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References (8)
-
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
-
On some asymptotic properties to solutions for the Emden–Fowler type equations
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
- Publisher
- de Gruyter
- Copyright
- Copyright © 2017 by the
- ISSN
- 1072-947X
- eISSN
- 1572-9176
- DOI
- 10.1515/gmj-2017-0011
- Publisher site
- See Article on Publisher Site
Abstract
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.
Journal
Georgian Mathematical Journal – de Gruyter
Published: Jun 1, 2017