Global stability of a class of delay differential systems

The aim of this paper is to study the behaviour of solutions to a class of delay differential equations where the right-hand side depends only on the terms with delay. We study nonnegativity of solutions and global stability of the model.

## Abstract In this paper, we present an analysis for the class of delay differential equations with one discrete delay and the right‐hand side depending only on the past. We extend the results from paper by U. Foryś (__Appl. Math. Lett.__ 2004; **17**(5):581–584), where the right‐hand side is a un

In this paper, we study the global asymptotic stability of a class of nonautonomous integrodi erential systems. By constructing suitable Lyapunov functionals, we establish new and explicit criteria for the global asymptotic stability in the sense of Deÿnition 2.1. In the autonomous case, we discuss

Most of the global stability or convergence results appearing so far for delayed Lotka-Volterra-type systems or other delay differential systems require that the instantaneous negative feedbacks dominate both delayed feedback and interspecific interactions. Such a requirement is rarely met in real s