Criteria for Quantitative Stability for a Class of Razumikhin-Type Retarded Functional Differential Equations

## ˙Ѩt Ž . tions on the scalar function f s will be given below. We rely here on the w x Ž w x Ž . . Berger approach to large deflection 1 , in 1 f s is a linear function .

In this paper we show that the method of upper and lower solutions coupled with the monotone iterative technique is valid to obtain constructive proofs of existence of solutions for nonlinear periodic boundary value problems of functional differential equations without assuming properties of monoton

This paper is concerned with a generalization of a functional differential equation known as the pantograph equation. The pantograph equation contains a linear functional argument. In this paper we generalize this functional argument to include nonlinear polynomials. In contrast to the entire soluti

zero solution of this equation with unbounded delay to be uniformly stable as well as asymptotically stable.