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Иш: A prey–predator model with three interacting species

  1. Mathematical Structures in Population Genetics

    Yuri I. Lyubich

    Китоб1992103 иқтибос
    ABI

  2. QUADRATIC STOCHASTIC OPERATORS AND PROCESSES: RESULTS AND OPEN PROBLEMS

    Rasul Ganikhodzhaev, Farrukh Mukhamedov, U. A. Rozikov

    МақолаQuantum Mechanics and ApplicationsInfinite Dimensional Analysis Quantum Probability and Related Topics201184 иқтибос
    ABI

  3. Quadratic transformations: a model for population growth. I

    Harry Kesten

    Мақола197058 иқтибос
    ABI

  4. Quadratic stochastic operators and zero-sum game dynamics

    Nasir Ganikhodjaev, Rasul Ganikhodjaev, Uygun Jamilov

    МақолаEconomic theories and modelsErgodic Theory and Dynamical Systems201445 иқтибос
    ABI

  5. ON THE BEHAVIOUR OF TRAJECTORIES AND THE ERGODIC HYPOTHESIS FOR QUADRATIC MAPPINGS OF A SIMPLEX

    M I Zakharevich

    Мақола197844 иқтибос
    ABI

  6. Solution of a Mathematical Problem Connected with the Theory of Heredity

    S.N. Bernstein

    Мақола194244 иқтибос
    ABI

  7. Quadratic transformations: a model for population growth. II

    Harry Kesten

    Мақола197040 иқтибос
    ABI

  8. On a necessary condition for the ergodicity of quadratic operators defined on the two-dimensional simplex

    Насир Набиевич Ганиходжаев, D. Zanin

    Мақола200437 иқтибос
    ABI

  9. A collection of mathematical problems

    Stanislaw M. Ulam

    Китоб196034 иқтибос
    ABI

  10. Evolutionary dynamics of zero-sum games

    Ethan Akin, Viktor Losert

    Мақола198424 иқтибос
    ABI

  11. On Cubic Operators Defined on Finite-Dimensional Simplexes

    U. A. Rozikov, A. Yu. Khamraev

    МақолаAdvanced Topics in AlgebraUkrainian Mathematical Journal200416 иқтибос
    ABI

  12. <i>G,μ</i>)-quadratic stochastic operators

    Jochen Blath, Uygun Jamilov, Michael Scheutzow

    МақолаAdvanced Topics in AlgebraThe Journal of Difference Equations and Applications201416 иқтибос
    ABI

  13. Stability and Monotonicity of Lotka–Volterra Type Operators

    Farrukh Mukhamedov, Mansoor Saburov

    Мақола201614 иқтибос
    ABI

  14. Persistence in models of three interacting predator-prey populations

    H. I. Freedman, Paul Waltman

    Мақола198413 иқтибос
    ABI

  15. On Non-ergodic Volterra Cubic Stochastic Operators

    Farrukh Mukhamedov, Chin Hee Pah, Azizi Rosli

    Мақола201913 иқтибос
    ABI

  16. Conditional cubic stochastic operator

    R.R. Davronov, Uygun Jamilov, M. Ladra

    МақолаAdvanced Topics in AlgebraThe Journal of Difference Equations and Applications201512 иқтибос
    ABI

  17. On a Volterra Cubic Stochastic Operator

    Uygun Jamilov, A. Yu. Khamraev, M. Ladra

    МақолаAdvanced Topics in AlgebraBulletin of Mathematical Biology201711 иқтибос
    ABI

  18. The discrete‐time Kolmogorov systems with historic behavior

    Mansoor Saburov

    Мақола202011 иқтибос
    ABI

  19. On Identically Distributed non-Volterra Cubic Stochastic Operator

    Uygun Jamilov, M. Ladra

    Мақола20179 иқтибос
    ABI

  20. Asymptotics for a class of iterated random cubic operators

    A J Homburg, U U Jamilov, M Scheutzow

    МақолаAdvanced Topics in AlgebraNonlinearity20198 иқтибос
    ABI

  21. A class of nonergodic Lotka-Volterra operators

    Mansoor Saburov

    Мақола20158 иқтибос
    ABI

  22. Сарлавҳасиз

    Мақола8 иқтибос
    ABI

  23. Historical behavior for a class of Lotka–Volterra systems

    Uygun Jamilov, Farrukh Mukhamedov

    МақолаMathematical and Theoretical Epidemiology and Ecology ModelsMathematical Methods in the Applied Sciences20226 иқтибос
    ABI

  24. Orbits with historic behaviour, or non-existence of averages

    Floris Takens

    Мақола20085 иқтибос
    ABI

  25. On the Volterra and Other Nonlinear Models of Interacting Populations

    Narendra S. Goel, Samaresh C. Maitra, Elliott W. Montroll

    Мақола19715 иқтибос
    ABI