一类具变系数交错扩散的登革热模型

该文在登革热的传播模型中引入较复杂的异质性交错扩散,用于描述人群和蚊群的相互扩散现象,并探讨交错扩散对模型动力学的影响,以及根据风险阈值对稳态共存解存在性进行分析.结果 表明,风险阈值不仅与交错扩散有关,而且直接影响着模型的动力学,如果风险阈值大于1,并伴随其它条件成立,则人群和蚊群携带的病毒会共存,不利于登革热的控制...     

一类具有扩散的捕食模型的共存解

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.     

带有交错扩散的Leslie-Gower型三种群系统的稳态模式

讨论了带有Neumann边界条件的一类Leslie-Gower型三种群系统,在一定的条件之下,虽然系统对应的扩散(没有交错扩散)系统的唯一正平衡解是稳定的,系统中的交错扩散可导致Turing不稳定性的产生.特别地,建立了该系统非常数共存解的存在性.结果表明,交错扩散可引起系统中出现非常数正稳态解(稳态模式).     

一类具有扩散和交错扩散的捕食模型的正解

讨论了带扩散和交错扩散的三种群捕食模型.应用上下解方法,得到这类捕食模型正解的存在性,同时研究了其正解的不存在性.     

扩散Beddington-DeAngelis捕食食饵模型的行波解

主要研究捕食者和食饵皆具有一般密度制约的扩散Beddington-DeAngelis捕食-食饵模型的行波解.通过构造行波系统的Wazewski集和Lyaponov函数,应用拓扑打靶法的方法建立系统连结边界平衡点到共存平衡点的轨道,进而证明原扩散系统连结边界平衡点到共存平衡点的非负行波解的存在性.     

三级营养食物链交错扩散模型的整体解

应用能量估计方法和Gagliardo-Nirenberg型不等式证明了带自扩散和交错扩散项的三级营养食物链模型在齐次Neumann边值条件下整体解的存在唯一性和一致有界性.     

竞争-竞争-互惠交错扩散模型的整体解

应用能量估计方法和bootstrap技巧证明了竞争-竞争-互惠交错扩散模型在空间维数小于6时古典解的整体存在性.当反应函数的系数满足一定条件时,应用Lyapunov函数获得了该模型解的收敛性.     

带Beddington-DeAngelis功能反应项的捕食者-食饵交错扩散模型整体解的存在性

本文采用能量方法和Bootstrap技巧证明了当空间维数n＜10时一类带Beddington-DeAngelis功能反应项的捕食者-食饵交错扩散模型整体解的存在性.     

一类具有交叉扩散捕食者-食饵系统的时间周期解的存在性与稳定性

本文讨论一类具有交叉扩散效应的捕食者-食饵系统的反应扩散方程组的时间周期解的存在性与稳定性．运用分歧理论、隐函数定理以及渐近展开的方法,获得了共存周期解的存在性与稳定性的结果．     

带比例功能反应函数食物链交错扩散模型的整体解

本文研究了带有比例功能反应函数食物链交错扩散模型整体解的存在性和正平衡点的稳定性.利用能量方法和Gagliardo-Nirenberg型不等式,获得了该模型整体解的存在性和一致有界性,同时通过构造Lyapunov函数给出了该模型正平衡点全局渐近稳定的充分条件.     

Coexistence in a strongly coupled system describing a two-species cooperative model

This paper is concerned with a cooperative two-species Lotka–Volterra model. Using the fixed point theorem, the existence results of solutions to a strongly coupled elliptic system with homogeneous Dirichlet boundary conditions are obtained. Our results show that this model possesses at least one coexistence state if the birth rates are big and cross-diffusions are suitably weak.     

Coexistence and asymptotic periodicity in a competitor-competitor-mutualist model

In this paper, the competitor-competitor-mutualist three-species Lotka-Volterra model is discussed. Firstly, by Schauder fixed point theory, the coexistence state of the strongly coupled system is given. Applying the method of upper and lower solutions and its associated monotone iterations, the true solutions are constructed. Our results show that this system possesses at least one coexistence state if cross-diffusions and cross-reactions are weak. Secondly, the existence and asymptotic behavior of T-periodic solutions for the periodic reaction-diffusion system under homogeneous Dirichlet boundary conditions are investigated. Sufficient conditions which guarantee the existence of T-periodic solution are also obtained.     

