The study of nonlinear almost periodic differential equations without recourse to the $\pmb{\mathscr H}$-classes of these equations
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Publication:2921159
DOI10.1070/SM2014V205N06ABEH004402zbMath1316.34049MaRDI QIDQ2921159
Publication date: 30 September 2014
Published in: Sbornik: Mathematics (Search for Journal in Brave)
Classical almost periodic functions, mean periodic functions (42A75) Almost and pseudo-almost periodic solutions to ordinary differential equations (34C27)
Related Items (7)
To Favard's theory for functional equations ⋮ A criterion for the existence of almost periodic solutions of nonlinear differential equations with impulsive perturbation ⋮ Almost periodic solutions of differential equations ⋮ Necessary and sufficient conditions for the invertibility of nonlinear differentiable maps ⋮ Conditions of solvability for nonlinear differential equations with perturbations of the solutions in the space of functions bounded on the axis ⋮ Favard-Amerio theory for almost periodic functional-differential equations without using the \(\mathcal{H}\)-classes of these equations ⋮ On the Favard theory without \(\mathcal{H}\)-classes for differential-functional equations in Banach spaces
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