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单位圆内高阶齐次线性微分方程解的复振荡 被引量:2

The Complex Oscllation of Higher Order Homogeneous Linear Differential Equations in the Unit Disc
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摘要 对高阶齐次线性微分方程f(k)(z)+Ak-1(z)f(k-1)(z)+Ak-2(z)f(k-2)(z)+…+A1(z)f′(z)+A0(z)f(z)=0的解进行了研究,其中Aj(z)(j=0,1,2,…,k-1)为单位圆△={z∶|z|<1}内的解析函数,给出了高阶齐次线性微分方程解的增长性与系数增长性之间的关系,并证明了高阶齐次线性微分方程的亚纯可允许解在单位圆内的充满圆序列的存在性. This paper investigates deeply the complex oscillation of higher order homogeneous linear differential equations of the form f(k)(z)+Ak-1(z)f(k-1)(z)+Ak-2(z)f(k-2)(z)+…+A1(z)f ′(z)+A0(z)f(z)=0 Where the coefficients are analytic functions in the unit disc Aj(z)(j=0,1,2,…,k-1),and relations between the growthes of the solu-tion and the coefficeient of higher order homogeneous linear differential equations are given out,and exist of the filling circle align-ment of meromorphic permissble solution of higher order homogeneous linear differential equations are proved in the unit disc.
作者 金瑾
机构地区 毕节学院数学系
出处 《山西大同大学学报(自然科学版)》 2010年第3期1-5,共5页 Journal of Shanxi Datong University(Natural Science Edition)
基金 贵州省科学技术基金项目[2010GZ43286] 贵州省教育厅资助项目[2007079] 毕节学院科研基金资助项目[20072004]
关键词 单位圆 解析函数 充满圆 可允许解 unit disc order filling circle permissble solution
分类号 O174.52 [理学—基础数学]
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二级参考文献8

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共引文献37

同被引文献23

  • 1金瑾.复方程f″+Af=0的解的零点充满圆[J].数学进展,2005,34(5):609-613. 被引量:28
  • 2陈宗煊,孙光镐.一类二阶微分方程的解和小函数的关系[J].数学年刊(A辑),2006,27(4):431-442. 被引量:29
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  • 6Chen Z X, Shon K H, The growth of solutions of differenti- al equations with coefficients of small growth in the disc [J]. J Math Anal Appl, 2004,297 : 285-304.
  • 7Cao T B, Yi H X. The growth of linear differential equa- tions with coefficients of iterated order in the unit disc[J].Math Anal Appl,2006,319:79-294.
  • 8Jin J. The hyper order of solutions of higher order linear differential equations with analytic coefficients in the unit disc[C]//Proceedings of the 5th International Congress on Mathematical Biology ( ICMB2011 ). [ S. l. ]: [ s. n. ], 2011:131-142.
  • 9石宁生,金瑾.一类微分方程的解及其解的导数与不动点的关系[M].数学的实践与认识,2011,41(22):185-190.
  • 10Jin J. The fixed point and hyper order of solutions of higher order nonhomogeneous linear differential equations with mer- omorphic function coeffeents [J]. Mechanicaland Aerospace Engineering(ICMAE2011), 2011,110 : 3297-3300.

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山西大同大学学报(自然科学版)
2010年 第3期

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