Title :
Monotone Traveling Wave Solution for a Delayed Reaction-Diffusion Equations
Author_Institution :
Inst. of Appl. Math. & Sch. of Math. & Inf. Sci., Henan Univ., Kaifeng, China
Abstract :
In the paper, we derive a delayed reaction-diffusion equations, which describes a multi-species Predator-prey system. By coupling the perturbation approach with the method of upper and lower solutions, we prove that the traveling wave fronts exist and appear monotone, which connect the zero solution with the positive steady state. Finally, we draw a conclusion to point out that the existence of traveling wave fronts for delayed reaction-diffusion equations is an interesting but difficult problem.
Keywords :
predator-prey systems; reaction-diffusion systems; wave equations; delayed reaction-diffusion equations; lower solution; monotone traveling wave solution; multispecies predator-prey system; positive steady state; traveling wavefronts; upper solution; Biological system modeling; Delay; Differential equations; Equations; Mathematical model; Predator prey systems; Stability analysis; Predator-prey system; Reaction-Diffusion equations; asymptotical stability; traveling wave;
Conference_Titel :
Chaos-Fractals Theories and Applications (IWCFTA), 2010 International Workshop on
Conference_Location :
Kunming, Yunnan
Print_ISBN :
978-1-4244-8815-5
DOI :
10.1109/IWCFTA.2010.13
