Rayleigh–Bénard convection: Difference between revisions

There is also a proper base change theorem in topology. For that, see base change map.

In algebraic geometry, there are at least two versions of proper base change theorems: one for ordinary cohomology and the other for étale cohomology.

In ordinary cohomology

The proper base change theorem states the following: let ${\displaystyle f:X\to S}$ be a proper morphism between noetherian schemes, and ${\displaystyle {\mathcal {F}}}$ S-flat coherent sheaf on ${\displaystyle X}$. If ${\displaystyle S=\operatorname {Spec} A}$, then there is a finite complex ${\displaystyle 0\to K^{0}\to K^{1}\to \cdots \to K^{n}\to 0}$ of finitely generated projective A-modules and a natural isomorphism of functors

${\displaystyle H^{p}(X\times _{S}\operatorname {Spec} -,{\mathcal {F}}\otimes _{A}-)\to H^{p}(K^{\bullet }\otimes _{A}-),p\geq 0}$

on the category of ${\displaystyle A}$-algebras.

There are several corollaries to the theorem, some of which are also referred to as proper base change theorems: (the higher direct image ${\displaystyle R^{p}f_{*}{\mathcal {F}}}$ is coherent since f is proper.)

Corollary 1 (semicontinuity theorem): Let f and ${\displaystyle {\mathcal {F}}}$ as in the theorem (but S may not be affine). Then we have:

• (i) For each ${\displaystyle p\geq 0}$, the function ${\displaystyle s\mapsto \dim _{k(s)}H^{p}(X_{s},{\mathcal {F}}_{s}):S\to \mathbb {Z} }$ is upper semicontinuous.
• (ii) The function ${\displaystyle s\mapsto \chi ({\mathcal {F}}_{s})}$ is locally constant, where ${\displaystyle \chi ({\mathcal {F}})}$ denotes the Euler characteristic.

Corollary 2: Assume S is reduced and connected. Then for each ${\displaystyle p\geq 0}$ the following are equivalent

• (i) ${\displaystyle s\mapsto \dim _{k(s)}H^{p}(X_{s},{\mathcal {F}}_{s})}$ is constant.
• (ii) ${\displaystyle R^{p}f_{*}{\mathcal {F}}}$ is locally free and the natural map

${\displaystyle R^{p}f_{*}{\mathcal {F}}\otimes _{{\mathcal {O}}_{S}}k(s)\to H^{p}(X_{s},{\mathcal {F}}_{s})}$

is an isomorphism for all ${\displaystyle s\in S}$.

Furthermore, if these conditions hold, then the natural map

${\displaystyle R^{p-1}f_{*}{\mathcal {F}}\otimes _{{\mathcal {O}}_{S}}k(s)\to H^{p-1}(X_{s},{\mathcal {F}}_{s})}$

is an isomorphism for all ${\displaystyle s\in S}$.

Corollary 3: Assume that for some p ${\displaystyle H^{p}(X_{s},{\mathcal {F}}_{s})=0}$ for all ${\displaystyle s\in S}$. Then the natural map

${\displaystyle R^{p-1}f_{*}{\mathcal {F}}\otimes _{{\mathcal {O}}_{S}}k(s)\to H^{p-1}(X_{s},{\mathcal {F}}_{s})}$

is an isomorphism for all ${\displaystyle s\in S}$.

In étale cohomology

In nutshell, the proper base change theorem states that the higher direct image ${\displaystyle R^{i}f_{*}{\mathcal {F}}}$ of a torsion sheaf ${\displaystyle {\mathcal {F}}}$ along a proper morphism f commutes with base change. A closely related, the finiteness theorem states that the étale cohomology groups of a constructible sheaf on a complete variety are finite. Two theorems are usually proved simultaneously.

Theorem (finiteness): Let X be a variety over a separably closed field and ${\displaystyle {\mathcal {F}}}$ a constructible sheaf on ${\displaystyle X_{\text{et}}}$. Then ${\displaystyle H^{r}(X,{\mathcal {F}})}$ are finite in each of the following cases: (i) X is complete, or (ii) ${\displaystyle {\mathcal {F}}}$ has no p-torsion, where p is the characteristic of k.

References

• Robin Hartshorne, Algebraic Geometry.
• David Mumford, Abelian Varieties.
• Vakil's notes
• SGA 4
• Milne, Étale cohomology
• Gabber, "“Finiteness theorems for étale cohomology of excellent schemes"