Stochastic prey-predator relationships: A random evolution approach

A stochastic model describing two interacting populations is considered. The model involves a random differential equation of the form dX/dt = A(t)X + Y (t) where the random matrix A and vector Y represent the interactions and growth rates respectively and X is a (random) vector the components of wh

A deterministic investigation of a lineal differential equation system which describes predator vs prey behavior as a function of equilibrium densities and reproductive rates is given. A more realistic structure of this model in a stochastic fiamework is presented. The reproductive rates and initial

In order to represent the biological evolution of a predator-prey ecology it is necessary to add to the equations of population dynamics terms corresponding to spontaneous mutation. Using a Volterra-Lotka ecology as an example, a model is developed for this. It is based on the assumption of two leve

The primary objective of this paper was to develop a mathematical description for the food chain, Soluble Organic -Bacteria -Holozoic Nutrients Protozoa Because of the interdependence of the elements in this food chain, continuous oscillations among the variables are possible. A set of three differ

A stochastic ratio-dependent predator-prey model is investigated in this paper. By the comparison theorem of stochastic equations and Itô's formula, we obtain the global existence of a positive unique solution of the ratio-dependent model. Besides, a condition for species to be extinct is given and