Greatest lower bounds on the Ricci curvature of Fano manifolds

Abstract

On a Fano manifold M we study the supremum of the possible t such that there is a K\"ahler metric in c1(M) with Ricci curvature bounded below by t. This is shown to be the same as the maximum existence time of Aubin's continuity path for finding K\"ahler-Einstein metrics. We show that on P2 blown up in one point this supremum is 6/7, and we give upper bounds for other manifolds.