nLab torsion module

Contents

Context

Linear algebra

Definition

For modules over rings
For $\infty$ -modules over $E_\infty$ -rings

Related concdepts
References

Definition

For modules over rings

Given a ring $R$ , an element $m$ in an $R$ -module $M$ is torsion element if there is a nonzero element $r$ in $R$ such that $r m=0$ . In constructive mathematics, given a ring $R$ with a tight apartness relation $\#$ , an element $m$ in an $R$ -module $M$ is a torsion element if there is a element $r$ in $R$ such that $r \# 0$ and $r m=0$ .

A torsion module is a module whose elements are all torsion. A torsion-free module is a module whose elements are not torsion, other than $0$ .

More generally, given an ideal $\mathfrak{a} \subset R$ then an $\mathfrak{a}$ -torsion module is one all whose elements are annihilated by some power of elements in $\mathfrak{a}$ .

For $\infty$ -modules over $E_\infty$ -rings

Let $A$ be an E-∞ ring and $\mathfrak{a} \subset \pi_0 A$ a finitely generated ideal of its underlying commutative ring.

Definition

An $A$ -∞-module $N$ is an $\mathfrak{a}$ -torsion module if for all elements $n \in \pi_k N$ and all elements $a \in \mathfrak{a}$ there is $k \in \mathbb{N}$ such that $a^k n = 0$ .