奇异扰动反应-扩散方程中平面界面上的平流稳定效应

IF 1.9 4区 数学 Q1 MATHEMATICS, APPLIED SIAM Journal on Applied Mathematics Pub Date : 2024-06-10 DOI:10.1137/23m1610872
Paul Carter
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引用次数: 0

摘要

SIAM 应用数学杂志》第 84 卷第 3 期第 1227-1253 页,2024 年 6 月。 摘要。我们考虑双分量奇异扰动反应-扩散-平流方程中稳定稳态之间的平面行进前沿,其中一个小量[math]代表扩散系数之比。我们所考虑的前沿是大振幅的,包含一个尖锐的界面,是在一个合适的慢-快框架中穿越快速异质轨道时诱发的。我们在两个空间维度上探讨了平流对长波扰动前沿频谱稳定性的影响。我们发现,对于适当大的平流系数[math],前沿对这种扰动是稳定的,而对于较小的[math]值,它们可能是不稳定的。在这种情况下,可以得到一个临界渐近比例[math],在这个比例上会出现不稳定。这些结果被应用于一个旱地生态系统模型中的行进锋系列。
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A Stabilizing Effect of Advection on Planar Interfaces in Singularly Perturbed Reaction-Diffusion Equations
SIAM Journal on Applied Mathematics, Volume 84, Issue 3, Page 1227-1253, June 2024.
Abstract. We consider planar traveling fronts between stable steady states in two-component singularly perturbed reaction-diffusion-advection equations, where a small quantity [math] represents the ratio of diffusion coefficients. The fronts under consideration are large amplitude and contain a sharp interface, induced by traversing a fast heteroclinic orbit in a suitable slow-fast framework. We explore the effect of advection on the spectral stability of the fronts to long wavelength perturbations in two spatial dimensions. We find that for suitably large advection coefficient [math], the fronts are stable to such perturbations, while they can be unstable for smaller values of [math]. In this case, a critical asymptotic scaling [math] is obtained at which the onset of instability occurs. The results are applied to a family of traveling fronts in a dryland ecosystem model.
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来源期刊
CiteScore
3.60
自引率
0.00%
发文量
79
审稿时长
12 months
期刊介绍: SIAM Journal on Applied Mathematics (SIAP) is an interdisciplinary journal containing research articles that treat scientific problems using methods that are of mathematical interest. Appropriate subject areas include the physical, engineering, financial, and life sciences. Examples are problems in fluid mechanics, including reaction-diffusion problems, sedimentation, combustion, and transport theory; solid mechanics; elasticity; electromagnetic theory and optics; materials science; mathematical biology, including population dynamics, biomechanics, and physiology; linear and nonlinear wave propagation, including scattering theory and wave propagation in random media; inverse problems; nonlinear dynamics; and stochastic processes, including queueing theory. Mathematical techniques of interest include asymptotic methods, bifurcation theory, dynamical systems theory, complex network theory, computational methods, and probabilistic and statistical methods.
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