References
- Smale S. Mathematical problems for the next century. Math Intelligencer. 1998;20:7–15.
- Ecalle J. Introduction aux Functions Analysables et Preuve Constructive de la Conjecture de Dulac. Paris: Hermann Publ.; 1992.
- Ilyashenko YS. Finiteness for limit cycles. Providence (RI): Amer. Math. Soc.; 1991. (Transl. Math. Monogr. Vol. 94).
- Chen L, Wang M. The relative position and the number of limit cycles of a quadratic differential system. Acta Math Sinica. 1979;22:751–758.
- Shi S. A concrete example of the existence of four limit cycles for plane quadratic systems. Sci Sinica. 1980;23:153–158.
- Li C, Liu C, Yang J. A cubic system with thirteen limit cycles. J Differ Equ. 2009;246:3609–3619.
- Li J, Liu Y. New results on the study of Zq-equivariant planar polynomial vector fields. Qual Theory Dyn Syst. 2010;9:167–219.
- Otrokov NT. On the number of limit cycles of a differential equation in a neighbourhood of a singular point. Mat Sb. 1954;34:127–144. (in Russian).
- Christopher C, Lloyd N. Polynomial systems: a lower bound for the Hilbert numbers. Proc Roy Soc London Ser A. 1995;450:219–224.
- Han M, Li J. Lower bounds for the Hilbert number of polynomial systems. J Differ Equ. 2012;252:3278–3304.
- Liang H, Torregrosa J. Parallelization of the Lyapunov constants and cyclicity for centers of planar polynomial vector fields. J Differ Equ. 2015;259:6494–6509.
- Zhang P. On the distribution and number of limit cycles for quadratic systems with two foci. Qual Theory Dyn Syst. 2002;3:437–463.
- Llibre J, Rodríguez G. Configuration of limit cycles and planar polynomial vector fields. J Differ Equ. 2004;198:374–380.
- Feng B. Asymptotic position and shape of the limit cycle in a cardiac rheodynamic model. Appl Math E Notes. 2006;6:1–9.
- Petrov V, Nikolov S. Rheodynamic model of cardiac pressure pulsations. Math Biosci. 1999;157:237–252.
- Cao Y, Liu C. The estimate of the amplitude of limit cycles of symmetric Linard systems. J Differ Equ. 2017;262:2025–2038.
- Chen H, Han M, Xia Y-H. Limit cycles of a Linard system with symmetry allowing for discontinuity. J Math Anal Appl. 2018;468:799–816.
- Giacomini H, Llibre J, Viano M. The shape of limit cycles that bifurcate from non-Hamiltonian centers. Nonlinear Anal.. 2000;41:837–859.
- Prohens R, Torregrosa J. Shape and period of limit cycles bifurcating from a class of Hamiltonian period annulus. Nonlinear Anal. 2013;81:130–148.
- Wei X, Shui S. The shape of limit cycles for a class of quintic polynomial differential systems. J Appl Anal Comput. 2013;3:291–300.
- Carbonell M, Llibre J. Limit cycles of a class of polynomial systems. Proc R Soc Edinburgh. 1988;109:187–199.
- Gausll A, Llibre J. Limit cycles for a class of abel equations. SIAM J Math Anal. 1990;21:1235–1244.
- Coll B, Gasull A, Prohens R. Differential equations defined by the sum of two quasiChomogeneous vector fields. Canad J Math. 1997;49:212–231.
- Gin J, Llibre J. Integrability and algebraic limit cycles for polynomial differential systems with homogeneous nonlinearities. J Differ Equ. 2004;208:531–545.
- Carbonell M, Llibre J. Limit cycles of polynomial systems with homogeneous nonlinearities. J Math Anal Appl. 1989;142:573–590.
- Chicone C. Limit cycles of a class of polynomial vector fields in the plane. J Differ Equ. 1986;63:68–87.
- Gausll A, Llibre J, Sotomayor J. Limit cycles of vector fields of the form X(v)=Av+f(v)Bv. J Differ Equ. 1987;67:90–110.
- Gasull A, Yu J, Zhang X. Vector fields with homogeneous nonlinearities and many limit cycles. J Differ Equ. 2015;258:3286–3303.
- Lloyd NG. Limit cycles of certain polynomial differential systems. In: Singh SP, editor. Nonlinear functional analysis and its applications, in: NATO ASI Series C, Vol. 173. Dordrecht: Reidel; 1986. p. 317–326.
- Huang J, Liang H. An uniqueness criterion of limit cycles for planar polynomial systems with homogeneous nonlinearities. J Math Anal Appl. 2018;457:498–521.
- Huang J, Liang H. A geometric criterion for equation x˙=∑i=0mai(t)xi having at most m isolated periodic solutions. J Differ Equ. 2020;268:6230–6250.
- Lins-Neto A. On the number of solutions of the equation dx/dt=∑j=0naj(t)xj, 0≤t≤1, for which x(0)=x(1). Invent Math. 1980;59:67–76.
- Lloyd NG. The number of periodic solutions of the equation z˙=zN+p1(t)zN−1+⋯+pN(t). Proc Lond Math Soc. 1973;27:667–700.
- Ladde G, Lakshmikantham V. Monotone iterative techniques for nonlinear differential equations. London: Pitman Advanced Publishing Program, Pitman; 1985.
- Toumi F. Monotone iterative technique for systems of nonlinear caputo fractional differential equations. Differential and difference equations with applications. Vol. 164 of the series Springer Proceedings in Mathematics and Statistics; 2016. p. 99–107.
- Yang L, Tang Y. Some new results on abel equations. J Math Anal Appl. 2001;261:100–112.
- Carbonell M, Llibre J. Hopf bifurcation, averaging methods and Liapunov quantities for polynomial systems with homogeneous nonlinearities. Proc. European Conference on Iteration Theory-ECIT 87. Singapore: World Scientific; 1989. p. 145–160.
- Cherkas L. Number of limit cycles of an autonomous second-order system. Differ Equ. 1976;5:666–668.
- Coll B, Gasull A, Llibre J. Some theorems on the existence, uniqueness, and nonexistence of limit cycles for quadratic systems. J Differ Equ. 1987;67:372–399.
- Huang J, Liang H, Llibre J. Non-existence and uniqueness of limit cycles for planar polynomial differential systems with homogeneous nonlinearities. J Differ Equ. 2018;265:3888–3913.
- Kooij R, Christopher C. Algebraic invariant curves and the integrability of polynomial systems. Appl Math Lett. 1993;6:51–53.
- Dumortier F, Llibre J, Artés JC. Qualitative theory of planar differential systems. New York: Springer; 2006.