A mathematical model for a spatial predator–prey interaction

## Abstract The present paper deals with the problem of a classical predator–prey system with infection of prey population. A classical predator–prey system is split into three groups, namely susceptible prey, infected prey and predator. The relative removal rate of the susceptible prey due to infe

Simple predator-prey models often predict extreme instability in interactions where the prey are depressed well below their carrying capacity. Although the behaviour of some laboratory systems conforms to this pattern, field and mesocosm studies generally show prolonged co-existence of prey and pred

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

We develop a model of strategic predator-prey interaction in which the latter has a certain range of actions available whose cost is inversely correlated with escape ability ("quality"). Under the assumption that each herd of prey is generated by random independent draws from the whole population, w