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Stochastic prey-predator relationships: A random differential equation approach

✍ Scribed by Georges A. Bécus

Book ID
112778817
Publisher
Springer
Year
1979
Tongue
English
Weight
381 KB
Volume
41
Category
Article
ISSN
1522-9602

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Stochastic prey-predator relationships:
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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

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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