Economic and Mathematical Model for Size and Structure Optimisation of Predator and Prey Populations
A.P. Kaledin1, Yu.A. Yuldashbaev2, T.S. Kubatbekov3, A.I. Filatov4, A.M. Ostapchuk5, V.M. Makeeva6, M.V. Stepanova7, U.A. Shergaziev8
1A.P. Kaledin, Russian State Agrarian University named after K.A. Timiryazev, Moscow, Russia.
2Yu.A. Yuldashbaev, Russian State Agrarian University named after K.A. Timiryazev, Moscow, Russia.
3T.S. Kubatbekov, Russian State Agrarian University named after K.A. Timiryazev, Moscow, Russia.
4A.I. Filatov, Russian State Agrarian University named after K.A. Timiryazev, Moscow, Russia.
5A.M. Ostapchuk, Russian State Agrarian University named after K.A. Timiryazev, Moscow, Russia.
6V.M. Makeeva, Moscow State University named after M.V. Lomonosov, Moscow, Russia.
7M.V. Stepanova, Yaroslavl State Agricultural Academy, Yaroslavl, Russia.
8U.A. Shergaziev, Kyrgyz national agrarian university named after k. I. Skryabin.

Manuscript received on November 15, 2019. | Revised Manuscript received on November 28, 2019. | Manuscript published on 30 November, 2019. | PP: 9081-9090 | Volume-8 Issue-4, November 2019. | Retrieval Number: D4540118419/2019©BEIESP | DOI: 10.35940/ijrte.D4540.118419

Open Access | Ethics and Policies | Cite  | Mendeley | Indexing and Abstracting
© The Authors. Blue Eyes Intelligence Engineering and Sciences Publication (BEIESP). This is an open access article under the CC-BY-NC-ND license (http://creativecommons.org/licenses/by-nc-nd/4.0/)

Abstract: The paper proposes an original economic and mathematical model for size and structure optimisation of Predator and Prey populations. The most well-known mathematical model in biology for periodical dynamics of antagonistic animal species was developed independently by Alfred Lotka and Vito Volterra. This classical mathematical Predator-Prey model is known as the Lotka-Volterra model.
Keywords: Lotka-Volterra Model, Economic and Mathematical Modelling, Animals.
Scope of the Article: Probabilistic Models and Methods.