Algebraic dependence and finiteness problems of differentiably nondegenerate meromorphic mappings on K\"ahler manifolds

Abstract

Let M be a complete K\"ahler manifold, whose universal covering is biholomorphic to a ball Bm(R0) in Cm (0<R0 +∞). Our first aim in this paper is to study the algebraic dependence problem of differentiably meromorphic mappings. We will show that if k differentibility nondegenerate meromorphic mappings f1,…,fk of M into Pn( C)\ (n 2) satisfying the condition (C) and sharing few hyperplanes in subgeneral position regardless of multiplicity then f1·s fk 0. For the second aim, we will show that there are at most two different differentiably nondegenerate meromorphic mappings of M into Pn( C) sharing q\ (q 2N-n+3+O()) hyperplanes in N-subgeneral position regardless of multiplicity. Our results generalize previous finiteness and uniqueness theorems for differentiably meromorphic mappings of Cm and extend some previous results for the case of mappings on K\"ahler manifold.