In this paper, we give some results on the algebraic dependence of meromorphic mappings from a complete Kähler manifold whose universal covering is biholomorphic to a ball in ${ℂ}^m$ into ${\mathbb{P}}^n(ℂ)$ sharing few hyperplanes in subgeneral position with truncated multiplicities to level $p$, where all zeros with multiplicities greater than certain values do not need to be counted. Our results are generalizations and improvements of the previous results in recent times.

中文翻译：

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从完全凯勒流形到共享很少超平面的射影空间的亚纯映射的代数依赖性

在本文中，我们给出了来自完全凯勒流形的亚纯映射的代数依赖性的一些结果，该流形的通用覆盖对于球来说是双全纯的${ℂ}^{米}$进入${\mathbb{P}}^n（ℂ）$在次一般位置共享少量超平面，并将多重性截断至水平$p$，其中重数大于特定值的所有零都不需要计算。我们的结果是近期对先前结果的概括和改进。