Ergodicity and asymptotically almost periodic solutions of some differential equations (Q5945174)

Let \(X\) be a Banach space. The author proves the existence and uniqueness of a bounded and consequently (asymptotically) almost-periodic solution to the nonlinear differential equation of the type NEWLINE\[NEWLINE dx/dt=A(t,x)+f(t) , NEWLINE\]NEWLINE where \(A:\mathbb{R}\times X\to X\) and \(f:\mathbb{R}\to X\) are supposed to satisfy some conditions involving (asymptotically) almost-periodicity and ergodicity. The obtained result generalizes the one by \textit{J. L. Massera} [Fac. Ing. Agrimensura Montevideo, Publ. Inst. Mat. Estad. 3, 99-103 (1958; Zbl 0084.28603)]. A scalar equation of the type \(x^\prime=a(t)x+f(t)\) is given as a counterexample to show that the ergodicity condition cannot be dropped.