Persistence and global stability for two-species nonautonomous competition Lotka–Volterra patch-system with time delay

By using the continuation theorem of coincidence degree theory, the existence of a positive periodic solution for a two-species nonautonomous competition Lotka-Volterra patch system with time delay, y t = y t r 3 t -a 3 t x 1 t -b 3 t y t -β t 0 -τ K s y t + s ds is established, where r i t a i t i

In this paper, a two-species delayed Lotka᎐Volterra system without delayed intraspecific competitions is considered. It is proved that the system is globally stable for all off-diagonal delays , G 0, if and only if the interaction matrix 12 21

A nonautonomous N-species discrete Lotka-Volterra competitive system of difference equations with delays and feedback controls is considered. New sufficient conditions are obtained for the permanence of this discrete system. The results indicate that one can choose suitable controls to make the spec