Existence of Periodic Solutions for a State Dependent Delay Differential Equation

In this paper we shall study the existence of a periodic solution to the nonlinear Ž . Ž Ž .. differential equation x q Ax y A\*x y A\*Ax q B t x q f t, x t s 0 in some complex Hilbert space, using duality and variational methods.

This paper deals with the existence of periodic solutions for some partial functional differential equations with infinite delay. We suppose that the linear part is nondensely defined and satisfies the Hille᎐Yosida condition. In the nonlinear case we give several criteria to ensure the existence of

The equation xЉ t q x t s bx t y 1 , where и designates the greatest integer function, can be described in brief by two amazing properties. First, for certain values of the coefficients, some or all of its solutions are monotone although the corresponding homogeneous equation is clearly oscillatory.

A result of Smith and Thieme shows that if a semiflow is strongly order preserving, then a typical orbit converges to the set of equilibria. For the equation Ž . Ž . Ž Ž Ž Ž .... with state-dependent delay x t s y x t q f x t y r x t , where ) 0 and f ˙Ž . and r are smooth real functions with f 0 s