Conditions for the existence of bounded solutions of nonlinear differential and functional differential equations

Authors

  • V. Yu. Slyusarchuk

Abstract

Let $E$ be a finite-dimensional Banach space, let $C^0(R; E)$ be a Banach space of functions continuous and bounded on $R$ and taking values in $E$; let $K:\;C^0(R ,E) → C^0(R, E)$ be a $c$-continuous bounded mapping, let $A:\;E → E$ be a linear continuous mapping, and let $h ∈ C^0(R, E)$. We establish conditions for the existence of bounded solutions of the nonlinear equation $$\frac{dx(t)}{dt} + (Kx)(t)Ax(t) = h(t),\;t ∈ R.$$

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Published

25.06.2010

Issue

Vol. 62 No. 6 (2010)

Section

Research articles

How to Cite

Slyusarchuk, V. Yu. “Conditions for the Existence of Bounded Solutions of Nonlinear Differential and Functional Differential Equations”. Ukrains’kyi Matematychnyi Zhurnal, vol. 62, no. 6, June 2010, pp. 837–846, https://umj.imath.kiev.ua/index.php/umj/article/view/2914.