Meromorphic mappings into projective varieties intersecting arbitrary families of moving hypersurfaces

Abstract

In this paper, we establish a general second main theorem for meromorphic mappings from Cm into a subvariety V of Pn( C) with respect to an arbitrary family of slowly moving hypersurfaces Q=\Q1,…,Qq\. In contrast to the usual setting, the mapping is not required to be algebraically nondegenerate over the field K Q. Moreover, the truncation levels of the counting functions are explicitly estimated, and the total defect bound is given by Δ Q,V(3 V-1), which is independent of the mapping f, where Δ Q,V denotes the distributive constant of Q with respect to V.