Entire holomorphic curves on a Fermat surface of low degree

Abstract

The purpose of the paper is to study some problems raised by Hayman and Gundersen about the existence of non-trivial entire and meromorphic solutions for the Fermat type functional equation fn+gn+hn=1. Hayman showed that no non-trivial meromorphic solutions and entire solutions exist when n 9 and n 7 respectively. By considering the entire holomorphic curves on the Fermat surface defined by Xn+Yn+Zn=Wn on the complex projective space P3 and applying the method of jet differentials, we show that no non-trivial meromorphic solutions and entire solutions exist when n 8 and n 6 respectively. In particular, this completes the investigation of non-trivial entire solutions for all n and respectively, meromorphic solutions for all cases except for n=7. Finally, for the generalized Fermat type functional equation fn+gm+hl=1, we will also prove the non-existence of non-trivial meromorphic solutions when 1/n+1/m+1/l 3/8, giving the strongest result obtained so far.