Characterization of strongly convex K\"ahler-Berwald metrics

Abstract

Let F: T1,0M→[0,+∞) be a strongly convex complex Finsler metric on a complex manifold M and J the canonical complex structure on the complex manifold T1,0M. We give a geometric characterization of strongly convex K\"ahler-Berwald metrics. In particular, we prove that J is horizontally parallel with respect to the Cartan connection iff F is a K\"ahler-Berwald metric. We also prove that the Cartan connection and the Chern-Finsler connection associated to F coincide iff J is both horizontal and vertical parallel with respect to the Cartan connection. Based on these results, we give a rigidity theorem of strongly convex K\"ahler-Berwald metrics with constant holomorphic sectional curvatures.