Dynamical properties of a delay prey-predator model with disease in the prey species only.
Shi, Xiangyun, Zhou, Xueyong, Song, Xinyu (2010)
Discrete Dynamics in Nature and Society
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Displaying similar documents to “Persistence and bifurcation analysis on a predator–prey system of holling type”
Dynamical properties of a delay prey-predator model with disease in the prey species only.
The dynamic complexity of a Holling type-IV predator-prey system with stage structure and double delays.
Xue, Yakui, Duan, Xiafeng (2011)
Discrete Dynamics in Nature and Society
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Persistence and stability for a generalized Leslie-Gower model with stage structure and dispersal.
Huo, Hai-Feng, Ma, Zhan-Ping, Liu, Chun-Ying (2009)
Abstract and Applied Analysis
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Persistence and bifurcation analysis on a predator–prey system of holling type
Debasis Mukherjee (2010)
ESAIM: Mathematical Modelling and Numerical Analysis
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We present a Gause type predator–prey model incorporating delay due to response of prey population growth to density and gestation. The functional response of predator is assumed to be of Holling type II. In absence of prey, predator has a density dependent death rate. Sufficient criterion for uniform persistence is derived. Conditions are found out for which system undergoes a Hopf–bifurcation.
A prey-predator model with an alternative food for the predator, harvesting of both the species and with a gestation period for interaction.
Narayan, K.L., Ramacharyulu, N.CH.P. (2008)
International Journal of Open Problems in Computer Science and Mathematics. IJOPCM
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