Campana's orbifold conjecture for numerically equivalent divisors

Abstract

We prove the following version of the Campana's orbifold conjecture: Let X be a complex non-singular projective variety of dimension n. Let D1,…,Dn+1 be Z-linearly independent effective divisors in Div(X) and D:=D1+·s+Dn+1 be a normal crossing divisor of X. Assume furthermore that they are numerically parallel. Let =Σi=1n+1 (1-mi-1) Di and let f: C (X,) be an orbifold entire curve. Then, there exists a positive integer such that, the orbifold (X,) is of general type, where =Σi=1n+1 (1-1)Di, and if f has multiplicity at least along Di, 1 i n+1, then f must be algebraically degenerate.