There is a theorem :

1) 2-dim generalized Riemannian manifold must be local conformal flat;

2) 3-dim generalized Riemannian manifold is local conformal flat iff the Cotton tensor vanishes.

3) n-dim (n>3) generalized Riemannian manifold is local conformal flat iff the Weyl tensor vanished.

Then I'm curious about the necessary and sufficient condition for  $\textbf{global}$ conformal flatness of a n-dim generalized Riemannian manifold.