Global existence of classical solutions to a predator–prey model with nonlinear prey-taxis

## Abstract In this short note, we study a strongly coupled system of partial differential equations which models the dynamics of a two‐predator‐one‐prey ecosystem in which the prey exercises defense switching and the predators collaboratively take advantage of the prey's strategy. We prove the exi

## 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

A set of easily verifiable sufficient conditions is derived for the global existence of periodic solutions with strictly positive components for a periodic predator-prey system with infinite delays by using the method of coincidence degree.

By using Mawhin's continuation theorem of coincidence degree theory, we derive a sufficient condition for the existence of at least one positive periodic solution of a generalized prey-predator model with harvesting term.