DOAJ Open Access 2025

Global dynamics of a one-predator-two-prey model and its traveling wave solutions

Yung-Chih Yang Jian-Jhong Lin Tinghui Yang

Abstrak

This work investigates the three species of one-predator-two-prey ecological models in Lotka-Volterra type functional response with or without diffusive terms. Without the diffusive effects and under two essential assumptions, we can generically classify all global dynamics completely. The global asymptotic stabilities of three equilibria are shown analytically in each case. Alternatively, with the diffusive term, we establish the existence of traveling wave solutions by the higher-dimensional shooting method, the Wazewski principle. In particular, there are two critical wave speeds $0<c_2<c_1$. We show the existence of traveling wave solutions with the wave speed $c$ if $c>c_1$ and the non-existence of traveling wave solutions if $0<c<c_2$. Finally, a brief discussion, biological interpretations, and numerical simulations are given.

Topik & Kata Kunci

Applied mathematics. Quantitative methods

Penulis (3)

Yung-Chih Yang

Jian-Jhong Lin

Tinghui Yang

Format Sitasi

APA MLA BibTeX

Yang, Y., Lin, J., Yang, T. (2025). Global dynamics of a one-predator-two-prey model and its traveling wave solutions. https://doi.org/10.5206/mase/21285

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Informasi Jurnal

Tahun Terbit: 2025
Sumber Database: DOAJ
DOI: 10.5206/mase/21285
Akses: Open Access ✓