This paper is concerned with the existence of monotone traveling wavefronts in a single species model with nonlocal diffusion and age-structure. We first apply upper and lower solution technique to prove the result if the wave speed is larger than a threshold depending only on the basic parameters. When the wave speed equals to the threshold, we show the conclusion by passing to a limit function.
Age-structure, nonlocal diffusion, traveling wavefront, upper and lower solutions.
LI, XUE-SHI and LIN, GUO
"Traveling Wavefronts in a Single Species Model with Nonlocal Diffusion and Age-Structure,"
Turkish Journal of Mathematics: Vol. 34:
3, Article 8.
Available at: https://journals.tubitak.gov.tr/math/vol34/iss3/8