共查询到19条相似文献,搜索用时 71 毫秒
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关于有限理性方面的文献, 大多数都是在满足凸性条件下研究有限理性的相关性质, 在一定程度上限制了其应用范围. 应用Ekeland变分原理, 减弱了有限理性模型的假设条件, 考虑在不满足凸性条件下的有限理性模型的稳定性问题. 具体给出了非凸的Ky Fan点问题解的稳定性, 非凸非紧的Ky Fan点问题解的稳定性, 非凸向量值函数Ky Fan点解的稳定性和非凸非紧向量值函数Ky Fan点解的稳定性. 作为应用, 还给出了非凸的n人非合作博弈有限理性模型解的稳定性和非凸的多目标博弈有限理性模型解的稳定性. 相似文献
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本文研究一类空间异质环境下具有扩散的湖泊生态系统模型.引入空间异质环境影响,模型中浮游动物的扩散及相互作用系数具有空间依赖性.本文首先证明了模型解的全局存在和唯一性以及共存平衡解的存在唯一性,通过构造Lyapunov泛函,建立了模型非齐次共存平衡解的全局渐近稳定性条件,并通过数值模拟验证了理论结果.本文推广了含有外来有机物的湖泊生态系统模型,进一步证明了空间异质环境下的扩散不会改变湖泊生态系统共存平衡解的稳定性. 相似文献
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建立并分析了一类具有脉冲预防接种的垂直传染的SIR传染病模型,给出了系统解的一致有界性及无病周期解的存在的充分条件,根据Floquer乘子理论及脉冲微分不等式,证明了无病周期解的局部稳定性及全局渐近稳定性. 相似文献
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王烈 《高校应用数学学报(A辑)》2014,29(4)
研究一类带有分段常数变量和避难所的天敌-害虫模型的稳定性和分支行为.首先通过计算转化得到天敌-害虫模型对应的差分模型,利用线性稳定性理论讨论了正平衡态局部渐近稳定的充分条件.其次以害虫种群的内禀增长率或逃脱率为分支参数,利用分支理论研究了模型正平衡态处产生翻转分支周期解和Neimark-Sacker分支周期解的充分条件;并且使用正规形理论和中心流形定理构造了判断分支周期解稳定性的阈值.最后数值模拟验证了理论分析的正确性,并展示了该模型复杂的动力学行为. 相似文献
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考虑具有生长率的种群生理结构动力学模型,讨论了系统解的渐近性质,当系统具有多平衡解时,指出各平衡解的稳定性。 相似文献
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研究了一类Caputo分数阶时滞细胞神经网络模型的稳定性.通过利用分数阶微积分中的常数变分法,得到了Caputo分数阶时滞细胞神经网络解的差分形式,推导出模型的有界解和平衡点的存在性与唯一性,最后证明了神经网络的全局指数稳定性. 相似文献
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该文讨论了具有扩散的捕食模型.利用上下解方法和分支理论,得到了椭圆系统的共存解的存在性,并且讨论了共存解的稳定性. 相似文献
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基于经典博弈模型的Nash均衡点集的通有稳定性和具有不确定参数的n人非合作博弈均衡点的概念,探讨了具有不确定参数博弈的均衡点集的通有稳定性.参照Nash均衡点集稳定性的统一模式,构造了不确定博弈的问题空间和解空间,并证明了问题空间是一个完备度量空间,解映射是上半连续的,且解集是紧集(即usco(upper semicontinuous and compact-valued)映射),得到不确定参数博弈模型的解集通有稳定性的相关结论. 相似文献
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本文讨论了一种具有非弹性碰撞的麦克斯韦分子模型,首先利用傅立叶变换的方法分析该模型的自型解在特殊范数下的渐近稳定性,然后通过引入的Sobolev空间,证明该自型解在L1范数下的渐近稳定性. 相似文献
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介绍了一个具有人为故障的人-机系统的可修复模型,利用算子半群理论证明了新模型系统解的存在唯一性和指数型稳定性.另外,当故障率λ_0→∞时,系统的瞬态可用度逼近弱解系统瞬态可用度.即,新模型系统逼近原模型弱解系统. 相似文献
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Shinya Nishibata 《Journal of Differential Equations》2008,244(4):836-874
The present paper proves the existence and the asymptotic stability of a stationary solution to the initial boundary value problem for a quantum hydrodynamic model of semiconductors over a one-dimensional bounded domain. We also discuss on a singular limit from this model to a classical hydrodynamic model without quantum effects. Precisely, we prove that a solution for the quantum model converges to that for the hydrodynamic model as the Planck constant tends to zero. Here we adopt a non-linear boundary condition which means quantum effect vanishes on the boundary. In the previous researches, the existence and the asymptotic stability of a stationary solution are proved under the assumption that a doping profile is flat, which makes the stationary solution also flat. However, the typical doping profile in actual devices does not satisfy this assumption. Thus, we prove the above theorems without this flatness assumption. Firstly, the existence of the stationary solution is proved by the Leray-Schauder fixed-point theorem. Secondly, we show the asymptotic stability theorem by using an elementary energy method, where the equation for an energy form plays an essential role. Finally, the classical limit is considered by using the energy method again. 相似文献
