Spatially heterogeneous discrete waves in predator-prey communities over a patchy environment
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Publication:1909341
DOI10.1016/0025-5564(95)00035-6zbMath0838.92030OpenAlexW2035138334WikidataQ48782638 ScholiaQ48782638MaRDI QIDQ1909341
Publication date: 3 June 1996
Published in: Mathematical Biosciences (Search for Journal in Brave)
Full work available at URL: https://doi.org/10.1016/0025-5564(95)00035-6
Hopf bifurcationnormal formdelay differential equationscenter manifoldtime lagspatchy environmentpredator-prey communitiesspatially homogeneous periodic solutions
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Cites Work
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- Mathematical models of population interactions with dispersal. II: Differential survival in a change of habitat
- Global bifurcations of phase-locked oscillators
- Global stability of single-species diffusion Volterra models with continuous time delays
- Global stability and periodic orbits for two-patch predator-prey diffusion-delay models
- Population diffusion in a two-patch environment
- Random effects in population models with hereditary effects
- Phase and amplitude instability in delay-diffusion population models
- Spatial heterogeneity and interspecific competition
- The role of rapid dispersal in the population dynamics of competition
- Dynamics of a single species in a spatially varying environment: The stabilizing role of high dispersal rates
- Global stability in diffusive delay Lotka-Volterra systems
- Singularities and groups in bifurcation theory. Volume II
- On a population model
- Spatial structures in predator-prey communities - a nonlinear time delay diffusional model
- Persistence and stability of single-species and prey-predator systems in spatially heterogeneous environments
- Diffusion effect on stability of Lotka-Volterra models
- Persistence and global asymptotic stability of single species dispersal models with stage structure
- On a two lag differential delay equation
- Global Asymptotic Stability of Lotka–Volterra Diffusion Models with Continuous Time Delay
- Mathematical Models of Population Interactions with Dispersal. I: Stability of Two Habitats with and without a Predator
- Differential-delay equations with two time lags
- Global stability and predator dynamics in a model of prey dispersal in a patchy environment
- Stability and Bifurcations of Equilibria in a Multiple-Delayed Differential Equation
- A GEOMETRIC ANALYSIS OF STABILITY REGIONS FOR A LINEAR DIFFERENTIAL EQUATION WITH TWO DELAYS
- Discrete waves and phase-locked oscillations in the growth of a single-species population over a patchy environment
- RANDOM DISPERSAL IN THEORETICAL POPULATIONS
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