Analytic Ax-Schanuel Theorem for semi-abelian varieties and Nevanlinna theory

Abstract

The purpose of this paper is to explore Nevanlinna theory of the entire curve A f:=(Af,f): A × (A) associated with an entire curve f: (A), where A:(A) A is an exponential map of a semi-abelian variety A. Firstly we give a Nevanlinna theoretic proof to the analytic Ax-Schanuel Theorem for semi-abelian varieties, which was proved by J. Ax 1972 in the case of formal power series (Ax-Schanuel Theorem). We assume some non-degeneracy condition for f such that the elements of the vector-valued function f(z)-f(0) ∈ (A) n are -linearly independent in the case of A=(*)n. Then by making use of the Log Bloch-Ochiai Theorem and a key estimate which we show, we prove that \, A f ≥ n+ 1. Our next aim is to establish a 2nd Main Theorem for A f and its k-jet lifts with truncated counting functions at level one.