Geodesic Equations on asymptotically locally Euclidean K\"ahler manifolds

Abstract

We solve the geodesic equation in the space of K\"ahler metrics under the setting of asymptotically locally Euclidean (ALE) K\"ahler manifolds and we prove global C1,1 regularity of the solution. Then, we relate the solution of the geodesic equation to the uniqueness of scalar-flat ALE metrics. To this end, we study the asymptotic behavior of -geodesics at spatial infinity. Under the assumption that the Ricci curvature of a reference ALE K\"ahler metric is non-positive, convexity of the Mabuchi K-energy along -geodesics. However, we will also prove that on the line bundle O(-k) over CPn-1 with n ≥ 2 and k ≠ n, no ALE K\"ahler metric can have non-positive (or non-negative) Ricci curvature.