Existence of Solutions to Systems of General Quadratic Functional Equations in Cn
Abstract
The main objective of this study is to investigate the existence and forms of solutions of systems of general quadratic functional equations in Cn. By utilizing Nevanlinna theory in Cn, we explore the existence and form of solutions for the several systems of general quadratic difference and partial differential-difference equations of the form af2 + 2α fg + bg2 + 2β f + 2γ g + C=0, where f and g are non-constant meromorphic functions in Cn. The obtained results in this article are improvements and generalizations of several results from [RACSAM, 116(8) (2022)]. Furthermore, appropriate remarks and illustrative examples are provided to validate and demonstrate the applicability of the obtained results concerning the existence and forms of solutions for such systems of equations.
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