共查询到19条相似文献,搜索用时 93 毫秒
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一类捕食与被捕食LV模型的扩散性质 总被引:1,自引:0,他引:1
本文证明了一类带有扩散的捕食与被捕食Lotka-Volterra模型的如下性质:当该模型存在正平衡点时,它的一切正解是强持续生存的;当扩散率较小时,该系统的正平衡点是稳定的;当扩散率增大且位于某一开区间内变化时,该系统的正平衡点是不稳定的,而且分支出唯一的小振幅空间周期解;当扩散率继续增大时,该系统的正平衡点又变为稳定的. 相似文献
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应用能量估计方法和Gagliardo-Nirenberg型不等式证明了一类强耦合反应扩散系统整体解的存在性和一致有界性,该系统是具有阶段结构的两种群Lotka-Volterra捕食者-食饵交错扩散模型的推广.通过构造Lyapunov函数给出了该系统正平衡点全局渐近稳定的充分条件. 相似文献
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在生态学中,可以用非线性反应扩散方程来描述种群在时间上的变化和在空间中的分布及扩散情况.对于扩散的生物种群模型,通过研究模型中方程的渐近性态,可以知道该种群是持续生存还是趋向灭绝.在非线性反应扩散方程的研究中,行波解由于其形式简单,研究比较方便,为研究偏微分方程的动力学行为提供了一些途径.文章对一类添加扩散项的扩散Holling-Tanner系统进行了定性分析,得到了系统平衡点局部渐近稳定的充分条件.再通过构造Liapunov函数的方法,得到扩散Holling-Tanner系统平衡点全局渐近稳定的条件,以及该系统行波解存在的充分条件,并进行了数值模拟. 相似文献
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非自治Lotka-Volterra扩散模型的持续生存与周期轨道(英) 总被引:5,自引:0,他引:5
本文研究了一类非自治的捕食者一食饵扩散模型;其中食饵能在环境相异的两个缀块间有限制地扩散,但对捕食者来说,缀块间的扩散不受任何限制;另外假设模型的系数都是时间的函数.我们证明了在适当的条件下,这个系统能够持续生存,进一步给出了系统存在唯一全局渐近稳定正周期轨道的充分条件. 相似文献
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采用积分估计的方法证明了弱耦合反应扩散系统整体解的存在性和一致有界性,该系统是扩散系数互异的食物链模型,并通过举例进一步说明该方法的普适性. 相似文献
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针对污染和种内关系均影响细菌种群扩散这一管理生态学问题,本文建立了基于非线性拟抛物方程的最优控制模型,将外界环境向细菌种群输入的毒素率作为控制变量,运用控制理论和方法探讨污染和种内关系双重影响下种群扩散系统的最优控制问题。利用Schauder不动点定理证明了该种群扩散系统的适定性;同时,通过建立新的Carleman型估计,给出了容许控制和最优控制的存在性。最后,通过数值算例分析了理论推导的结果,在算例中都找到一对时间最优控制,验证了种群扩散系统最优控制模型的有效性。该研究结果对现代传染病预防具有借鉴意义,也为有效控制瘟疫的爆发和流行提供理论参考。 相似文献
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In this paper, we study a mathematical model of cancer invasion proposed by Gatenby and Gawlinski. The model is a strongly coupled degenerate reaction-diffusion system. Very few mathematical results are known for this system. We investigate the global existence of classical solutions for the system by using energy estimates and the bootstrap arguments, and global asymptotic stability of equilibrium points of the system by Lyapunov functions. 相似文献
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Using the energy estimate and Gagliardo-Nirenberg-type inequalities,the existence and uniform boundedness of the global solutions to a strongly coupled reaction-diffusion system are proved. This system is a generalization of the two-species Lotka-Volterra predator-prey model with self and cross-diffusion. Suffcient condition for the global asymptotic stability of the positive equilibrium point of the model is given by constructing Lyapunov function. 相似文献
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The dynamics and attitude motion of the three-axis stabilized spacecraft installed with lateral solar arrays is investigated in terms of the rigid-flexible coupled global modes of the system. The spacecraft consists of a rigid platform with small moment of inertia and two groups of flexible solar arrays with relatively large moment of inertia installed on the rigid rotation shafts. The rigid-flexible coupled dynamic model of the spacecraft is established by using the Hamiltonian Principle. The global mode method is employed to work out the natural frequency and global modal shapes of the rigid-flexible coupled dynamic model combined with corresponding boundary conditions. To validate the effectiveness of the analytical results obtained by global mode method, the natural frequencies and mode shapes obtained from finite element model using MSC.Patran software are used as a reference. A numerical example is given to show that the results obtained from both methods are matched very well (the relative errors of the corresponding frequencies are small enough) and the rigid motion of the platform is coupled with the vibration mode of the flexible solar arrays. This implies that the global analytical modes can be used to accurately describe the rigid-flexible coupled motion of the spacecraft. By comparing with the finite element model, the reduced dynamical model derived in terms of the global modes of the system has a lower dimension. Numerical simulations for the system with variations of parameters and dynamic responses analysis for different applied forces are performed to illustrate that, the characteristics of the model are affected by inner and external factors. 相似文献
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Canrong Tian 《Acta Appl Math》2011,113(2):195-206
In this paper, the two species Lotka-Volterra competition model of plankton allelopathy from aquatic ecology is discussed.
