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引用次数: 0
摘要
本文主要讨论准单调情况下具有非对称核和延迟的非局部扩散系统行波的(非)存在性、渐近行为和唯一性。与之前的一些研究不同的是,扩散项和反应项都反映了非对称性,这不仅影响了最小波速的正向性和从 x 轴左右两侧扩散的具有相同速度的行波的波形,而且导致了行波的非存在性和渐近行为的一些困难,通过使用新技术克服了这些困难。因此,具有对称核和延迟(或无延迟)的非局部扩散方程的行波结果被改进为具有非对称核的方程,而具有拉普拉斯扩散和局部非线性的标量方程和系统的结论也被推广到非局部情况。最后,还展示了一些具体应用和数值模拟,以证实我们的理论结果。
Traveling waves for a nonlocal diffusion system with asymmetric kernels and delays
This paper mainly deals with the (non)existence, asymptotic behaviors and uniqueness of traveling waves to a nonlocal diffusion system with asymmetric kernels and delays for quasi-monotone case. The difference from some previous works is the asymmetry reflected in both diffusion and reaction terms, and this not only has an impact on the positivity of minimal wave speed and the wave profiles of traveling waves with the same speed spreading from the left and right of the x-axis, but also leads to some difficulties for the nonexistence and asymptotic behaviors of traveling waves, which are overcome by using new techniques. Thereby, the results for traveling waves of nonlocal diffusion equations with symmetric kernels and with (or without) delays are improved to equations with asymmetric kernels, and those conclusions for scalar equations and systems with Laplace diffusion and local nonlinearities are also generalized to the nonlocal case. Finally, some concrete applications and numerical simulations are shown to confirm our theoretical results.
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