Definition

A smooth function $f : X \to Y$ between two smooth manifolds is a local diffeomorphism if the following equivalent conditions hold

• $f$ is both a submersion and an immersion;

• for each point $x \in X$ the derivative $d f : T_x X \to T_{f(x)} Y$ is an isomorphism of tangent vector spaces;

• the canonical diagram

  $$\array{ T X &\stackrel{d f}{\to}& T Y \\ \downarrow && \downarrow \\ X &\stackrel{f}{\to}& Y }$$

  (with the differential between the tangent bundles) on top is a pullback;

• for each point $x \in X$ there exists an open subset $x \in U \subset X$ such that

  1. the image $f(U)$ is an open subset in $Y$;

  2. $f$ restricted to $U$ is a diffeomorphism onto its image

     $$f|_U : U \stackrel{\simeq}{\to} f(U)$$