Journal of East China Normal University(Natural Science) >
Singularly perturbed third-order semilinear boundary value problems with discontinuous coefficients
Received date: 2016-01-06
Online published: 2017-03-23
The existence and asymptotic estimates of solutions for a class of singularly perturbed boundary value problems with discontinuous coefficients are investigated in this paper. Firstly, by using the Schauder fixed point theorem, a theorem of lower-upper solutions for general problems is established. Secondly, the formal asymptotic solution is constructed by the method of boundary functions, and the existence and uniform validity of the solution are proved by using the theorem of lower-upper solutions. Finally, an example is presented as an illustration.
XUE Hu , XIE Feng . Singularly perturbed third-order semilinear boundary value problems with discontinuous coefficients[J]. Journal of East China Normal University(Natural Science), 2017 , 2017(2) : 20 -28 . DOI: 10.3969/j.issn.1000-5641.2017.02.003
[1] 周明儒, 林武忠, 倪明康, 等. 奇异摄动导论 [M]. 北京:科学出版社, 2014.
[2] 周明儒, 杜增吉, 王广瓦. 奇异摄动中的微分不等式理论 [M]. 北京:科学出版社, 2012.
[3] 倪明康, 林武忠. 奇异摄动中的渐近理论 [M]. 北京:科学出版社, 2009.
[4] DE JAGER E M, JIANG F R. The Theory of Singular Perturbations[M]. Amsterdam:Elsevier, 1996.
[5] ZHAO W L. Singular perturbations of boundary value problems for a class of third order nonlinear ordinary differential equations[J]. Acta Mathematicae Applicatae Sinica, 1991, 14(2):265-278.
[6] HOWES F A. The asymptotic solution of a class of third order boundary value problems arising in the theory of thin film flows[J]. SIAM J Appl Math, 1983, 43(5):993-1004.
[7] ZARIN H, ROOS H G, TEOFANOV L. A continuous interior penalty finite element method for a third-order singularly perturbed boundary value problem[J]. Computational and Applied Mathematics, 2016:1-16.
[8] DE FALCO C, O'RIORDAN E. Interior layers in a reaction-diffusion equation with a discontinuous diffusion coefficient[J]. International Journal of Numerical Analysis and Modeling, 2010, 7(7):444-461.
[9] CHEN C K. A fixed interface boundary value problem for differential equations:A problem arising from population genetics[J]. Dynamics of Partial Differential Equations, 2006, 3(3):199-208.
[10] VALANARASU T, RAMANUJAM N. Asymptotic numerical method for singularly perturbed third order ordinary differential equations with a discontinuous source term[J]. Novi Sad J Math, 2007, 2(37):41-57.
[11] LIN H X, XIE F. Singularly perturbed second order semilinear boundary value problems with interface conditions[J]. Boundary Value Problems, 2015:1-16.
[12] XIE F. On a class of singular boundary value problems with singular perturbation[J]. Journal of Differential Equations, 2012, 252:2370-2387.
[13] XIE F, HU P. Singularly perturbed quasi-linear boundary value problems with discontinuous coefficients[J]. Communication on Applied Mathematics and Computation, 2013, 27(4):522-532.
[14] MEL'NIK T A. Asymptotics of solutions of discontinuous singularly perturbed boundary value problems[J]. Ukrainian Mathematical Journal, 1999, 51(6):963-967.
[15] DING H Y, NI M K, LIN W Z. Singularly perturbed semi-linear boundary value problem with discontinuous function[J]. Acta Math Sci Ser B, 2012, 32(2):793-799.
[16] 丁海云, 倪明康. 具有不连续源的奇异摄动边值问题 [J]. 数学杂志, 2012, 32(6):1121-1128.
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