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奇异无穷多点边值问题的正解 被引量:1

Positive Solutions of Singular ∞-Point Boundary Value Problems
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摘要 应用不动点指数方法,在与相应线性算子第一特征值有关的条件下,得到一类奇异无穷多点边值问题正解的存在性结果,推广和改进了已有文献中的主要结果. The existence of positive solutions for a class of singular ∞-point boundary value problem was obtained by applying the fixed point index theory under some conditions concerning the first eigenvalueas of relevant linear operator. It also can extend and improve the main results in early literature.
作者 袁邢华 蒋巧云
机构地区 南通大学理学院
出处 《南通大学学报(自然科学版)》 CAS 2015年第1期91-94,共4页 Journal of Nantong University(Natural Science Edition) 
基金 南通大学自然科学基金项目(12Z028)
关键词 无穷多点边值问题 不动点指数 正解存在性 ∞-point boundary value problem fixed point index existence of positive solutions
分类号 O175.15 [理学—基础数学]
  • 相关文献

参考文献10

  • 1II'in V A, Moiseev E I. Nonlocal boundary value problem of th frist kind for a Sturm-Liouville operator in its differential and finite difference aspects [J ]. Differential Equations. 1987, 23(7) :803-810.
  • 2Cupta C P. Solvability of a three-point nonlinear boundary value problem for a second order ordinary differential equa- tion[J]. J Math Anal Appl, 1992, 168(2) :540-551.
  • 3Ma Ruyun. Existence theorems for a second order three- point boundary value problem[J]. J Math Anal Appl, 1997, 212(2) :430-442.
  • 4马如云,范虹霞,韩晓玲.二阶常微分方程无穷多点边值问题的正解[J].数学物理学报(A辑),2009,29(3):699-706. 被引量:13
  • 5Zhang Guowei, Sun Jingxian. Positive solutions of m-point boundary value problem. J Math Anal Appl, 2004, 291 (2) :406-418.
  • 6袁邢华,蒋巧云.弱紧型条件下Banach空间中一类非线性Volterra型积分方程解的存在性[J].南通大学学报(自然科学版),2008,7(2):77-81. 被引量:2
  • 7袁邢华,蒋巧云.奇异三点边值问题的正解[J].南通大学学报(自然科学版),2014,13(2):91-94. 被引量:2
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二级参考文献22

  • 1陈芳启.Banach空间中Volterra积分方程解的存在性及单调迭代方法[J].高校应用数学学报(A辑),1998,13(4):393-399. 被引量:1
  • 2刘立山,孙经先.Banach空间中非线性混合型微分积分方程的可解性[J].系统科学与数学,1996,16(3):253-259. 被引量:18
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  • 5II'in V A, Moiseev E I. Nonlocal boundary value problem of the first kind for a Sturm-Liouville operator in its differential and finite difference aspects. Differential Equations, 1987, 23(7): 803-810.
  • 6II'in V A, Moiseev E I. Nontocal boundary value problem of the first kind for a Sturm-Liouville operator. Differential Equations, 1987, 23(8): 979 -987.
  • 7Gupta C P. Solvability of a three-point nonlinear boundary value problem for a second order ordinary differential equation. J Math Anal Appl, 1992, 168:540-551.
  • 8Ma R. Positive solutions of a nonlinear m-point boundary value problem. Computers and Mathematics with Applications, 2001, 42:755-765.
  • 9Ma R. Positive solutions of a nonlinear three-point boundary value problem. Electron J Differential Equations, 1999, 34:1- 8.
  • 10Zhang G, Sun J. Positive solutions of m-point boundary value problem. J Math Anal Appl, 2004, 291(2): 404-418.

共引文献14

同被引文献10

引证文献1

二级引证文献4

南通大学学报(自然科学版)
2015年 第1期

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