Ezzinbi, Khalil; Liu, James H.; Nguyen Van Minh Periodic solutions in fading memory spaces. (English) Zbl 1157.34346 Discrete Contin. Dyn. Syst. 2005, Suppl., 250-257 (2005). Summary: For \(A(t)\) and \(f(t, x, y) \, T\)-periodic in \(t\), consider the following evolution equation with infinite delay in a general Banach space \(X\), \[ u'(t) + A(t)u(t) = f\left(t, u\left(t\right), u_{t}\right),\, t > 0,\, u(s) = \phi(s),\, s \leq 0, \] where the resolvent of the unbounded operator \(A(t)\) is compact, and \(u_{t} (s) = u(t+s),\, s \leq 0\). We will work with general fading memory phase spaces satisfying certain axioms, and derive periodic solutions. We will show that the related PoincarĂ© operator is condensing, and then derive periodic solutions using the boundedness of the solutions and some fixed point theorems. This way, the study of periodic solutions for equations with infinite delay in general Banach spaces can be carried to fading memory phase spaces. Cited in 1 Document MSC: 34K13 Periodic solutions to functional-differential equations 34K30 Functional-differential equations in abstract spaces Keywords:Infinite delay; fading memory phase space; bounded and periodic solutions; condensing operators; Hale and Lunel’s fixed point theorem PDF BibTeX XML Cite \textit{K. Ezzinbi} et al., Discrete Contin. Dyn. Syst. 2005, 250--257 (2005; Zbl 1157.34346)