%0 Journal Article %T 非线性微分-差分方程的解<br>SOLUTIONS OF NONLINEAR DIFFERENTIAL-DIFFERENCE EQUATIONS %A 作者 %A 张石梅 %A 龙见仁 %A 吴秀碧 %J 数学杂志 %D 2018 %X 本文研究了非线性微分-差分方程f(z)n+an-1f(z)n-1+…+a1f(z)+q(z)eQ(z)f(k)(z+c)=P(z)的有穷级非零整函数解的增长性和零点分布问题.利用微分-差分Nevanlinna值分布的方法,获得了当方程的系数满足一定条件时,方程解的增长性估计和零点分类.特别地,当n=2,a1≠0指数多项式解满足某些条件时,获得了解具有特别的形式.该结果推广了先前文献[1,2]的结果.<br>In this paper, we study the growth and distribution of zeros of entire solutions of finite order of nonlinear differential-difference equation f(z)n+an-1f(z)n-1+…+a1f(z)+q(z)eQ(z)f(k)(z+c)=P (z). By using the differential-difference Nevanlinna values distribution theory, we obtain an estimation of the growth and the distribution of zeros of solutions of the differential-difference equation if there are some attached condiction on the coefficients. Particularly, when n=2 and a1≠0, we obtain that exponential polynomial solutions satisfying some condictions must reduce to rather specific forms, which improves the results of [1, 2] %K 微分-差分方程 指数多项式 有穷级< %K br> %K differential-difference equation exponential polynomial finite order %U http://sxzz.whu.edu.cn/sxzz/ch/reader/view_abstract.aspx?file_no=20180617&flag=1