{colim}}\nolimits _ i \mathcal{F}_ i)|_{U'_{\acute{e}tale}}) & = f_{small}^*(\mathop{\mathrm{colim}}\nolimits _ i {\mathcal{F}_ i}|_{U'_{\acute{e}tale}}) \\ & = \mathop{\mathrm{colim}}\nolimits _ i f_{small}^*({\mathcal{F}_ i}|_{U'_{\acute{e}tale}}) \\ & \xrightarrow {\mathop{\mathrm{colim}}\nolimits c_\varphi } \mathop{\mathrm{colim}}\nolimits _ i \mathcal{F}_ i|_{U_{\acute{e}tale}} \\ & = (\mathop{\mathrm{colim}}\nolimits _ i \mathcal{F}_ i)|_{U_{\acute{e}tale}} \end{align*}
For the second equality we used that $f_{small}^*$ commutes with colimits (as a left adjoint). The arrow is an isomorphism as each $\mathcal{F}_ i$ has the flat base change property. Thus the colimit has the flat base change property and (4) is true.
Part (5) holds because tensor products commute with pullbacks, see Modules on Sites, Lemma 18.26.2. Details omitted.
Let $\mathcal{F}$ and $\mathcal{G}$ be as in (6). Since $\mathcal{F}$ is quasi-coherent it has the flat base change property by Sheaves on Stacks, Lemma 96.12.2. Let $\varphi : x \to x'$ be a morphism of $\mathcal{X}$ lying over the flat morphism of schemes $f : U \to U'$. As we are using the étale topology, we have
\[ \mathop{\mathcal{H}\! \mathit{om}}\nolimits _{\mathcal{O}_\mathcal {X}}(\mathcal{F}, \mathcal{G})|_{U_{\acute{e}tale}} = \mathop{\mathcal{H}\! \mathit{om}}\nolimits _{\mathcal{O}_ U}(\mathcal{F}|_{U_{\acute{e}tale}}, \mathcal{G}|_{U_{\acute{e}tale}}) \]
and similarly for the restriction to $U'_{\acute{e}tale}$ (details omitted). Hence
\begin{align*} f_{small}^*( \mathop{\mathcal{H}\! \mathit{om}}\nolimits _{\mathcal{O}_\mathcal {X}}(\mathcal{F}, \mathcal{G})|_{U'_{\acute{e}tale}}) & = f_{small}^*( \mathop{\mathcal{H}\! \mathit{om}}\nolimits _{\mathcal{O}_{U'}}( \mathcal{F}|_{U'_{\acute{e}tale}}, \mathcal{G}|_{U'_{\acute{e}tale}})) \\ & = \mathop{\mathcal{H}\! \mathit{om}}\nolimits _{\mathcal{O}_{U'}}( f_{small}^*(\mathcal{F}|_{U'_{\acute{e}tale}}), f_{small}^*(\mathcal{G}|_{U'_{\acute{e}tale}})) \\ & \xrightarrow {c_\varphi } \mathop{\mathcal{H}\! \mathit{om}}\nolimits _{\mathcal{O}_ U}(\mathcal{F}|_{U_{\acute{e}tale}}, \mathcal{G}|_{U_{\acute{e}tale}}) \\ & = \mathop{\mathcal{H}\! \mathit{om}}\nolimits _{\mathcal{O}_\mathcal {X}}(\mathcal{F}, \mathcal{G})|_{U_{\acute{e}tale}} \end{align*}
Here the second equality is Modules on Sites, Lemma 18.31.4 which uses that $f : U \to U'$ is flat and hence the morphism of ringed sites $f_{small}$ is flat too. The arrow is an isomorphism as both $\mathcal{F}$ and $\mathcal{G}$ have the flat base change property. Thus our $\mathop{\mathcal{H}\! \mathit{om}}\nolimits $ has the flat base change property too as desired. $\square$
Lemma 103.7.3. Let $f : \mathcal{X} \to \mathcal{Y}$ be a quasi-compact and quasi-separated morphism of algebraic stacks. Let $\mathcal{F}$ be an object of $\textit{Mod}(\mathcal{X}_{\acute{e}tale}, \mathcal{O}_\mathcal {X})$ which is locally quasi-coherent and has the flat base change property. Then each $R^ if_*\mathcal{F}$ (computed in the étale topology) has the flat base change property.
Proof. We will use Lemma 103.5.1 to prove this. For every algebraic stack $\mathcal{X}$ let $\textit{LQCoh}^{fbc}(\mathcal{O}_\mathcal {X})$ denote the full subcategory of $\textit{Mod}(\mathcal{X}_{\acute{e}tale}, \mathcal{O}_\mathcal {X})$ consisting of locally quasi-coherent sheaves with the flat base change property. Once we verify conditions (1) – (4) of Lemma 103.5.1 the lemma will follow. Properties (1), (2), and (3) follow from Sheaves on Stacks, Lemmas 96.12.3 and 96.12.4 and Lemmas 103.6.1 and 103.7.2. Thus it suffices to show part (4).
Suppose $f : \mathcal{X} \to \mathcal{Y}$ is a morphism of algebraic stacks such that $\mathcal{X}$ and $\mathcal{Y}$ are representable by affine schemes $X$ and $Y$. In this case, suppose that $\psi : y \to y'$ is a morphism of $\mathcal{Y}$ lying over a flat morphism $b : V \to V'$ of schemes. For clarity denote $\mathcal{V} = (\mathit{Sch}/V)_{fppf}$ and $\mathcal{V}' = (\mathit{Sch}/V')_{fppf}$ the corresponding algebraic stacks. Consider the diagram of algebraic stacks
\[ \xymatrix{ \mathcal{Z} \ar[d]_{f''} \ar[r]_ a & \mathcal{Z}' \ar[r]_{x'} \ar[d]_{f'} & \mathcal{X} \ar[d]^ f \\ \mathcal{V} \ar[r]^ b & \mathcal{V}' \ar[r]^{y'} & \mathcal{Y} } \]
with both squares cartesian. As $f$ is representable by schemes (and quasi-compact and separated – even affine) we see that $\mathcal{Z}$ and $\mathcal{Z}'$ are representable by schemes $Z$ and $Z'$ and in fact $Z = V \times _{V'} Z'$. Since $\mathcal{F}$ has the flat base change property we see that
\[ a_{small}^*\big (\mathcal{F}|_{Z'_{\acute{e}tale}}\big ) \longrightarrow \mathcal{F}|_{Z_{\acute{e}tale}} \]
is an isomorphism. Moreover,
\[ R^ if_*\mathcal{F}|_{V'_{\acute{e}tale}} = R^ i(f')_{small, *}\big (\mathcal{F}|_{Z'_{\acute{e}tale}}\big ) \]
and
\[ R^ if_*\mathcal{F}|_{V_{\acute{e}tale}} = R^ i(f'')_{small, *}\big (\mathcal{F}|_{Z_{\acute{e}tale}}\big ) \]
by Sheaves on Stacks, Lemma 96.22.3. Hence we see that the comparison map
\[ c_\psi : b_{small}^*(R^ if_*\mathcal{F}|_{V'_{\acute{e}tale}}) \longrightarrow R^ if_*\mathcal{F}|_{V_{\acute{e}tale}} \]
is an isomorphism by Cohomology of Spaces, Lemma 69.11.2. Thus $R^ if_*\mathcal{F}$ has the flat base change property. Since $R^ if_*\mathcal{F}$ is locally quasi-coherent by Lemma 103.6.2 we win. $\square$
[1] This may be nonstandard notation.
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