Periodic solutions for evolution equations

In this work, we study the anti-periodic problem for a nonlinear evolution inclusion where the nonlinear part is an odd maximal monotone mapping and the forcing term is an antiperiodic mapping. Several existence results are obtained under suitable conditions. An example is presented to illustrate th

## Abstract In this paper, we study the existence of anti‐periodic solutions for the first order evolution equation equation image in a Hilbert space __H__, where __G__ : __H__ → ℝ is an even function such that ∂__G__ is a mapping of class (__S__~+~) and __f__ : ℝ → ℝ satisfies __f__(__t__ + __T_

We study a class of abstract nonlinear evolution equations in a separable Hilbert space for which we prove existence of strong time periodic solutions, provided the right-hand side is periodic and C 1 in time, and small enough in the norm of the considered space. We prove also uniqueness and stabili