Forced waves of a three species predator-prey system in a shifting environment
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Publication:2673011
DOI10.1016/j.jmaa.2022.126283zbMath1492.92054OpenAlexW4225275369WikidataQ115570167 ScholiaQ115570167MaRDI QIDQ2673011
Publication date: 13 June 2022
Published in: Journal of Mathematical Analysis and Applications (Search for Journal in Brave)
Full work available at URL: https://doi.org/10.1016/j.jmaa.2022.126283
Related Items (5)
On the invading speeds for a diffusive three-species competition system ⋮ Forced waves for diffusive competition systems in shifting environments ⋮ Forced waves of saturation type for Fisher-KPP equation in a shifting environment ⋮ Forced waves of a three species predator-prey system with a pair of weak-strong competing preys in a shifting environment ⋮ Forced waves for a three-species predator-prey system with nonlocal dispersal in a shifting environment
Cites Work
- Traveling wave solutions for a continuous and discrete diffusive predator-prey model
- Persistence versus extinction under a climate change in mixed environments
- Asymptotic profile of the solution to a free boundary problem arising in a shifting climate model
- Reaction-diffusion equations for population dynamics with forced speed. II: Cylindrical-type domains
- Reaction-diffusion equations for population dynamics with forced speed. I: The case of the whole space
- Spatial dynamics of a nonlocal dispersal population model in a shifting environment
- Forced waves of the Fisher-KPP equation in a shifting environment
- Spreading and vanishing for a monostable reaction-diffusion equation with forced speed
- Persistence and extinction of nonlocal dispersal evolution equations in moving habitats
- Traveling wave solutions for a predator-prey system with two predators and one prey
- Spreading in a shifting environment modeled by the diffusive logistic equation with a free boundary
- Forced waves and their asymptotics in a Lotka-Volterra cooperative model under climate change
- A free boundary problem for spreading under shifting climate
- Forced waves and gap formations for a Lotka-Volterra competition model with nonlocal dispersal and shifting habitats
- Forced waves in a Lotka-Volterra competition-diffusion model with a shifting habitat
- Persistence of species in a predator-prey system with climate change and either nonlocal or local dispersal
- Spatial-temporal dynamics of a Lotka-Volterra competition model with nonlocal dispersal under shifting environment
- Spatial dynamics of a Lotka-Volterra model with a shifting habitat
- Propagation dynamics of a reaction-diffusion equation in a time-periodic shifting environment
- Persistence of preys in a diffusive three species predator-prey system with a pair of strong-weak competing preys
- Can Pathogen Spread Keep Pace with its Host Invasion?
- Uniqueness and global stability of forced waves in a shifting environment
- Persistence versus extinction for two competing species under a climate change
- Traveling Wave Solutions for Some Three-Species Predator-Prey Systems
- Persistence and Spread of a Species with a Shifting Habitat Edge
- Existence of an extinction wave in the Fisher equation with a shifting habitat
- Traveling wavefronts for delayed reaction-diffusion systems via a fixed point theorem
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