On partial differential equations of Waring's-problem form in several complex variables

Abstract

In this paper, we first consider the pseudoprimeness of meromorphic solutions u to a family of partial differential equations (PDEs) H(uz1,uz2,…,uzn)=P(u) of Waring's-problem form, where H(z1,z2,…,zn) is a nontrivial homogenous polynomial of degree in Cn and P(w) is a polynomial of degree in C with all zeros distinct. Then, we study when these PDEs can admit entire solutions in Cn and further find these solutions for important cases including particularly uz1+uz2+·s+uzn=u, which are (often said to be) PDEs of super-Fermat form if =0, and an eikonal equation if =2 and =0.