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Blow--up Solutions of Liouville's Equation and Quasi--Normality

We prove that the family $\mathcal{F}_C(D)$ of all meromorphic functions $f$ on a domain $D\subseteq \mathbb{C}$ with the property that the spherical area of the image domain $f(D)$ is uniformly bounded by $C π$ is quasi--normal of order $\le C$. We also discuss the close relations between this result and the well--known work of Brézis and Merle on blow--up solutions of Liouville's equation. These results are completely in the spirit of Gromov's compactness theorem, as pointed out at the end of the paper.

preprint2020arXivOpen access
Jürgen GrahlDaniela KrausOliver Roth
math.CVmath.APmath.CA
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Jürgen GrahlDaniela KrausOliver Roth

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