摘要
以本文作者所建立的Nevalinna第二基本定理的一种推广形式为基本工具,对涉及慢增长函数的亚纯函数唯一性问题进行了研究,改进了R.Nevanlinna,仪洪勋及本文作者的几个唯一性定理.这些结果表明,亚纯函数可由其与一些慢增长函数同值的点所唯一确定.
With a generalization for Nevanlinna's basic theorem 2,the uniqueness problems of meromorphic functions involving some functions growing slowly have been discussed,and R.Nevanlinna at al's some theorems have ben improved.These results show that the meromorphic functions can be uniquely determined by some functions growing slowly at the same points.
出处
《西安工业学院学报》
1994年第3期238-242,共5页
Journal of Xi'an Institute of Technology
关键词
慢增长函数
唯一性定理
半纯函数
meromorphic functions functions growing slowly unicity theorem