The authors study the existence of solutions to a strongly coupled elliptic system with homogeneous Dirichlet boundary conditions
and consider the existence, stability and global attractivity of time-periodic solutions for a coupled parabolic equations
in a bounded domain. Their results show that this model possesses at least one coexistence state if cross-diffusions and self-diffusions
are weak. The existence of the positive T-periodic solutions and the global stability as well as the global attractivity for
the parabolic system are also given. 相似文献
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Sanyi TangLansun Chen 《Journal of Mathematical Analysis and Applications》2002,266(2):401-419
A ratio-dependent predator-prey model with time lag for predator is proposed and analyzed. Mathematical analyses of the model equations with regard to boundedness of solutions, nature of equilibria, permanence, and stability are analyzed. We note that for a ratio-dependent system local asymptotic stability of the positive steady state does not even guarantee the so-called persistence of the system and, therefore, does not imply global asymptotic stability. It is found that an orbitally asymptotically stable periodic orbit exists in that model. Some sufficient conditions which guarantee the global stability of positive equilibrium are given. 相似文献
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《Chaos, solitons, and fractals》2000,11(13):2103-2121
The time evolution of prices and savings in a stock market is modeled by a discrete time nonlinear dynamical system. The model proposed has a unique and unstable steady-state, so that the time evolution is determined by the nonlinear effects acting out of the equilibrium. The nonlinearities strongly influence the kind of long-run dynamics of the system. In particular, the global geometric properties of the noninvertible map of the plane, whose iteration gives the evolution of the system, are important to understand the global bifurcations which change the qualitative properties of the asymptotic dynamics. Such global bifurcations are studied by geometric and numerical methods based on the theory of critical curves, a powerful tool for the characterization of the global dynamical properties of noninvertible mappings of the plane. The model unfolds more complex chaotic and unpredictable trajectories as a consequence of increasing agents' “speculative” or “capital gain realizing” attitudes. The global analysis indicates that, for some ranges of the parameter values, the system has several coexisting attractors, and it may not be robust with respect to exogenous shocks due to the complexity of the basins of attraction. 相似文献
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赵文才 《数学的实践与认识》2009,39(17)
建立了一类具有隔离和垂直传染的SIQR传染病模型,在脉冲免疫接种条件下,分析了其全局动力学行为.利用频闪映射,获得了无病周期解,给出了此周期解的全局稳定性分析.并获得了系统一致持续生存的条件. 相似文献
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《Nonlinear Analysis: Real World Applications》2008,9(2):272-289
Using the energy estimate and Gagliardo–Nirenberg-type inequalities, the existence and uniform boundedness of global solutions for a strongly coupled reaction–diffusion system are proved. This system is the Shigesada–Kawasaki–Teramoto three-species cooperating model with self- and cross-population pressure. Meanwhile, some criteria on the global asymptotic stability of the positive equilibrium point for the model are also given by Lyapunov function. As a by-product, we proved that only constant steady states exist if the diffusion coefficients are large enough. 相似文献
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Certain biochemical reaction can be modeled by a coupled system of time-delayed ordinary differential equations and linear parabolic partial differential equations. In a three-compartment model these equations are coupled through the boundary conditions. The aim of this paper is to give a qualitive analysis of this unusual coupled system. The analysis includes the existence and uniqueness of a global solution, explicit upper and lower bounds of the solution, and global stability of a steady-state solution. The global stability result is with respect to any nonnegative initial perturbation and is independent of the time delays in the process of reaction. Special attention is given to the Goodwin model for biochemical control of genes by a negative feedback mechanism with time delay and diffusion. 相似文献