許友偉,姚靜蓀,劉燕

(安徽師范大學(xué)數(shù)學(xué)計(jì)算機(jī)科學(xué)學(xué)院,安徽蕪湖 241003)

一類(lèi)具非線(xiàn)性邊界條件的高階方程的奇攝動(dòng)問(wèn)題

許友偉,姚靜蓀,劉燕

(安徽師范大學(xué)數(shù)學(xué)計(jì)算機(jī)科學(xué)學(xué)院,安徽蕪湖 241003)

通過(guò)引入伸展變量和非常規(guī)的漸近序列,運(yùn)用合成展開(kāi)法,對(duì)一類(lèi)具非線(xiàn)性邊界條件的非線(xiàn)性高階微分方程的奇攝動(dòng)問(wèn)題構(gòu)造了形式漸近解,再運(yùn)用微分不等式理論證明了原問(wèn)題解的存在性及所得漸近近似式的一致有效性.

奇攝動(dòng);非線(xiàn)性邊界條件;高階微分方程;微分不等式理論

1 引言

近年來(lái),對(duì)具非線(xiàn)性邊界條件的微分方程的奇攝動(dòng)問(wèn)題已有很多研究,如文獻(xiàn)[1-3]研究了具非線(xiàn)性邊界條件的二階微分方程的奇攝動(dòng)問(wèn)題,文獻(xiàn)[4-5]研究了具非線(xiàn)性邊界條件的三階微分方程的奇攝動(dòng)問(wèn)題,文獻(xiàn)[6]研究了具非線(xiàn)性邊界條件的四階微分方程的奇攝動(dòng)問(wèn)題,文獻(xiàn)[7]則研究了更為一般的具非線(xiàn)性邊界條件的n階微分方程的奇攝動(dòng)問(wèn)題.但文獻(xiàn)[7]中的假設(shè)[H4]要求P(λ0)=0,P′(λ0)/=0,即λ0為P(λ)=0的單根,該條件保證了用常規(guī)的漸近序列可以確定外部解,從而獲得復(fù)合解.本文摒棄關(guān)于單根的條件,討論在文獻(xiàn)[7]中已研究的如下奇攝動(dòng)問(wèn)題:

的解是退化問(wèn)題(5)-問(wèn)題(7)的解.

現(xiàn)作如下假設(shè):

[H1]函數(shù)f,g,h關(guān)于其變?cè)谙鄳?yīng)的區(qū)域內(nèi)充分光滑,且對(duì)于各自變量的各階偏導(dǎo)有界,并存在正常數(shù)k0,δ0,使得

2 形式漸近解的構(gòu)造

3 主要結(jié)果

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A class of singular perturbed problems for higher order equations with nonlinear boundary value conditions

Xu Youwei,Yao Jingsun,Liu Yan
(College of Mathematics and Computer Science,Anhui Normal University,Wuhu241003,China)

The formal asymptotic solutions are constructed for a class of singular perturbed problems for higher order equations with nonlinear boundary value conditions by the introduction of the stretched variable and the unconventional asymptotic sequenceand the method of composite expansions.Then the existence of solutions for the original problems and the uniform validity of the asymptotic approximations are proved by the theory of differential inequality.

singular perturbation,nonlinear boundary value condition,higher order differential equation, the theory of differential inequality

O175.14

A

1008-5513(2013)02-0197-11

10.3969/j.issn.1008-5513.2013.02.014

2013-01-10.

國(guó)家自然科學(xué)基金(10901003);安徽高校省級(jí)自然科學(xué)基金(KJ2011A135).

許友偉(1989-),碩士生,研究方向:奇異攝動(dòng)理論.

姚靜蓀(1956-),教授,研究方向:奇異攝動(dòng)理論.

2010 MSC:34E20,34B15