PDF下载

[1]刘燕,杜冬青.一类双参数奇摄动方程非线性多点边值问题[J].延边大学学报(自然科学版),2021,47(03):206-211,227.
　LIU Yan,DU Dongqing.A class of nonlinear multi - point boundary value problems with two - parameter singularly perturbed equation[J].Journal of Yanbian University,2021,47(03):206-211,227.

点击复制

一类双参数奇摄动方程非线性多点边值问题

《延边大学学报(自然科学版)》[ISSN:1004-4353/CN:22-1191/N] 卷: 第47卷期数: 2021年03期页码: 206-211,227 栏目: 基础科学研究出版日期: 2021-10-20

Title:: A class of nonlinear multi - point boundary value problems with two - parameter singularly perturbed equation

文章编号:: 1004-4353(2021)03-0206-07

作者:: 刘燕¹; 杜冬青²; (1.安徽师范大学皖江学院电子工程系,安徽芜湖241000;2.徐州财经高等职业技术学校基础部,江苏徐州221000)

Author(s):: LIU Yan¹; DU Dongqing²; ( 1.Department of Electronic Engineering, Wanjiang College of Anhui Normal University, Wuhu 241000, China; 2.Department of Basics, Xuzhou Vocational Technology Academy of Finance & Economics, Xuzhou 221000, China )

关键词:: 奇摄动; 双参数; 非线性多点边值条件; 形式渐近解

Keywords:: singular perturbation; two parameters; nonlinear multi - point boundary value conditions; formal asymptotic solutions

分类号:: O175.14

文献标志码:: A

摘要:: 讨论了一类具非线性多点边值条件的三阶微分方程的双参数奇摄动问题.首先,利用奇摄动方法求出问题的外部解; 然后,引入两个不同的伸展变量构造了问题在边界附近的边界层校正项,得到了所提问题的形式渐近解; 最后,运用微分不等式理论证明了问题解的存在性及所得形式渐近解的一致有效性,并用例子证明了该结果.

Abstract:: A class of singularly perturbed problems with two parameters for third - order differential equations with nonlinear multi -point boundary value conditions were discussed. Firstly, the outer solution was constructed by means of the singular perturbation method; Then, two different stretching variables were introduced, the boundary layer correction of solution were obtained, and the asymptotic analytic expansion solution to the original problem was also given; Finally, according to the theory of differential inequalities, the existence of solutions and the uniform validity of the asymptotic solutions were proved, and the result were proved by using an example.

参考文献/References:

[1] XIE F.On a class of singular boundary value problems with singular perturbation[J].J Diff Equa, 2012,252:2370-2387.
[2] 刘树德,鲁世平,姚静荪,等.奇异摄动边界层和内层理论[M].北京:科学出版社,2012:10-41.
[3] WEN L, ZHAN B B.A class of fourth order nonlinear boundary value problem with singular perturbation[J].Appl Math Lett, 2021,115:106965.
[4] DU Z J, ZHAN B B. Asymptotic solutions for a second - order differential equation with three - point boundary conditions[J]. Appl Math Comput, 2007,186(1):469-473.
[5] MO J Q. Singularly perturbed solution of boundary value problem for nonlinear equations of fourth order with two parameters[J]. Adv Math, 2010,39(6):736-740.
[6] 吴有萍,姚静荪.一类具非线性边值条件的双参数奇摄动问题[J].高校应用数学学报,2011,26(3):288-294.
[7] 史娟荣,汪维刚,吴钦宽,等.两参数非线性奇摄动燃烧问题的渐近解[J].兰州大学学报(自然科学版),2016,52(1):107-111.
[8] DU Z J, KONG L J. Asymptotic solutions of singularly perturbed second - order differential equations and application to multi - point boundary value problems[J]. Appl Math Lett, 2010,23(9):980-983.
[9] DU Z J, GE W G, ZHOU M R. Singular perturbations for third - order nonlinear multi - point boundary value problem[J]. J Diff Equa, 2005,218(1):69-90.
[10] LIN X J. Singular perturbations of third - order nonlinear differential equations with full nonlinear boundary conditions[J]. Appl Math Comput, 2013,224:88-95.
[11] LIN X J, DU Z J, LIU W B. Uniqueness and existence results for a third - order nonlinear multi - point boundary value problem[J]. Appl Math Comput, 2008,205:187-196.

备注/Memo

收稿日期: 2021-04-23
基金项目: 安徽省高校优秀青年人才支持计划一般项目(gxyq2021245)
作者简介: 刘燕(1986—),女,硕士,讲师,研究方向为奇异摄动理论.

更新日期/Last Update: 2021-10-20