Asymptotic expression of the period of the Lotka-Volterra system

A Lotka᎐Volterra periodic model with m-predators and n-preys is studied in this paper. A set of easily verifiable sufficient conditions that guarantee the existence, uniqueness and global attractivity of the positive periodic solutions is obtained. Finally, a suitable example is given to illustrate

New sufficient conditions for the competitive exclusion of a few species in some Lotka-Volterra systems are proved. Also an approach based on some results of the matrix Riccati equations and some ideas of the asymptotic methods is developed. In addition, conditions for the existence of finite escape

This paper examines the asymptotic behaviour of the stochastic extension of a fundamentally important population process, namely the Lotka-Volterra model. The stochastic version of this process appears to have far more intriguing properties than its deterministic counterpart. Indeed, the fact that a

By using the continuation theorem of coincidence degree theory, sufficient and realistic conditions are obtained for the existence of positive periodic solutions for both periodic Lotka᎐Volterra equations and systems with distributed or statedependent delays. Our results substantially extend and imp