Global existence and steady states of the density-suppressed motility model with strong Allee effect

IF 1.4 4区 数学 Q2 MATHEMATICS, APPLIED
Cui Song, Zhicheng Wang, Zhaosheng Feng
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引用次数: 0

Abstract

This paper considers a density-suppressed motility model with a strong Allee effect under the homogeneous Neumman boundary condition. We first establish the global existence of bounded classical solutions to a parabolic-parabolic system over a $N $-dimensional $\mathbf{(N\le 3)}$ bounded domain $\varOmega $, as well as the global existence of bounded classical solutions to a parabolic-elliptic system over the multidimensional bounded domain $\varOmega $ with smooth boundary. We then investigate the linear stability at the positive equilibria for the full parabolic case and parabolic-elliptic case respectively, and find the influence of Allee effect on the local stability of the equilibria. By treating the Allee effect as a bifurcation parameter, we focus on the one-dimensional stationary problem and obtain the existence of non-constant positive steady states, which corresponds to small perturbations from the constant equilibrium $(1,1)$. Furthermore, we present some properties through theoretical analysis on pitchfork type and turning direction of the local bifurcations. The stability results provide a stable wave mode selection mechanism for the model considered in this paper. Finally, numerical simulations are performed to demonstrate our theoretical results.
具有强阿利效应的密度抑制运动模型的全局存在和稳定状态
本文研究了在均质 Neumman 边界条件下具有强阿利效应的密度抑制运动模型。我们首先建立了在 $N $维 $mathbf{(N\le 3)}$ 有界域 $\varOmega $ 上抛物-抛物线系统有界经典解的全局存在性,以及在具有光滑边界的多维有界域 $\varOmega $ 上抛物-椭圆系统有界经典解的全局存在性。然后,我们分别研究了全抛物情况和抛物-椭圆情况下正平衡点的线性稳定性,并发现了阿利效应对平衡点局部稳定性的影响。通过将阿利效应视为分岔参数,我们重点研究了一维静止问题,并得到了非恒定正稳态的存在,这相当于从恒定平衡$(1,1)$出发的小扰动。此外,我们还通过对局部分叉的叉型和转向方向的理论分析,提出了一些特性。稳定性结果为本文所考虑的模型提供了一种稳定的波浪模式选择机制。最后,我们进行了数值模拟来证明我们的理论结果。
本文章由计算机程序翻译,如有差异,请以英文原文为准。
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来源期刊
CiteScore
2.30
自引率
8.30%
发文量
32
审稿时长
24 months
期刊介绍: The IMA Journal of Applied Mathematics is a direct successor of the Journal of the Institute of Mathematics and its Applications which was started in 1965. It is an interdisciplinary journal that publishes research on mathematics arising in the physical sciences and engineering as well as suitable articles in the life sciences, social sciences, and finance. Submissions should address interesting and challenging mathematical problems arising in applications. A good balance between the development of the application(s) and the analysis is expected. Papers that either use established methods to address solved problems or that present analysis in the absence of applications will not be considered. The journal welcomes submissions in many research areas. Examples are: continuum mechanics materials science and elasticity, including boundary layer theory, combustion, complex flows and soft matter, electrohydrodynamics and magnetohydrodynamics, geophysical flows, granular flows, interfacial and free surface flows, vortex dynamics; elasticity theory; linear and nonlinear wave propagation, nonlinear optics and photonics; inverse problems; applied dynamical systems and nonlinear systems; mathematical physics; stochastic differential equations and stochastic dynamics; network science; industrial applications.
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