Impulsive periodic oscillation for a predator-prey model with Hassell-Varley-Holling functional response
From MaRDI portal
Publication:1994461
DOI10.1016/j.apm.2013.08.020zbMath1427.92079OpenAlexW2063542187WikidataQ115587758 ScholiaQ115587758MaRDI QIDQ1994461
Publication date: 1 November 2018
Published in: Applied Mathematical Modelling (Search for Journal in Brave)
Full work available at URL: https://doi.org/10.1016/j.apm.2013.08.020
Population dynamics (general) (92D25) Periodic solutions to functional-differential equations (34K13)
Related Items
Existence and stability of a unique almost periodic solution for a prey-predator system with impulsive effects and multiple delays ⋮ Dynamics of a periodic switched predator-prey system with impulsive harvesting and hibernation of prey population ⋮ A prey-dependent consumption two-prey one predator eco-epidemic model concerning biological and chemical controls at different pulses ⋮ Stability and permanence of an eco-epidemiological SEIN model with impulsive biological control ⋮ Global analysis of a delayed impulsive Lotka-Volterra model with Holling III type functional response ⋮ Mathematical analysis for a discrete predator-prey model with time delay and Holling II functional response ⋮ Dynamical behavior for a stochastic predator-prey model with HV type functional response ⋮ Stability and bifurcation analysis of Hassell-Varley prey-predator system with fear effect
Cites Work
- Unnamed Item
- Dynamics of an ecological model with impulsive control strategy and distributed time delay
- Delay differential equations: with applications in population dynamics
- Existence of periodic solutions in predator-prey and competition dynamic systems
- An impulsive ratio-dependent predator-prey system with diffusion
- Dynamic complexities of a three-species Beddington-DeAngelis system with impulsive control strategy
- Coincidence degree, and nonlinear differential equations
- Rich dynamics of a ratio-dependent one-prey two-predators model
- Dynamics of a nonautonomous predator--prey system with the Beddington-DeAngelis functional response
- Multiple periodic solutions of delayed predator--prey systems with type IV functional responses
- Positive periodic solutions in delayed Gause-type predator-prey systems
- Global Models of Growth and Competition
This page was built for publication: Impulsive periodic oscillation for a predator-prey model with Hassell-Varley-Holling functional response
