This work is licensed under the Creative Commons Attribution 4.0 International License.
A. U. Afuwape, Remarks on Barbashin-Ezeilo problem on third-order nonlinear differential equations, J. Math. Anal. Appl. 317 (2066), 613–619.AfuwapeA. U.Remarks on Barbashin-Ezeilo problem on third-order nonlinear differential equationsJ. Math. Anal. Appl.317206661361910.1016/j.jmaa.2005.05.068Search in Google Scholar
F. Alfaro, J. Llibre and E. Pérez-Chavela, A class of galactic potentials: periodic orbits and integrability, Astrophysics and Space Sciences 344 (2013), 39–44.AlfaroF.LlibreJ.Pérez-ChavelaE.A class of galactic potentials: periodic orbits and integrabilityAstrophysics and Space Sciences3442013394410.1007/s10509-012-1318-9Search in Google Scholar
J. Andres, Existence, uniqueness, and instability of large-period harmonics to the third-order nonlinear differential equations, J. Math. Anal. Appl. 199 (1996), 445–457.AndresJ.Existence, uniqueness, and instability of large-period harmonics to the third-order nonlinear differential equationsJ. Math. Anal. Appl.199199644545710.1006/jmaa.1996.0152Search in Google Scholar
M. Arribas, A. Elipse, A. Floria and A. Riaguas, Oscillators in resonance, Chaos, Solitons and Fractals 27 (2006), 1220–1228.ArribasM.ElipseA.FloriaA.RiaguasA.Oscillators in resonanceChaos, Solitons and Fractals2720061220122810.1016/j.chaos.2005.04.085Search in Google Scholar
A. Buica, J. P. Françoise and J. Llibre, Periodic solutions of nonlinear periodic differential systems with a small parameter, Comm. Pure Appl. Anal. 6 (2006), 103–111.BuicaA.FrançoiseJ. P.LlibreJ.Periodic solutions of nonlinear periodic differential systems with a small parameterComm. Pure Appl. Anal.6200610311110.3934/cpaa.2007.6.103Search in Google Scholar
E. Calzeta and C.E. Hasi, Chaotic Friedmann-Robertson-Walker cosmology, Class. Quantum Gravity. 10 (1993), 1825–1841CalzetaE.HasiC.E.Chaotic Friedmann-Robertson-Walker cosmologyClass. Quantum Gravity.1019931825184110.1088/0264-9381/10/9/022Search in Google Scholar
A. Elipe A. and A. Deprit, Oscillators in resonance, Mechanics Research Communications 26, (1999), 635–640.ElipeA.A.DepritA.Oscillators in resonanceMechanics Research Communications26199963564010.1016/S0093-6413(99)00072-5Search in Google Scholar
E. Esmailzadeh, M. Ghorashi and B. Mehri, Periodic behavior of a Nonlinear Dynamical system, Nonlinear Dynam. 7 (1995), 335–344.EsmailzadehE.GhorashiM.MehriB.Periodic behavior of a Nonlinear Dynamical systemNonlinear Dynam.7199533534410.1007/BF00046307Search in Google Scholar
S.P. Hastings, On the uniqueness and global asymptotic stability of periodic solutions for a third order system, Rocky Mountain J. Math 7 (1977), 513–538.HastingsS.P.On the uniqueness and global asymptotic stability of periodic solutions for a third order systemRocky Mountain J. Math7197751353810.1216/RMJ-1977-7-3-513Search in Google Scholar
F. Lembarki and J. Llibre, periodic orbits for the generalized Yang-Mills Hamiltonian systems in dimension 6, Nonlinear Dyn 76 (2014), 1807–1819.LembarkiF.LlibreJ.periodic orbits for the generalized Yang-Mills Hamiltonian systems in dimension 6Nonlinear Dyn7620141807181910.1007/s11071-014-1249-9Search in Google Scholar
Z. Liang, Radially stable periodic solutions for radially symmetric Keplerian-like systems. J. Dyn. Control Syst. 23 (2017), 363–373.LiangZ.Radially stable periodic solutions for radially symmetric Keplerian-like systemsJ. Dyn. Control Syst.23201736337310.1007/s10883-016-9327-6Search in Google Scholar
J. Llibre, J. Yu, and X. Zhang, Limit cycles for a class of third-order differential equations, Rocky Mountain J. Math. 40 (2010), 581–594.LlibreJ.YuJ.ZhangX.Limit cycles for a class of third-order differential equationsRocky Mountain J. Math.40201058159410.1216/RMJ-2010-40-2-581Search in Google Scholar
I. G. Malkin, Some Problems of the theory of nonlinear oscillations, Gosudarstv. Izdat. Tehn-Teor. Lit. Moscow, 1956 (in Russian).MalkinI. G.Some Problems of the theory of nonlinear oscillationsGosudarstv. Izdat. Tehn-Teor. Lit.Moscow1956(in Russian).Search in Google Scholar
F. Minhos, Periodic solutions for a third order differential equation under conditions on the potential, Portugal. Math. 55 (1998), 475–484.MinhosF.Periodic solutions for a third order differential equation under conditions on the potentialPortugal. Math.551998475484Search in Google Scholar
R. Reissig, Periodic solutions for a third order nonlinear differential equation, Ann. Mat. Pura Appl. 92 (1972), 193–198.ReissigR.Periodic solutions for a third order nonlinear differential equationAnn. Mat. Pura Appl.92197219319810.1007/BF02417946Search in Google Scholar
M. Roseau, Vibrations non linéaires et théorie de la stabilité, Springer Tracts in Natural Philosophy, Vol. 8, Springer, New York, 1985.RoseauM.Vibrations non linéaires et théorie de la stabilité, Springer Tracts in Natural Philosophy8SpringerNew York1985Search in Google Scholar
J.C. Sprott, Elegant Chaos,Algebraically Simply Chaotic Flows, World Scientific, 2010.SprottJ.C.Elegant Chaos,Algebraically Simply Chaotic FlowsWorld Scientific201010.1142/7183Search in Google Scholar
G. Villari, Criteri di esistenza di soluzioni periodiche per particolari class di equazioni differentiali del terz’ ordine non lineari, Matematiche (Catania) 19 (1964), 96–113.VillariG.Criteri di esistenza di soluzioni periodiche per particolari class di equazioni differentiali del terz’ ordine non lineariMatematiche (Catania)19196496113Search in Google Scholar
R.K. Zhuang and R. Yuan, The existence of pseudo-almost periodic solutions of third-order neutral differential equations with piecewise constant argument, Acta Math. Sin. (Engl. Ser.) 29 (2013), 943–958.ZhuangR.K.YuanR.The existence of pseudo-almost periodic solutions of third-order neutral differential equations with piecewise constant argumentActa Math. Sin. (Engl. Ser.)29201394395810.1007/s10114-013-0008-zSearch in Google Scholar