Bounded solutions of nonlinear Cauchy problems

For a given closed and translation invariant subspace Y of the bounded and uniformly continuous functions, we will give criteria for the existence of solutions u ∈ Y to the equation u ′ ( t ) + A ( u ( t ) ) + ω u ( t ) ∠f ( t ) , t ∈ ℠, or of solutions u asymptotically close to Y for the inhomogeneous differential equation u ′ ( t ) + A ( u ( t ) ) + ω u ( t ) ∠f ( t ) , t > 0 , u ( 0 ) = u 0 , in general Banach spaces, where A denotes a possibly nonlinear accretive generator of a semigroup. Particular examples for the space Y are spaces of functions with various almost periodicity properties and more general types of asymptotic behavior.