ncatlab.org

syntomic cohomology in nLab

Contents

Context

Cohomology

cohomology

Special and general types

Special notions

Variants

Operations

Theorems

Contents

Idea

Syntomic cohomology is the abelian sheaf cohomology of the syntomic site of a scheme. It is a pp-adic analogue of Deligne-Beilinson cohomology.

Syntomic cohomology is closely related to the crystalline cohomology of that scheme and may be regarded as a p p -adic absolute Hodge cohomology.

Construction via Prismatic Cohomology

The syntomic cohomology may also be obtained from prismatic cohomology (Bhatt22). Let RR be a p-adically complete ring and let Δ R\Delta_{R} be its absolute prismatic cohomology. It has an action of the Frobenius morphism ϕ\phi. We also have a “Breuil Kisin twist” Δ{1}\Delta\lbrace 1\rbrace and a filtration Fil N •Δ\Fil_{N}^{\bullet}\Delta called the Nygaard filtration (see see Bhatt21, section 2). The syntomic cohomology ℤ p(i)\mathbb{Z}_{p}(i) is then defined to be the fiber

ℤ p(i)(R)=fib(Fil N iΔ R{i}→ϕ i−1Δ R{i})\mathbb{Z}_{p}(i)(R)=\fib(\Fil_{N}^{i}\Delta_{R}\lbrace i\rbrace\xrightarrow{\phi_{i}-1}\Delta_{R}\lbrace i\rbrace)

This construction globalizes and may be applied to p-adic formal schemes instead of just p-adically complete rings (see Bhatt21, Remark 2.14).

References

The syntomic site was introduced in

  • Jean-Marc Fontaine and William Messing, pp-Adic periods and pp-adic etale cohomology (pdf)

A construction of syntomic cohomology via prismatic cohomology is briefly discussed in

Further developments are in

  • Amnon Besser, Syntomic regulators and pp-adic integration I: rigid syntomic regulators (pdf)

The following shows that, just as Deligne-Beilinson cohomology may be interpreted as absolute Hodge cohomology, syntomic cohomology may be interpreted as pp-adic absolute Hodge cohomology.

Last revised on November 28, 2022 at 05:26:52. See the history of this page for a list of all contributions to it.