Blow--up Solutions of Liouville's Equation and Quasi--Normality
Abstract
We prove that the family FC(D) of all meromorphic functions f on a domain D⊂eq 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 C. We also discuss the close relations between this result and the well--known work of Br\'ezis 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.
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