An area growth estimate of the Liouville equation
Abstract: We establish an area growth estimate for solutions that are bounded from above of the Liouville equation $\Delta u+K e{2u}=0$ with a positive pinched curvature $0<\lambda\leq K\leq\Lambda$. As an application, we provide a new proof of Eremenko-Gui-Li-Xu's result in [EGLX]. We also classify solutions with an upper bound in the half plane with the boundary having constant geodesic curvature.
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