多项式系数的齐次微分方程解的级与零点

doi:10.12677/pm.2011.13041

期刊菜单

多项式系数的齐次微分方程解的级与零点
The Order and Zeros of the Solutions of the Differential Equation with Polynomial Coefficients

DOI: 10.12677/pm.2011.13041, PDF, HTML, 下载: 3,022 浏览: 7,196
作者: 丁培雄^*, 陈宗煊：
关键词: 齐次线性微分方程；级；线性无关
Linear Differential Equation; Order; Linearly Independent

摘要: 本文研究的是齐次线性微分方程f^(k)+A_k-1f^(X-1)+...+A₀f=0的解的性质，其中系数A_j 是多项式，A_s 起控制作用，在满足某些条件的情况下，我们得到了：该方程的若干个线性无关解的级与零点收敛指数跟A_s 有紧密联系。

Abstract: This paper investigates the properties of solutions to a linear differential equation f^(k)+A_k-1f^(X-1)+...+A₀f=0 , whose coefficients A_j are polynomial. If A_s plays a main role and satisfy some particular conditions, we draw a conclusion that A_s make a compact connection with the solutions of this equation.

文章引用：丁培雄, 陈宗煊. 多项式系数的齐次微分方程解的级与零点[J]. 理论数学, 2011, 1(3): 214-223. http://dx.doi.org/10.12677/pm.2011.13041

参考文献

[1]	杨乐. 值分布论及其新研究[M]. 北京: 科学出版社, 1982.
[2]	高仕安, 陈特为, 陈宗煊. A note concerning the complex oscillation and the growth of solutions for higher order homogeneous linear differential equations. Journal of Mathematical Analysis Application, 1990, 153: 159-178.
[3]	Z. X. Chen. On the hyper order of solution of higher order differential equations. Chinese Annals of Mathematics, 2003, 24(4): 501-508.
[4]	何育赞, 肖修治. 代数体函数与常微分方程[M]. 北京: 科学出版社, 1988.
[5]	G. Gundersen. Estimates for the logarithmic derivative of a meromorphic function, plus similar estimates. Journal of London Mathematical Society, 1988, 37(1): 88-104.
[6]	G. Frank, S. Hellerstein. On the meromorphic solutions of nonhomogeneous linear differential equations with polynomial coefficients. Proceedings of the London Mathematical Society, 1986, 53(3): 407-428.

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