一类二阶三点边值问题正解存在性

Krasnosel'skill fixed point and a second-order three-point boundary value problem

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摘要二阶边值问题在控制理论中有重要的应用价值。人们常常需要知道在非线性项满足超线性或次线性的情况下正解的存在性的结论。文章利用Krasnose'skill不动点定理,建立了一类二阶广义Sturm-Liouville边值问题在有限区间上正解存在性的一个定理,对现有的一些结论作了一定的推广和补充。 Second-order boundary value problem is an important problem in automation domain.people often need to know the existence of positive solution for a boundary value problem,especially in the case of super linearity.By using Krasnose＇skill fixed point theorem we establish the existence of positive solution for a second-order Sturm-Liouville boundary value problem in this paper.

作者何剑峰

机构地区泉州师院信息系

出处《阜阳师范学院学报（自然科学版）》 2010年第1期11-14,共4页 Journal of Fuyang Normal University(Natural Science)

关键词正解边值问题 Krasnose'skill不动点定理 positive solution boundary value problem Krasnose＇skill fixed point

分类号 O175.8 [理学—基础数学]

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1张新光 ,孙永平 ,王秀芹 .二阶三点半正边值问题正解的存在性(英文)[J].数学研究,2004,37(2):123-128. 被引量：4

二级参考文献7

1Yao Qingliu, Ma Ruyun. Multiplicity of positive solutions for second-order three-point boundary value problems. Compute. Math. Appl. 2000, 40:193-204.
2Ma Runyun. Positive solutions for second-order three-point boundary value problems. J. Comput. Appl. Math. 1984, 10:203-217.
3Ma Runyun. Positive solutions of a nonlinear three-point boundary value problem. Electron, J. Differential Equations, 1999, 34:1-8.
4Ma Runyun. Existence theorems for a second-order three-point boundary value problem. J. Math. Anal. Appl. 1997, 212:430-442.
5Gupta C P. A sharper condition for the a three-poition second order boundary value problem. J. Math. Anal. Appl. 1997, 205:586-597.
6Guo Dajun, Lakshmikantham V. Nonlinear Problems in Abstract Cone. Sandiege: Academic Press, 1988.
7Zhong Chengkui, Fan Xianling, Chen Wenyuan. Introduction to Nolinear Functional Analysis. Lanzhou: Lanzhou University Press, 1998.

共引文献3

1罗万成,黄华,周道清.非线性二阶常微分方程的正周期解(英文)[J].西南大学学报（自然科学版）,2007,29(10):35-38. 被引量：7
2王颖.时间尺度上半正三点边值问题的正解(英文)[J].华东师范大学学报（自然科学版）,2012(5):101-108.
3王颖.时标上半正三点边值问题正解的存在性[J].安徽科技学院学报,2013,27(3):46-49.

1马满军,李东.一类非线性二阶差分方程的正解[J].数学理论与应用,2005,25(4):75-77.
2张新光 ,孙永平 ,王秀芹 .二阶三点半正边值问题正解的存在性(英文)[J].数学研究,2004,37(2):123-128. 被引量：4
3D. Sun(Institute of Applied Mathematics, Academia Sinica, Beijing, China).A NEW STEP-SIZE SKILL FOR SOLVING A CLASS OF NONLINEAR PROJECTION EQUATIONS[J].Journal of Computational Mathematics,1995,13(4):357-368. 被引量：12
4杨雯抒.半线性时滞差分方程周期正解的存在性[J].江汉大学学报（自然科学版）,2003,31(4):10-12.
5柴丽丽,张国芳.迭代星覆盖的相对拓扑性质研究[J].吉林省教育学院学报（中旬）,2014,30(2):99-100.
6Weiyun Chen,Weimo Zhu,Steve Mason,Austin Hammond-Bennett,Andrew Colombo-Dougovito.优质体育教学对提高学生操控技能的有效性(英文)[J].Journal of Sport and Health Science,2016,5(2):231-238. 被引量：2
7Zongfu Zhou,Li Zeng,Baorui Jia,Jianzhong Xu.PERIODIC SOLUTIONS TO DUFFING TYPE p-LAPLACIAN EQUATION WITH SEVERAL p-LAPLACIAN OPERATORS[J].Annals of Differential Equations,2013,29(1):121-126. 被引量：1
8PENG Fei,SUN Guo-Dong.Application of a Derivative-Free Method with Projection Skill to Solve an Optimization Problem[J].Atmospheric and Oceanic Science Letters,2014,7(6):499-504. 被引量：1
9Weiyun Chen,Steve Mason,Austin Hammond-Bennett,Sandy Zalmout.小学生的操作技能及与健康相关的体适能（英文）[J].Journal of Sport and Health Science,2016,5(4):491-499.
10汪娜,倪明康.THE INTERIOR LAYER PHENOMENA FOR A CLASS OF SINGULARLY PERTURBED DELAY-DIFFERENTIAL EQUATIONS[J].Acta Mathematica Scientia,2013,33(2):532-542.

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一类二阶三点边值问题正解存在性

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