Definition:Local Coordinates

Definition
Let $X$ be an $n$-dimensional manifold.

Let $p \in X$, and let $U \subset X$ be a neighbourhood of $p$.

Then a set of mappings $x_i: U \to \R$, $1 \le i \le n$, satisfying:


 * $a = b \iff \forall i: \map {x_i} a = \map {x_i} b$

is called a set of local coordinates.

When the neighbourhood $U$ is to be stressed, one may also say local coordinates for $U$.

Similarly, when the element $p$ is to be stressed, one may also say local coordinates around $p$.

Also see

 * Existence of Local Coordinates