Entire Solutions for quadratic trinomial-type partial differential-difference equations in Cn

Abstract

In this paper, utilizing Nevanlinna theory, we study existence and forms of the entire solutions f of the quadratic trinomial-type partial differential-difference equations in Cn align* a(α∂ f(z)∂ zi + β∂ f(z)∂ zj)2 + 2 ω (α∂ f(z)∂ zi + β∂ f(z)∂ zj) f(z + c) + b f(z + c)2 = eg(z) align* and align* a(α∂ f(z)∂ zi + β∂ f(z)∂ zj)2 & + 2 ω (α∂ f(z)∂ zi + β∂ f(z)∂ zj) cf(z) + b [cf(z)]2 = eg(z), align* where a, ω, b∈C , g is a polynomial in Cn and cf(z)=f(z+c)-f(z) . The main results of the paper improve several existence results in Cn for integer n≥ 2 and 1≤ i<j≤ n and their corollaries of the paper are an extension of the results of Xu et al. for trinomial equation with arbitrary coefficient in C2 . Moreover, examples are exhibited to validate the conclusion of the main results.