检索规则说明:AND代表“并且”;OR代表“或者”;NOT代表“不包含”;(注意必须大写,运算符两边需空一格)
检 索 范 例 :范例一: (K=图书馆学 OR K=情报学) AND A=范并思 范例二:J=计算机应用与软件 AND (U=C++ OR U=Basic) NOT M=Visual
名 称:
注 释:
作 者:朱新瑶 刘晓俊[1] ZHU Xinyao;LIU Xiaojun(College of Science,University of Shanghai for Science and Technology,Shanghai 200093,China)
机构地区:[1]上海理工大学理学院
出 处:《上海理工大学学报》2019年第6期516-520,共5页Journal of University of Shanghai For Science and Technology
基 金:国家自然科学基金资助项目(11401381)
摘 要:利用现有的亚纯函数与其一阶导数和k阶导数的唯一性结论,结合代数体函数与其一阶导数的唯一性相关结论,将Frank和Weissenborn研究的亚纯函数与其k阶导数存在的唯一性定理推广到代数体函数,研究代数体函数与其k阶导数存在的唯一性问题,得到结果:v(v?2)值代数体函数与其k阶导函数至少CM分担2 v个小函数且IM分担∞,则二者相等。由此,可得推论:对v(v?2)值代数体函数与其k阶导函数CM分担2 v个小函数且IM分担∞,则二者相等。对v值代数体函数与其一阶导函数而言,当v?3时,分担值的个数可以减为2v-1个,即得到:v(v?3)值代数体函数与其一阶导函数至少CM分担包括0在内的2v-1个有限复数且IM分担∞,则二者相等。By using the conclusion of uniqueness of meromorphic function and its first and k-th derivative, and combining the conclusion of the uniqueness of algebroid function and its first derivative,the uniqueness theorem of meromorphic function and its k-th derivative studied by Frank and Weissenborn is extended to algebroid function. The results show that if a v-valued algebroid function(v≥2) and its k-th derivative function at least CM share 2 v small functions and IM share ∞, then the two are equal. Herefrom, it is inferenced that if a v-valued algebroid function(v≥2) and its k-th derivative function CM share 2 v small functions and IM share ∞, then the two are equal. The number of shared values can be reduced to 2 v-1, when the v-value is equal to or greater than 3(v≥3), that is, if an algebroid body function and its derivative functions CM share 2 v-1 finite complex numbers including 0 and IM share ∞, then the two are equal.
正在载入数据...
正在载入数据...
正在载入数据...
正在载入数据...
正在载入数据...
正在载入数据...
正在载入数据...
正在链接到云南高校图书馆文献保障联盟下载...
云南高校图书馆联盟文献共享服务平台 版权所有©
您的IP:18.116.23.178