Abstract
The paper is concerned with description of entire solutions of the partial differential equations $u_{z_{1}}^{m}+u_{z_{2}}^{n}=e^{g}$, where $m \geq 2$, $n \geq 2$ are integers and $g$ is a polynomial or an entire function in ${\bf C}^{2}$. Descriptions are given and complemented by various examples.
Citation
Bao Qin Li. "Entire solutions of $(u_{z_{1}})^{m}+(u_{z_{2}})^{n}=e^{g}$." Nagoya Math. J. 178 151 - 162, 2005.
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