On compact Riemannian manifolds with volume-preserving symmetries

Locally symmetric K&EB manifolds may be ChOrDcterized a8 almost Hmwrian manifolds with symplectic or holomorphic local geodeaic symmetries. We extend the notion of a local geodesic symmetry and in particular, give a similar chmcterizntion of all Rrm.umiian locally s-regular manifolds with an s-struc

We prove that any metric of positive scalar curvature on a manifold X extends to the trace of any surgery in codim > 2 on X to a metric of positive scalar curvature which is product near the boundary. This provides a direct way to construct metrics of positive scalar curvature on compact manifolds w

By HEINZ MARBES of Berlinl) (Eingegangen am 30.12. 1980) ' U ( k ) = Ua,b(k) . Pa,b \*

Let (M, g) be a compact Riemannian manifold of dimension n ~2. First, we study the existence of positive solutions for generalized scalar curvature type equations; these equations are nonlinear, of critical Sobolev growth, and involve the p-Laplacian. Then, we study similar type of equations, but in