THE VALUE DISTRIBUTION OF GAUSS MAPS OF IMMERSED HARMONIC SURFACES WITH RAMIFICATION

doi:10.1007/s10473-022-0109-9

Abstract

Abstract: Motivated by the result of Chen-Liu-Ru[1], we investigate the value distribution properties for the generalized Gauss maps of weakly complete harmonic surfaces immersed in $\Bbb{R}^n$ with ramification, which can be seen as a generalization of the results in the case of the minimal surfaces. In addition, we give an estimate of the Gauss curvature for the K-quasiconfomal harmonic surfaces whose generalized Gauss map is ramified over a set of hyperplanes.

Key words: value distribution, harmonic surfaces, quasiconformal mappings, conformal metric, Gauss map

CLC Number:

32H25

Zhixue LIU, Yezhou LI, Xingdi CHEN. THE VALUE DISTRIBUTION OF GAUSS MAPS OF IMMERSED HARMONIC SURFACES WITH RAMIFICATION[J].Acta mathematica scientia,Series B, 2022, 42(1): 172-186.

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