On a neutral Lotka–Volterra system

This paper studies the stability of neutral Lotka᎐Volterra systems with bounded delay and unbounded delay, respectively. Sufficient conditions for stability are given in terms of systems parameters.

## Abstract For autonomous Lotka–Volterra systems of differential equations modelling the dynamics of __n__ competing species, new criteria are established for the existence of a single point global attractor. Under the conditions of these criteria, some of the species will survive and stabilise at

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

## Abstract In the paper we consider three classes of models describing carcinogenesis mutations. Every considered model is described by the system of (__n__+1) equations, and in each class three models are studied: the first is expressed as a system of ordinary differential equations (ODEs), the s