Coexistence of Two Species in a Strongly Coupled Schoener’s Competitive Model

This paper deals with the existence of positive solution to a strongly coupled system with homogeneous Dirichlet boundary conditions describing a Schoener’s competitive interaction of two species. Making use of the Schauder fixed point theorem, a sufficient condition is given for the system to have a coexistence. And true solutions are constructed based on monotone iterative method. Our results show that this model possesses at least one coexistence state if cross-diffusions and intra-specific competitions are weak.     

Coexistence and Asymptotic Periodicity in a Competition Model of Plankton Allelopathy

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.     

具Ⅱ型Holling功能性反应强耦合椭圆系统的共存问题

本文研究带齐次Dirichlet边界条件的强耦合椭圆系统,首先证明了当食饵和捕食者的扩散率足够大,或者出生率足够小时,系统不存在共存现象,并给出半平凡解存在的充分条件．然后利用Schauder不动点定理,得到强耦合的椭圆问题至少有一个正解存在的充分条件．该条件说明只要捕食者的内部竞争强,物种的交叉扩散相对弱,或者捕获率足够小,物种的交叉扩散相对弱,强耦合系统就至少有一个正解存在．     

Coexistence in a competitor–competitor–mutualist model

This paper is concerned with a system modeling a competitor–competitor–mutualist three-species Lotka–Volterra model. By Schauder fixed point theory, the existence of positive solutions to a strongly coupled elliptic system is given. Applying the method of upper and lower solutions and its associated monotone iterations, the true solutions are constructed and a numerical simulation is also presented. Our results show that this system possesses at least one coexistence state if cross-diffusions and cross-reactions are weak.     

Stationary patterns of strongly coupled prey-predator models

We study some elliptic systems arising from 3-component predator-prey models, where cross-diffusions are included in such a way that predator chases the prey and the prey runs away from the predator. We establish the existence and non-existence of non-constant positive solutions. Our results show that the cross-diffusions can create the stationary patterns.     

Uniform boundedness and convergence of solutions to the systems with cross-diffusions dominated by self-diffusions

Uniform boundedness and convergence of global solutions are proved for quasilinear parabolic systems with cross-diffusions dominated by self-diffusions in population dynamics. Gagliardo–Nirenberg-type inequalities are used in the estimates of solutions in order to establish W₂¹-bounds uniform in time. In each step of estimates the contribution of the diffusion coefficients is emphasized, and it is concluded that the uniform bound remains independent of the growth of the diffusion coefficient in the system. Hence, convergence of solutions is established for systems with large diffusion coefficients.     

Coexistence and stability of a competition—diffusion system in population dynamics

The coexistence and stability of the population densities of two competing species in a bounded habitat are investigated in the present paper, where the effect of dispersion (transportation) is taken into consideration. The mathematical problem involves a coupled system of Lotka-Volterra-type reaction-diffusion equations together with some initial and boundary conditions, including the Dirichlet, Neumann and third type. Necessary and sufficient conditions for the coexistence and competitive exclusion are established and the effect of diffusion is explicitly given. For the stability problem, general criteria for the stability and instability of a steady-state solution are established and then applied to various situations depending on the relative magnitude among the physical parameters. Also given are necessary and sufficient conditions for the existence of multiple steady-state solutions and the stability or instability of each of these solutions. Special attention is given to the Neumann boundary condition with respect to which some threshold results for the coexistence and stability or instability of the four uniform steady states are characterized. It is shown in this situation that only one of the four constant steady states is asymptotically stable while the remaining three are unstable. The stability or instability of these states depends solely on the relative magnitude among the various rate constants and is independent of the diffusion coefficients.     

Coexistence of two species in a strongly coupled cooperative model

In this paper, the cooperative two-species Lotka–Volterra model is discussed. We study the existence of solutions to a elliptic system with homogeneous Dirichlet boundary conditions. Our results show that this problem possesses at least one coexistence state if the birth rates are big and self-diffusions and the intra-specific competitions are strong.