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Dang Vu Giang Andrea De Gaetano 《Journal of Mathematical Analysis and Applications》2008,343(2):996-1006
Recently P. Palumbo, S. Panunzi and A. De Gaetano analyzed a delay model of the glucose-insulin system. They proved its persistence, the existence of a unique positive equilibrium point, as well as the local stability of this point. In this paper we consider further the uniform persistence of such equilibrium solutions and their global stability. Using the omega limit set of a persistent solution and constructing a full time solution, we also investigate the effect of delays in connection with the behavior of oscillating solutions to the system. The model is shown to admit global stability under certain conditions of the parameters. It is also shown that the model admits slowly oscillating behavior, which demonstrates that the model is physiologically consistent and actually applicable to diabetological research. 相似文献
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Cheng-Hsiung Hsu Suh-Yuh Yang Ting-Hui Yang Tzi-Sheng Yang 《Nonlinear Analysis: Real World Applications》2010,11(3):1472-1490
In this paper we study the stability and bifurcation of the trivial solution of a two-neuron network model with distributed time delays. This model consists of two identical neurons, each possessing nonlinear instantaneous self-feedback and connected to the other neuron with continuously distributed time delays. We first examine the local asymptotic stability of the trivial solution by studying the roots of the corresponding characteristic equation, and then describe the stability and instability regions in the parameter space consisting of the self-feedback strength and the product of the connection strengths between the neurons. It is further shown that the trivial solution may lose its stability via a certain type of bifurcation such as a Hopf bifurcation or a pitchfork bifurcation. In addition, the criticality of Hopf bifurcation is investigated by means of the normal form theory. We also provide numerical evidence to support our theoretical analyses. 相似文献
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《Communications in Nonlinear Science & Numerical Simulation》2014,19(5):1391-1399
A stochastic one-dimensional Gilpin–Ayala model driven by Lévy noise is presented in this paper. Firstly, we show that this model has a unique global positive solution under certain conditions. Then sufficient conditions for the almost sure exponential stability and moment exponential stability of the trivial solution are established. Results show that the jump noise can make the trivial solution stable under some conditions. Numerical example is introduced to illustrate the results. 相似文献
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本文采用标量李雅普诺夫函数的方法,研究了一个二维离散型淋病数学模型的解的稳定性,同时给出了稳定域的参数估计,并从理论上解释了这个模型的合理性。 相似文献
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一类非线性的经济系统控制模型的稳定性分析 总被引:2,自引:1,他引:1
用边界比较法讨论了以CE S生产函数作为反馈的定常经济系统控制模型的稳定性,该模型为含有非局部条件的分布参数系统.并且证明了非定常模型的平衡解是全局渐进稳定的. 相似文献