Spahn p-torsion (Rev #2)

p-torsion of abelian groups

Since any abelian group $G$ is a $\mathbb{Z}$ -module we can form for any $z\in \mathbb{N}$ the set

G[z]:=\{z|z\in G, g^z=0\}

which is a subgroup of $G$ called $z$ -torsion subgroup of $G$ .

Of particular interest are those cases where $z=p^n$ for a prime number and a natural number $n$ .

There are two important constructions to perform with these $G[p^n]$ namely taking limits and colimits:

S_p(G):=colim_n G[p^n]

and

T_p(G):=lim G[p^n]

Here $S_p(G)$ sometimes itself is called $p$ -torsion subgroup; if $G$ is finite $S_p(G)$ is also called Sylow p-subgroup? of $G$ .

$T_p(G)$ is called p-adic Tate module of $G$ .

p-torsion of fields

$G[p]$ is obviously the kernel of the Frobenius endomorphism of $G$ :

G[p]=(ker\, (g\mapsto g^n))

In this form we can extend the Frobenius and hence this notion of $p$ -torsion from abelian groups to fields if we require our field to be of characteristic $p$ such that we have $(a+b)^n=a^n+b^n$ .

In fact the definition of $p$ -torsion via the Frobenius has the advantage that we get additionally an adjoint notion to $p$ -torsion which is sometimes called Verschiebung; this is explained at Demazure, lectures on p-divisible groups, I.9, the Frobenius morphism.

p-torsion of schemes

If $X$ denotes some scheme over a $k$ ring for $k$ being a field of characteristic $p$ , we define its $p$ -torsion component-wise by $X^{(p)}(R):=X(R^{(p)})$ .

p-torsion of group schemes

Example

(the $p$ -adic Tate module)

Let $G$ be a commutative group scheme over a field $k$ with separable closure $k^{sep}$ .

Then $T_p(G(k^{sep}))$ is called the $p$ -adic Tate module of $G$ .

If $G$ is an abelian variety $T_p(G(k^{sep}))$ is equivalently the first homology group of $G$ .

Revision on July 18, 2012 at 17:47:21 by Stephan Alexander Spahn?. See the history of this page for a list of all contributions to it.