Open AccessPropagation direction of the bistable travelling wavefront for delayed non-local reaction diffusion equations
Author(s) -
Manjun Ma,
Jiajun Yue,
Chunhua Ou
Publication year - 2019
Publication title -
proceedings of the royal society a mathematical physical and engineering sciences
Language(s) - English
Resource type - Journals
eISSN - 1471-2946
pISSN - 1364-5021
DOI - 10.1098/rspa.2018.0898
Subject(s) - bistability , wavefront , reaction–diffusion system , sign (mathematics) , mathematics , traveling wave , monotone polygon , kernel (algebra) , exponential stability , mathematical analysis , wave speed , physics , geometry , optics , nonlinear system , pure mathematics , quantum mechanics
For delayed non-local reaction-diffusion equations arising from population biology, selection mechanisms of the speed sign for the bistable travelling wavefront have not been found. In this paper, based on the theory of asymptotic speeds of spread for monotone semiflows, we firstly provide an interval of values of wave speed and a novel general condition for determining the speed sign by applying the comparison principle and the globally asymptotic stability of the bistable travelling wave. Moreover, through constructing novel upper/lower solutions, we give explicit conditions for the speed sign to be positive or negative. The obtained results are efficiently applied to three classical forms of the kernel functions.
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