Spatial dynamics of a nonlocal bistable reaction diffusion equation

Han, Bang-Sheng; Chang, Meng-Xue; Yang, Yinghui

doi:10.58997/ejde.2020.84

ejde

2020

DOI: 10.58997/ejde.2020.84

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Spatial dynamics of a nonlocal bistable reaction diffusion equation

Bang-Sheng Han,

Meng-Xue Chang,

Yinghui Yang

Abstract: This article concerns a nonlocal bistable reaction-diffusion equation with an integral term. By using Leray-Schauder degree theory, the shift functions and Harnack inequality, we prove the existence of a traveling wave solution connecting 0 to an unknown positive steady state when the support of the integral is not small. Furthermore, for a specific kernel function, the stability of positive equilibrium is studied and some numerical simulations are given to show that the unknown positive steady state may be a … Show more

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Cited by 3 publications

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Global dynamics of the solution for a bistable reaction diffusion equation with nonlocal effect

Chang

Han

Fan

2021

era

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<p style='text-indent:20px;'>This paper is devoted to studying the Cauchy problem corresponding to the nonlocal bistable reaction diffusion equation. It is the first attempt to use the method of comparison principle to study the well-posedness for the nonlocal bistable reaction-diffusion equation. We show that the problem has a unique solution for any non-negative bounded initial value by using Gronwall's inequality. Moreover, the boundedness of the solution is obtained by means of the auxiliary problem. Finally, in the case that the initial data with compactly supported, we analyze the asymptotic behavior of the solution.</p>

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Global dynamics of the solution for a bistable reaction diffusion equation with nonlocal effect

Chang

Han

Fan

2021

era

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Pyramidal traveling fronts in the Belousov-Zhabotinskii reaction-diffusion systems in R^3

Ma,

Niu,

Wang

2020

ejde

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In this article, we consider a diffusion system with the Belousov-Zhabotinskii (BZ for short) chemical reaction. The existence and stability of V-shaped traveling fronts for the BZ system in \(\mathbb{R}^2\) had been proved in our previous papers [30, 31]. Here we establish the existence and stability of pyramidal traveling fronts for the BZ system in \(\mathbb{R}^3\). For more information see https://ejde.math.txstate.edu/Volumes/2020/112/abstr.html

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Periodic traveling waves and asymptotic spreading of a monostable reaction-diffusion equations with nonlocal effects

Han

Kong

Shi

et al. 2021

ejde

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This article concerns the dynamical behavior for a reaction-diffusion equation with integral term. First, by using bifurcation analysis and center manifold theorem, the existence of periodic steady-state solution are established for a special kernel function and a general kernel function respectively. Then, we prove the model admits periodic traveling wave solutions connecting this periodic steady state to the uniform steady state u=1 by applying center manifold reduction and the analysis to phase diagram. By numerical simulations, we also show the change of the wave profile as the coefficient of aggregate term increases. Also, by introducing a truncation function, a shift function and some auxiliary functions, the asymptotic behavior for the Cauchy problem with initial function having compact support is investigated. For more information see https://ejde.math.txstate.edu/Volumes/2021/22/abstr.html

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Spatial dynamics of a nonlocal bistable reaction diffusion equation

Cited by 3 publications

References 31 publications

Global dynamics of the solution for a bistable reaction diffusion equation with nonlocal effect

Global dynamics of the solution for a bistable reaction diffusion equation with nonlocal effect

Pyramidal traveling fronts in the Belousov-Zhabotinskii reaction-diffusion systems in R^3

Periodic traveling waves and asymptotic spreading of a monostable reaction-diffusion equations with nonlocal effects

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