共查询到17条相似文献,搜索用时 203 毫秒
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《数学物理学报(A辑)》2015,(5)
讨论如下一类非线性Volterra方程零解的稳定性x'(t)=-a(t)x(t)+b(t)x'(g(t))+∫_0~t k(t,s)f(x(s),x(v(s)))ds+h(t),使用不动点理论,并在一定条件下构造适当的压缩映射,得到了方程零解的稳定性. 相似文献
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Lienard方程的比较原理 总被引:1,自引:0,他引:1
刘炳文 《数学的实践与认识》2001,31(4):504-507
证明了几个比较原理,使方程x〃+f(x)x'+g(x)=0的周期解的存在性与解的有界性定理可以分别用来判定方程x"+h(x,x')x'+g(x)=0的周期解的存在性与解的有界性. 相似文献
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By using the theory of coincidence degree,we study a kind of periodic solutions to second order differential equation with a deviating argument such as x"(t) f(x'(t)) h(x(t))x'(t) g(x(t-τ(t)))=p(t),some sufficient conditions on the existence of periodic solutions are obtained. 相似文献
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阮炯 《数学年刊B辑(英文版)》1985,(2)
In this paper the author discusses the following first order functional differentialequations: x'(t) +integral from n=a to b p(t, ξ)x[g(t, ξ)]dσ(ξ)=0, (1) x'(t) +integral from n=a to b f(t, ξ, x[g(t, ξ)])dσ(ξ)=0. (2)Some suffcient conditions of oscillation and nonoseillafion are obtained, and two asymptolioproperties and their criteria are given. These criferia are better than those in [1, 2], and canbe used to the following equations: x'(t) + sum from i=1 to n p_i(t)x[g_i(t)] =0, (3) x'(t) + sum from i=1 to n f_i(t, x[g_i(t)] =0. (4) 相似文献
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该文考虑了一类具有偏差变元的奇性P-Laplacian Lienard型方程(φ_p(x'(t))'+f(x(t))x'(t)+g(t, x(t-σ(t)))=e(t)其中g(x)在原点处具有吸引奇性.通过应用Manasevich-Mawhin连续定理和一些分析方法,证明了这个方程周期解的存在性. 相似文献
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《数学季刊》2016,(2)
In this paper, we consider the unboundedness of solutions for the asymmetric equation x'+ax~+-bx~-+(x)ψ(x')+f(x)+g(x')=p(t),where x~+= max{x, 0}, x~-= max{-x, 0}, a and b are two different positive constants,f(x) is locally Lipschitz continuous and bounded, (x), ψ(x), g(x) and p(t) are continuous functions, p(t) is a 2π-periodic function. We discuss the existence of unbounded solutions under two classes of conditions: the resonance case 1/a~(1/2)+1/b~(1/2)∈Q and the nonresonance case 1/a~(1/2)+1/b~(1/2)?Q 相似文献
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We construct stable invariant manifolds for semiflows generated by the nonlinear impulsive differential equation with parameters x'= A(t)x + f(t, x, λ), t≠τi and x(τ+i) = Bix(τi) + gi(x(τi), λ), i ∈ N in Banach spaces, assuming that the linear impulsive differential equation x'= A(t)x, t≠τi and x(τ+i) = Bix(τi), i ∈ N admits a nonuniform (μ, ν)-dichotomy. It is shown that the stable invariant manifolds are Lipschitz continuous in the parameter λ and the initial values provided that the nonlinear perturbations f, g are sufficiently small Lipschitz perturbations. 相似文献
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1MainResultsConsidersystem11~.x f(x)x' g(x)~0(1)wheref(x)islocallyintegrable,g(x)isdifferentiablealldg(0)=0.Theroem1Thezerosolutionofsystem(1)isuniformlyasymptoticallystableifbyequivalenttransf'Ormu=xov=X' F(x).DefineW[t,(uif\v)]j6ug(s)ds Iv',thenwisaposi… 相似文献
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本文研究一类二阶脉冲微分方程:■的正解存在性.其中,0<η<1,0<α<1,f:[0,1]×[0,∞)×R→[0,∞),I_i:[0,∞)×R→R,J_i:[0,∞)×R→R,(i=1,2,…,k)均为连续函数.本文所用方法是文献[5]推广的Krasnoselskii不动点定理,此定理为解决依赖于一阶导数的边值问题提供了理论依据.基于此定理,获得了问题正解存在性定理.特别地,我们获得此类问题的Green函数,使问题的解决更直观和简单. 相似文献
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Zaihong Wang 《Zeitschrift für Angewandte Mathematik und Physik (ZAMP)》2005,54(1):592-608
In this paper, we study the existence of periodic solutions of Rayleigh equation
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$
x' + f(x') + g(x) = p(t)
$
x' + f(x') + g(x) = p(t)
相似文献
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考察了形如{x″(t)+f(t,x(t))=0,0≤t≤1,x(0)=ξx(1),x′(1)=ηx′(0)的二阶非线性微分方程两点边值问题,这里ξ,η∈(0,1)∪(1,∞)为给定的常数,f:[0,1]×[0,∞)→[0,∞)连续。在某些适当的增长性条件下,应用Avery-Anderson-Krueger不动点定理证明了单调正解的存在性。 相似文献
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Lienard方程周期解、概周期解的存在性 总被引:20,自引:2,他引:18
本文考虑Lienard方程x”十f(x)x’+g(x)=e(t),我们得到:当且时,对于任意周期或概周期。数e(t),它有周期或概周期解.而对于Lienard方程x”+f(x)x’+cx=e(t),我们得到:当c>0且时,对于任意周期、或概周期函数e(t),它有周期或概周期解. 相似文献
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Liénard方程的比较原理 总被引:3,自引:0,他引:3
本文证明了一个比较原理,使方程x" f(x)x' g(x)=0的周期解存在性定理可以用来判断方程x" h(x,x')x' g(x)=0的周期解的存在性. 相似文献
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