报告题目：Sone Results on the BR\"{U}CK Cojecture

报告人：高宗升教授（北京航天航空大学数学系）

时间：2014年12月23日（星期二）15：00-16：00

地点：理科楼数学系A304

摘要：The uniqueness theory of meromorphic function mainly studies conditions under which there exists essentially only one function satisfying these conditions. It is well known that any nonconstant polynomial with leading coefficient 1 is determined by its zeros. But it is not true for the transcendental entire or meromorphic functions. Therefore, how to uniquely determine a meromorphic function is interesting andcomplex.

In 1996, for the one CM shared value of functions, R.Br\"{u}ck proposed the following famous conjecture: Let $f(z)$ be a nonconstant entire function. Suppose that $\rho_2(f)$ is not a positive integer or infinite. If $f(z)$ and $f'(z)$ share one finite value $a$ CM, then ${f'(z)-a}=c(f(z)-a)$, where $c$ is some nonzero constant, $\rho_2(f)$ is the hyper-order of $f(z)$. In this talk, we will introduce the research status of this conjecture.

联系人：郑建华