摘要
本文给出了方程(11)具有一个(或两个线性无关)解其零点收敛指数小于(或不小于)A(z)的增长级的必要条件(或充分条件).我们得到了4个定理并且推广了I.Laine的两个结果,我们还证明了如果A(z)是无穷级的整函数,则方程(1.1)的任两线性无关解或者无零点或者至少有一解其零点收敛指数为无穷.
We give essential(or sufficient)conditions on A(z)that the equation y'+A(z)y=0possess one(or two linearly independent)solution with the exponent of convergence of its zerosless(or no less)than the growth orderof A(z).We obtain four theorems and generalize tworesults of I. Laine. We also prove tliat if A(z)is an entire of infinite order,then any two linearlyindependent solutions of y'+A(z)y=0 have no zeros unless the maximum value of the exponentsof convergence of their zeros is infinite.
出处
《数学学报(中文版)》
SCIE
CSCD
北大核心
1995年第1期45-50,共6页
Acta Mathematica Sinica:Chinese Series
基金
新疆教委高校科研资助课题
关键词
复振荡
收敛指数
解
微分方程
线性
complex oscillation,the exponent of convergence, growth order,linearly indepen-dent solutions
