On the existence of entire solutions to a system of nonlinear Fermat-type partial differential-difference equations
Abstract
The aim of this study is to investigate the precise form of finite-order entire solutions to the following system of Fermat-type partial differential-difference equations: cases (∂ f1(z1, z2, …, zm )∂ z1)n1 + f2m1 (z1 + c1, z2 + c2, …, zm + cm ) = 1,\\ (∂ f2(z1, z2, …, zm )∂ z1)n2 + f1m2 (z1 + c1, z2 + c2, …, zm + cm ) = 1 cases for various combinations of the positive integers n1, n2, m1 and m2. Our results extend the work of Xu et al. (Entire solutions for several systems of non-linear difference and partial differential-difference equations of Fermat-type, J. Math. Anal. Appl., 483(2), 2020), generalizing the setting C2 to Cm. Several examples are provided to illustrate the applicability and sharpness of the obtained results.
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