The global stability of a class of second order differential equations

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 deal with boundary value problems equation image where __l__ : __C__^1^([__a, b__], ℝ^__k__^) → ℝ^__k__^ × ℝ^__k__^ is continuous, __μ__ ≤ 0 and __φ__ is a Caratheodory map. We define the class __S__ of maps __l__, for which a global bifurcation theorem holds for the

This paper is dedicated to the concise presentation of some results (mainly, existence theorems and behavior of solutions) related to functional differential equations of the form in which L stands for a linear operator on a certain function space, causal and continuous, while V is acting on the sa

In this paper we study the boundedness of solutions for the second-order differential equation where F p (s) = |s| p-2 s, p > 1 and α, β are strictly positive constants satisfying a resonant relation n with n being a positive integer, and ϕ(t, x) is a 2π -periodic function in t. There exists a fun