Topological module

In mathematics, a topological module is a module over a topological ring such that scalar multiplication and addition are continuous.

A topological vector space is a topological module over a topological field.

An abelian topological group can be considered as a topological module over ${\displaystyle \mathbb{Z},}$ where ${\displaystyle \mathbb{Z}}$ is the ring of integers with the discrete topology.

A topological ring is a topological module over each of its subrings.

A more complicated example is the ${\displaystyle I}$-adic topology on a ring and its modules. Let ${\displaystyle I}$ be an ideal of a ring ${\displaystyle R.}$ The sets of the form ${\displaystyle x+I^n}$ for all ${\displaystyle x\in R}$ and all positive integers ${\displaystyle n,}$ form a base for a topology on ${\displaystyle R}$ that makes ${\displaystyle R}$ into a topological ring. Then for any left ${\displaystyle R}$-module ${\displaystyle M,}$ the sets of the form ${\displaystyle x+I^{n}M,}$ for all ${\displaystyle x\in M}$ and all positive integers ${\displaystyle n,}$ form a base for a topology on ${\displaystyle M}$ that makes ${\displaystyle M}$ into a topological module over the topological ring ${\displaystyle R.}$

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