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§1 序言本文考虑下述方程:这里 a>0是固定常数,σ:R→R,g:[0,+∞)×R→R,及 y_0,y_1:R→R 是给定的光滑函数,并假定:(σ):σ∈C~2(R),σ(o)=0,σ′(ξ)≥ε>0 (ξ∈R;ε>0)且有σ″(ξ)≠0.(g):g,g_x∈C([0,∞)×R),g(t)=(?)|g(t,x)|∈L~∞(0,∞)∩ L′(0,∞), 相似文献
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这篇文章主要利用常微分技术讨论了一个二阶拟线性椭圆方程Lpu≡div(|Du|^p-2Du)=f(x,u),x∈R^N的整体解的不存在性.我们只考虑2≤p〈N的情況并且在假设f(x,u)关于第二个变量u没有单调性的情况下得到整体解的不存在性结果. 相似文献
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The paper studies the existence,the exponential decay and the nonexistence of global solution for a class of quasilinear parabolic equations. 相似文献
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一类非线性方程的解的存在性及其应用 总被引:13,自引:0,他引:13
设A是Amann意义下的凹(凸)算子,本文提出序Lipschitz条件,无需考虑任何紧性或连续性条件,由Mann迭代技巧证明了方程Ax=x的解的存在性,将所得结果应用于无辊域ammerstein发方程,得到了新结果。 相似文献
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Based on the concepts of a generalized critical point and the corresponding generalized P.S. condition introduced by Duong Minh Duc [1], we have proved a new Z2 index theorem and get a result on multiplicity of generalized critical points. Using the result and a quite standard variational method, it is found that the equation -ΔH^nu=|u|^p-1u,x∈H^n has infinite positive solutions. Our approach can also be applied to study more general nonlinear problems. 相似文献
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该文讨论了下列拟线性椭圆方程的Dirichlet问题在一类Orlicz-Sobolev 空间中非平凡解的存在性
{ -div(a(| u(x)|) u(x))=g(x, u), x∈Ω,
u(x)=0,x∈∂Ω.
其中Ω 是 Rn 中光滑的有界区域.Φ 和 g 满足一定条件时, 利用推广的山路引理证明了上述Dirichlet 问题存在广义的非平凡解的存在性. 相似文献
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本文研究二阶退化拟线性抛物型方程的初-边值问题.在适当带权的Sobolev空间,我们利用伪单调算子理论证明了解的存在性. 相似文献
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考虑了一类p-Laplacian拟线性椭圆变分不等式问题,通过运用优化理论中的补偿法和Clark次微分性质,研究了这类椭圆变分不等式解的存在性. 相似文献
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In this note we give an existence result to a class of variational inequalities associated with quasilinear elliptic operators of second order with lower order terms. We prove “a priori” estimate by an extension of the truncation method to the nonlinear case. 相似文献
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该文利用变分方法讨论了方程 -△p u=λa(x)(u+)p-1-μa(x)(u-)p-1+f(x, u), u∈W01,p(\Omega)在(λ, μ)\not\in ∑p和(λ, μ) ∈ ∑p 两种情况下的可解性, 其中\Omega是 RN(N≥3)中的有界光滑区域, ∑p为方程 -△p u=α a(x)(u+)p-1-βa(x)(u-)p-1, u∈ W01,p(\Omega)的Fucik谱, 权重函数a(x)∈ Lr(\Omega) (r≥ N/p)$且a(x)>0 a.e.于\Omega, f满足一定的条件. 相似文献
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研究奇异拟线性椭圆型方程{-div(|x|~(-ap)|▽u|~(p-2)▽u) + f(x)|u|~(p-2) = g(x)\u|~(q-2)u + λh(x)|u|~(r-2),x R~N,u(x) 0,x∈ R~N,其中λ0是参数,1pN(N3),1rpgp*=0a(N—p)/p,p*=Np/{N~pd),aa+l,d=a+l-60,权函数f(x),g(x),h(x)满足一定的条件.利用山路引理和Ekeland变分原理证明了问题至少有两个非平凡的弱解. 相似文献
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运用Ricceri三临界点定理,研究了一类具有Dirichlet边界条件的拟线性椭圆方程组问题,证明了该方程组在其非线性项满足某些新的条件时至少存在三个解. 相似文献
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On the Existence of Positive Solutions of Quasilinear Elliptic Equations with Mixed Boundary Conditions 
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下载免费PDF全文 Xue Ruying 《偏微分方程(英文版)》1992,5(3)
In this paper, the existence of positive solutions for the mixed boundary problem of quasilinear elliptic equation {-div (|∇u|^{p-2}∇u) = |u|^{p^∗-2}u + f(x, u), \quad u > 0, \quad x ∈ Ω u|_Γ_0 = 0, \frac{∂u}{∂\overrightarrow{n}}|_Γ_1 = 0 is obtained, where Ω is a bounded smooth domain in R^N, ∂Ω = \overrightarrow{Γ}_0 ∪ \overrightarrow{Γ}_1, 2 ≤ p < N, p^∗ = \frac{Np}{N-p}, Γ_0 and Γ_1 are disjoint open subsets of ∂Ω. 相似文献
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设0∈Ω∈RN,(N≥2)为有界光滑区域,利用山路定理,考虑如下一类含Hardy位势的拟线性椭圆型方程非平凡解的存在性:-△u-u△(|u|N,(N≥2)为有界光滑区域,利用山路定理,考虑如下一类含Hardy位势的拟线性椭圆型方程非平凡解的存在性:-△u-u△(|u|2)=μu/|x|2)=μu/|x|2+λg(x,u),x∈Ω,其中μ>0,λ>0为常数,g(x,u)为Caratheodory函数. 相似文献
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E. I. Galakhov 《Mathematical Notes》2005,78(1-2):185-193
This paper is concerned with existence theorems for positive solutions of the Dirichlet problem for quasilinear elliptic differential equation containing a gradient term. Using the shooting method and the a priori estimates for the first zero, we obtain sufficient conditions for the existence of classical positive solutions of the problem in the ball.__________Translated from Matematicheskie Zametki, vol. 78, no. 2, 2005, pp. 202–211.Original Russian Text Copyright © 2005 by E. I. Galakhov. 相似文献
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We show, using a dual variational method developed in the paper, the existence of solutions for a system of Dirichlet problems
for partial differential equations involving p– and q–Laplacian. The stability of solutions and the existence of positive solutions is considered in the superlinear case.
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