摘要
运用Nevanlinna理论和值分布理论中的知识讨论了亚纯函数关于Gross问题的唯一性问题,通过改变亏量条件(及极点的个数)减少IM分担集中的元素个数。亏量越大,集合中的元素个数越少,反之亦成立。
In this paper,the uniqueness of meromorphic functions concerning Gross problem was discussed by using the Theory of Nevanlinna,and the cardinal number of the $URSM$ as limiting the deficient value of the functions was reduced. the less cardinal number in a set,the larger deficient value.Be founded on the contrary also.
出处
《廊坊师范学院学报(自然科学版)》
2010年第3期12-14,共3页
Journal of Langfang Normal University(Natural Science Edition)
关键词
亚纯函数
亏量
分担值集
唯一性
meromorphic function
deficient value
sharing set
uniqueness.