A criterion for the existence of almost periodic solutions of nonlinear equations that does not use $\mathcal{H}$ -classes of these equations
1 Department of Higher Mathematics, National University of Water and Environmental Engineering, Rivne, 33028, Ukraine
Keywords:
а criterion for the existence of almost periodic solutions, $\mathcal{H}$ -classes
Abstract
We obtain conditions for the existence of almost periodic solutions of nonlinear almost periodic equations in a Banach space that do not use $\mathcal{H}$ -classes of these equations.
References
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[4] Sliusarchuk V. Y. Conditions of almost periodicity of bounded solutions of nonlinear differential equations with a continuous argument // Nonlinear Oscillations - 2013. - 16, № 1. - P. 118-124.
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Cite
- ACS Style
- Slyusarchuk , V.Y. A criterion for the existence of almost periodic solutions of nonlinear equations that does not use $\mathcal{H}$ -classes of these equations. Bukovinian Mathematical Journal. 2016, 1
- AMA Style
- Slyusarchuk VY. A criterion for the existence of almost periodic solutions of nonlinear equations that does not use $\mathcal{H}$ -classes of these equations. Bukovinian Mathematical Journal. 2016; 1(1-2).
- Chicago/Turabian Style
- Vasyl Yukhimovych Slyusarchuk . 2016. "A criterion for the existence of almost periodic solutions of nonlinear equations that does not use $\mathcal{H}$ -classes of these equations". Bukovinian Mathematical Journal. 1 no. 1-2.
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