共查询到19条相似文献,搜索用时 296 毫秒
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本文研究了具有Hanmilton结构的反应扩散方程组,证明其存在不变区域及吸引集,再证明其整体吸引子的存在性。 相似文献
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文[1]中证明了耗散Zakharov方程组的最大吸引子的存在性.该文采用算子分解技术和构造犎2×犎1×犔2(犚)中渐进紧不变集的方法,得到了一维无界区域上耗散Zakharov方程组柯西问题的指数吸引子. 相似文献
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利用能量积分、Sobolev空间的嵌入定理和不变区域,本文证明了一类具有"自然结构条件"的非线性抛物型方程组的最大吸引子的存在性,并给出了一定条件下解的衰减性估计。 相似文献
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本文利用扰动方法,研究了Fitz-Hugh-Ngaumo方程和双稳反应扩散方程在Neuman边值条件下空间离散后的渐近行为,证明了两个格微分方程组的不变区域、吸引集和整体吸引子的存在性,并给出了离散Fitz-Hugh-Ngaumo方程的整体吸引子的Hausdorff维数估计。 相似文献
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具有色散的反应扩散方程在分数次幂空间的指数吸引子 总被引:2,自引:1,他引:1
本文得到具有色散的反应扩散方程组在分数次幂空间指数吸引子的存在性,同时得到(1,2)中整体吸引子分形维上界估计,完善和发展了(1-3)的结果。 相似文献
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研究了定义在无界区域上具可乘白噪音的随机反应扩散方程的渐近行为.运用一致估计得到了U3-随机吸收集;对方程的解运用渐近优先估计法,建立了相应随机动力系统的渐近紧性,证明了LP-随机吸引子的存在性.该随机吸引子是紧不变集并按LP-范数吸L2中所有缓增集,其中,非线性项/满足p-1(p≥2)阶增长条件. 相似文献
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利用临界点理论中的亏格定理和Nehari流形技巧,本文证明了在二维全空间上一类带周期位势的薛定谔-泊松方程组高能量解的存在性,且该解存在无穷多个结点区域.更进一步,得到了其基态解的存在性且是不变号的. 相似文献
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我们对一类反应扩散方程组,通过构造上下解,证明了它的初边值问题解的存在性及唯一性.在此基础上,讨论了其平衡解的渐近稳定性及吸引区域. 相似文献
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本文考虑了广义Fitz-Hugh-Nagumo方程组的初边值问题。去掉解属于某不变区域的限制,我们证明了初值属于L^2情形下整体吸引子的存在性,并给出其维数估计。 相似文献
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The paper first deals with the existence of the maximal attractor of classical solution for reaction diffusion equation with dispersion, and gives the sup-norm estimate for the attractor. This estimate is optimal for the attractor under Neumann boundary condition. Next, the same problem is discussed for reaction diffusion system with uniformly contracting rectangle, and it reveals that the maximal attractor of classical solution for such system in the whole space is only necessary to be established in some invariant region.Finally, a few examples of application are given. 相似文献
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§ 1 IntroductionThe study of nonlinear dynamics is a fascinating problem which is at the very heartofthe understanding ofmany importantproblems ofthe natural sciences.Infinite dimensionaldynamical systems are very important in nonlinear dynamics.For an infinite dimensionaldynamical system,we mainly study the existence and the structure ofthe attractors.Thereare detailed discussions in [1 ] .Itis especially mentioned there thatthe attractors of gradi-ent systems are of simple structure in s… 相似文献
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本文考虑多峰映射族中非双曲奇异吸引子的丰富性,证明多维参数空间中存在正测度的参数集合,对应系统具有绝对连续的不变测度. 相似文献
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Bixiang Wang 《随机分析与应用》2020,38(2):213-237
AbstractWe study the random dynamics of the N-dimensional stochastic Schrödinger lattice systems with locally Lipschitz diffusion terms driven by locally Lipschitz nonlinear noise. We first prove the existence and uniqueness of solutions and define a mean random dynamical system associated with the solution operators. We then establish the existence and uniqueness of weak pullback random attractors in a Bochner space. We finally prove the existence of invariant measures of the stochastic equation in the space of complex-valued square-summable sequences. The tightness of a family of probability distributions of solutions is derived by the uniform estimates on the tails of the solutions at far field. 相似文献
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反应扩散方程古典解的最大吸引子 总被引:1,自引:0,他引:1
利用能量积分和解析半群的有关估计,一类反应扩散方程非负古典解在连续函数空间的最大吸引子的存在性被证明,且非线性项取为任意阶多项式. 相似文献
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Attractors for random dynamical systems 总被引:14,自引:0,他引:14
Summary A criterion for existence of global random attractors for RDS is established. Existence of invariant Markov measures supported by the random attractor is proved. For SPDE this yields invariant measures for the associated Markov semigroup. The results are applied to reation diffusion equations with additive white noise and to Navier-Stokes equations with multiplicative and with additive white noise. 相似文献
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In this paper the quasi‐linear second‐order parabolic systems of reaction‐diffusion type in an unbounded domain are considered. Our aim is to study the long‐time behavior of parabolic systems for which the nonlinearity depends explicitly on the gradient of the unknown functions. To this end we give a systematic study of given parabolic systems and their attractors in weighted Sobolev spaces. Dependence of the Hausdorff dimension of attractors on the weight of the Sobolev spaces is considered. © 2001 John Wiley & Sons, Inc. 相似文献
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This paper is primarily concerned with linear time-varying ordinary differential equations. Sufficient conditions are given for the existence of an exponential dichotomy or equivalently an invariant splitting. The conditions are more general than those given in Part I of this paper and include the case in which the coefficients lie in a base space which is chain-recurrent under the translation flow and also the case in which compatible splittings are known to exist over invariant subsets of the base space. When the compatibility fails, the flow in the base space is shown to exhibit a gradient-like structure with attractors and repellers. Sufficient conditions are given guaranteeing the existence of bounded solutions of a linear system. The problem is treated in the unified setting of a skew-product dynamical system and the results apply to discrete systems including those generated by diffeomorphisms of manifolds. Sufficient conditions are given for a diffeomorphism to be an Anosov diffeomorphism. 相似文献
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Random Point Attractors Versus Random Set Attractors 总被引:2,自引:0,他引:2
The notion of an attractor for a random dynamical system withrespect to a general collection of deterministic sets is introduced.This comprises, in particular, global point attractors and globalset attractors. After deriving a necessary and sufficient conditionfor existence of the corresponding attractors it is proved thata global set attractor always contains all unstable sets ofall of its subsets. Then it is shown that in general randompoint attractors, in contrast to deterministic point attractors,do not support all invariant measures of the system. However,for white noise systems it holds that the minimal point attractorsupports all invariant Markov measures of the system. 相似文献
