Definition:Dimension of Module

Definition
Let $R$ be a ring with unity.

Let $G$ be a unitary $R$-module which has a basis of $n$ elements.

Then $G$ is said to have a dimension of $n$ or to be $n$-dimensional.

The dimension of a free $R$-module $G$ is denoted $\map {\dim_R} G$, or just $\map \dim G$.

Also see

 * Bases of Free Module have Equal Cardinality
 * Definition:Rank of Module