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I. Kiguradze, T. Chanturia (1992)
Asymptotic Properties of Solutions of Nonautonomous Ordinary Differential Equations
I. Astashova (2005)
Application of dynamical systems to the study of asymptotic properties of solutions to nonlinear higher-order differential equationsJournal of Mathematical Sciences, 126
I. Kiguradze, G. Kvinikadze (1982)
On strongly increasing solutions of nonlinear ordinary differential equationsAnnali di Matematica Pura ed Applicata, 130
J. Marsden, M. McCracken, Springer New, York Berlin (1976)
The Hopf Bifurcation and Its Applications
I. Astashova (2013)
On power and non-power asymptotic behavior of positive solutions to Emden-Fowler type higher-order equationsAdvances in Difference Equations, 2013
Differ. Uravn., 17
(1981)
On some asymptotic properties to solutions for the Emden–Fowler type equations (in Russian)
V. Kozlov (1999)
On Kneser solutions of higher order nonlinear ordinary differential equationsArkiv för Matematik, 37
Abstract For higher-order Emden–Fowler type equations with regular nonlinearity, the asymptotic behavior of their blow-up solutions is investigated. It is proved that for weakly superlinear differential equations, all such solutions have power-law asymptotic behavior.
Georgian Mathematical Journal – de Gruyter
Published: Jun 1, 2017
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