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Let a commutative unitary ring. Let denote the ring of Witt vectors of . Let
In general an assignation of an object of linear algebra to a -divisible group is called a Dieudonné theory?.
There is a Dieudonné theory assigning to a formal -divisible group over an excellent p-adic ring? an object called a display. On the display one can read off the structural equations for the Cartier module? of .
Let a commutative unitary ring. Let denote the ring of Witt vectors of . Let
denote the morphism of rings assigning to Witt vector its correspnding Witt polynomial. Let
denote the Verschiebung morphism? which is a morphism of the underlying additive groups. Let be a prime number? and let
denote the Frobenius morphism?. Then Frobenius, Verschiebung, and the Witt-polynomial morphism satisfy the ‘’-adic Witt-Frobenius identities’’:
A -display over R is defined to be a quadruple where is a finitely generated projective -module, is a submodule and and are -linear maps , .
The following properties are satisfied:
and is a direct summand of the −module .
is a -linear epimorphism.
For and , we have .
Let be a invertible matrix satisfying
a)
b)
Let denote the inverse matrix of . Let let deonte the matrix obtained by raising all entries to the -th power. is said to satisfy the -nilpotence condition if there is a natural number such that .
Then a -display satisfying the -nilpotence condition locally on the spectrum? is called a display.
Last revised on June 4, 2012 at 14:37:00. See the history of this page for a list of all contributions to it.