Immersion

Definition

Let $M$ and $N$ be differential manifolds. A differentiable map $f : M \to N$ is termed an immersion at a point $m \in M$ , the induced map $d f_{m} : T_{m} M \to T_{F (m)} N$ is injective.

$f$ is called an immersion if it is an immersion at every point in $M$ .

We also say that $M$ is an immersed manifold in $N$ .

Related notions

Submersion, which is the same as a regular map