On the conformal Ein invariants

Abstract

For a compact Riemannian n-manifold (M,g) of positive scalar curvature, the capital invariant of g is defined to be the infinimum over M of the quotient of the scalar curvature by the maximal eigenvalue of the Ricci curvature. This is a re-scale invariant and belongs to the interval (0,n]. For a positive conformal class [g], we define the conformal invariant ([g]):=\(g): g∈ [g]\. In this paper, we prove vanihing theorems for Betti numbers and for the higher homotopy groups of M under optimal lower bounds on ([g]) assuming that g is locally conformally flat. We establish an inequality relating our invariant to Schoen-Yau conformal invariant d(M,[g]) from which we deduce a classification result for locally conformally flat manifolds with higher ([g]). We show that the class of locally conformally flat manifolds with ([g])>k is stable under the operation of connected sums for 0<k<n-1.\\ For a general positive conformal class, we prove in dimension 4 an inequality relating ([g]) to the first and second Yamabe invariants. Similar results are proved in this paper for an analogous conformal invariant, namely the small invariant.