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Journal Abstract Search

353 related items for PubMed ID: 17720307

  • 1. Predator-prey dynamics in P systems ruled by metabolic algorithm.
    Fontana F, Manca V.
    Biosystems; 2008 Mar; 91(3):545-57. PubMed ID: 17720307
    [Abstract] [Full Text] [Related]

  • 2. Stochastic P systems and the simulation of biochemical processes with dynamic compartments.
    Spicher A, Michel O, Cieslak M, Giavitto JL, Prusinkiewicz P.
    Biosystems; 2008 Mar; 91(3):458-72. PubMed ID: 17728055
    [Abstract] [Full Text] [Related]

  • 3. Influence of stochastic perturbation on prey-predator systems.
    Rudnicki R, Pichór K.
    Math Biosci; 2007 Mar; 206(1):108-19. PubMed ID: 16624335
    [Abstract] [Full Text] [Related]

  • 4. A solution to the accelerated-predator-satiety Lotka-Volterra predator-prey problem using Boubaker polynomial expansion scheme.
    Dubey B, Zhao TG, Jonsson M, Rahmanov H.
    J Theor Biol; 2010 May 07; 264(1):154-60. PubMed ID: 20109470
    [Abstract] [Full Text] [Related]

  • 5. The dynamics of a Lotka-Volterra predator-prey model with state dependent impulsive harvest for predator.
    Nie L, Teng Z, Hu L, Peng J.
    Biosystems; 2009 Nov 07; 98(2):67-72. PubMed ID: 19523503
    [Abstract] [Full Text] [Related]

  • 6. Role of nutrient bound of prey on the dynamics of predator-mediated competitive-coexistence.
    Roy S, Alam S, Chattopadhyay J.
    Biosystems; 2005 Nov 07; 82(2):143-53. PubMed ID: 16112387
    [Abstract] [Full Text] [Related]

  • 7. The Lotka-Volterra predator-prey model with foraging-predation risk trade-offs.
    Krivan V.
    Am Nat; 2007 Nov 07; 170(5):771-82. PubMed ID: 17926298
    [Abstract] [Full Text] [Related]

  • 8. Fluctuations and correlations in lattice models for predator-prey interaction.
    Mobilia M, Georgiev IT, Täuber UC.
    Phys Rev E Stat Nonlin Soft Matter Phys; 2006 Apr 07; 73(4 Pt 1):040903. PubMed ID: 16711780
    [Abstract] [Full Text] [Related]

  • 9. Effects of a disease affecting a predator on the dynamics of a predator-prey system.
    Auger P, McHich R, Chowdhury T, Sallet G, Tchuente M, Chattopadhyay J.
    J Theor Biol; 2009 Jun 07; 258(3):344-51. PubMed ID: 19063903
    [Abstract] [Full Text] [Related]

  • 10. Stochastic analysis of the Lotka-Volterra model for ecosystems.
    Cai GQ, Lin YK.
    Phys Rev E Stat Nonlin Soft Matter Phys; 2004 Oct 07; 70(4 Pt 1):041910. PubMed ID: 15600438
    [Abstract] [Full Text] [Related]

  • 11. Competitive coexistence in stoichiometric chaos.
    Deng B, Loladze I.
    Chaos; 2007 Sep 07; 17(3):033108. PubMed ID: 17902990
    [Abstract] [Full Text] [Related]

  • 12. Modelling metapopulations with stochastic membrane systems.
    Besozzi D, Cazzaniga P, Pescini D, Mauri G.
    Biosystems; 2008 Mar 07; 91(3):499-514. PubMed ID: 17904729
    [Abstract] [Full Text] [Related]

  • 13. Stabilizing dispersal delays in predator-prey metapopulation models.
    Neubert MG, Klepac P, van den Driessche P.
    Theor Popul Biol; 2002 May 07; 61(3):339-47. PubMed ID: 12027620
    [Abstract] [Full Text] [Related]

  • 14. Effect of delay in a Lotka-Volterra type predator-prey model with a transmissible disease in the predator species.
    Haque M, Sarwardi S, Preston S, Venturino E.
    Math Biosci; 2011 Nov 07; 234(1):47-57. PubMed ID: 21784082
    [Abstract] [Full Text] [Related]

  • 15. Geometric criteria for the non-existence of cycles in predator-prey systems with group defense.
    Liu Y.
    Math Biosci; 2007 Jul 07; 208(1):193-204. PubMed ID: 17125802
    [Abstract] [Full Text] [Related]

  • 16. Almost periodic solution of non-autonomous Lotka-Volterra predator-prey dispersal system with delays.
    Meng X, Chen L.
    J Theor Biol; 2006 Dec 21; 243(4):562-74. PubMed ID: 16934297
    [Abstract] [Full Text] [Related]

  • 17. The sorting direct method for stochastic simulation of biochemical systems with varying reaction execution behavior.
    McCollum JM, Peterson GD, Cox CD, Simpson ML, Samatova NF.
    Comput Biol Chem; 2006 Feb 21; 30(1):39-49. PubMed ID: 16321569
    [Abstract] [Full Text] [Related]

  • 18. An efficient method for stochastic simulation of biological populations in continuous time.
    Allen GE, Dytham C.
    Biosystems; 2009 Oct 21; 98(1):37-42. PubMed ID: 19607876
    [Abstract] [Full Text] [Related]

  • 19. Reinforcement learning for a stochastic automaton modelling predation in stationary model-mimic environments.
    Tsoularis A, Wallace J.
    Math Biosci; 2005 May 21; 195(1):76-91. PubMed ID: 15893338
    [Abstract] [Full Text] [Related]

  • 20. Modelling gene expression control using P systems: The Lac Operon, a case study.
    Romero-Campero FJ, Pérez-Jiménez MJ.
    Biosystems; 2008 Mar 21; 91(3):438-57. PubMed ID: 17822838
    [Abstract] [Full Text] [Related]

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