On the scalar curvature of self-dual manifolds

Conditions on the geometric structure of a complete Riemannian manifold are given to solve the prescribed scalar curvature problem. In some cases, the conformal metric obtained is complete. A minimizing sequence is constructed which converges strongly to a solution. © Academic des ScienceslElsevier,

COMPACT MANIFOLDS OF CONSTANT SCALAR CURVATURE ABSTI~CT. We consider a compact non-negatively curved Riemannian manifold M of constant scalar curvature and obtain a sufficient condition for it to be isometric to a sphere.

Let (M n , g), n 3, be a smooth closed Riemannian manifold with positive scalar curvature R g . There exists a positive constant C = C(M, g) defined by mean curvature of Euclidean isometric immersions, which is a geometric invariant, such that R g n(n -1)C. In this paper we prove that R g = n(n -1)C