Crystal (mathematics) explained
In mathematics, crystals are Cartesian sections of certain fibered categories. They were introduced by, who named them crystals because in some sense they are "rigid" and "grow". In particular quasicoherent crystals over the crystalline site are analogous to quasicoherent modules over a scheme.
An isocrystal is a crystal up to isogeny. They are
-adic analogues of
-adic étale
sheaves, introduced by and (though the definition of isocrystal only appears in part II of this paper by). Convergent isocrystals are a variation of isocrystals that work better over non-perfect fields, and overconvergent isocrystals are another variation related to overconvergent cohomology theories.
A Dieudonné crystal is a crystal with Verschiebung and Frobenius maps. An F-crystal is a structure in semilinear algebra somewhat related to crystals.
Crystals over the infinitesimal and crystalline sites
The infinitesimal site
has as objects the infinitesimal extensions of open sets of
.If
is a scheme over
then the sheaf
is defined by
= coordinate ring of
, where we write
as an abbreviation for an object
of
. Sheaves on this site
grow in the sense that they can be extended from open sets to infinitesimal extensions of open sets.
A crystal on the site
is a sheaf
of
modules that is
rigid in the following sense:
for any map
between objects
,
; of
, the natural map from
to
is an isomorphism.This is similar to the definition of a
quasicoherent sheaf of modules in the Zariski topology.
An example of a crystal is the sheaf
.
Crystals on the crystalline site are defined in a similar way.
Crystals in fibered categories
In general, if
is a fibered category over
, then a crystal is a cartesian section of the fibered category. In the special case when
is the category of infinitesimal extensions of a scheme
and
the category of quasicoherent modules over objects of
, then crystals of this fibered category are the same as crystals of the infinitesimal site.
References
- Ogus . Arthur . F-isocrystals and de Rham cohomology II—Convergent isocrystals . Duke Mathematical Journal . 1 December 1984 . 51 . 4 . 10.1215/S0012-7094-84-05136-6.
- Berthelot . P. . Ogus . A. . F-isocrystals and de Rham cohomology. I . Inventiones Mathematicae . June 1983 . 72 . 2 . 159–199 . 10.1007/BF01389319.
- (letter to Atiyah, Oct. 14 1963)
