Entire solution of a partial differential equation
Abstract
In this paper, using Nevanlinna's value distribution theory of meromorphic functions in several complex variables, we study for the existence of entire solutions f in C2 of the following partial differential equation \[a1(∂ f(z1,z2)∂ z1)n+a2fn(z1,z2)=p1er(z1,z2)+p2es(z1,z2),\] where n is a positive integer such that n≥ 3, a1,a2,p1,p2 are non-zero constants and r(z1,z2), s(z1,z2) are arbitrary polynomials in C2.
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