Nevanlinna Theory On Geodesic Balls Of Complete K\"ahler Manifolds

We study Nevanlinna theory of meromorphic mappings from a geodesic ball of a general complete K\"ahler manifold with non-negative Ricci curvature into a complex projective manifold. When dimension of a target manifold is not greater than dimension of a source manifold, we establish a second main theorem which is a generalization of the classical second main theorem for a ball of Cᵐ. In particular, if a source manifold is non-compact and it carries a positive global Green function, then one has a second main theorem for the whole source manifold. Consequently, we obtain a Picard's theorem.