Phase Portraits of the Family IV of the Quadratic Polynomial Differential Systems

Joan Carles Artés Ferragud; Laurent Cairó; Jaume Llibre

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Phase Portraits of the Family IV of the Quadratic Polynomial Differential Systems

Autores: Joan Carles Artés Ferragud , Laurent Cairó, Jaume Llibre
Localización: Qualitative theory of dynamical systems, ISSN 1575-5460, Vol. 24, Nº 2, 2025
Idioma: inglés
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Resumen
- In the R2 plane, the simplest non-linear differential systems are the quadratic polynomial differential systems. This type of differential systems have been studied intensively because of its non-linearity and wide range of applications. These systems have been classified into ten classes. In this article, we characterize in the Poincarè disk all topologically different phase portraits for one of these classes. Concretely we provide the complete study of the geometry of family IV. The family IV is sixdimensional and is reduced to several subfamilies which are three-dimensional. We give the bifurcation diagram of each specific normal form using invariant polynomials.
  
  The split of all quadratic systems in ten subfamilies could have been a good way to find all possible phase portraits of quadratic systems, if all ten families could have been studied completely. All families are six-dimensional and some of them can even be divided in several subfamilies with fewer parameters. However, certain families (I, II, and III) are too generic and cannot be reduced enough to allow its complete study. Regardless, this division of quadratic systems has been useful to study several families of quadratic systems having some other properties, and it is worth trying to get as many of them as possible studied in a complete way.
Referencias bibliográficas
- 1. Álvarez, M.J., Ferragud, A., Jarque, X.: A survey on the blow up technique. Int. J. Bifur. Chaos 21, 3103–3118 (2011)
- 2. Artés, J.C., Chen, H., Ferrer, L.M., Jia, M.: Quadratic vector fields in class I, Dyn. Syst. (2024). https:// doi.org/10.1080/14689367.2024.2436223
- 3. Artés, J.C., Llibre, J., Schlomiuk, D.: The geometry of quadratic differential systems with a weak focus of second order. Int. J. Bifur....
- 4. Artés, J.C., Llibre, J., Schlomiuk, D.: The geometry of quadratic polynomial differential systems with a weak focus and an invariant straight...
- 5. Artés, J.C., Llibre, J., Schlomiuk, D., Vulpe, N.: Invariant conditions for phase portraits of quadratic systems with complex conjugate...
- 6. Artés, J.C., Mota, M.C., Rezende, A.C.: Quadratic differential systems with a finite saddle-node and an infinite saddle-node (1, 1)SN -...
- 7. Artés, J.C., Mota, M.C., Rezende, A.C.: Quadratic differential systems with a finite saddle-node and an infinite saddle-node (1, 1)SN -...
- 8. Artés, J.C., Rezende, A.C., Oliveira, R.: Global phase portraits of quadratic polynomial differential systems with a semi-elemental triple...
- 9. Artés, J.C., Rezende, A.C., Oliveira, R.: The geometry of quadratic polynomial differential systems with a finite and an infinite saddle-node...
- 10. Artés, J.C., Rezende, A.C., Oliveira, R.D.S.: The geometry of quadratic polynomial differential systems with a finite and an infinite...
- 11. Artés, J.C., Llibre, J., Schlomiuk, D., Vulpe, N.: Global topological configurations of singularities for the whole family of quadratic...
- 12. Artés, J.C., Llibre, J., Schlomiuk, D., Vulpe, N.: Geometric Configurations of Singularities of Planar Polynomial Differential Systems....
- 13. Büchel, W.: Zur topologie der durch eine gewöhnliche differentialgleichung erster ordnung und ersten grades definierten kurvenschar. Mitteil....
- 14. Bujac, C., Schlomiuk, D., Vulpe, N.: The bifurcation diagram of the configurations of invariant lines of total multiplicity exactly three...
- 15. Cairó, L., Llibre, J.: Phase portraits of families VII and VIII of the quadratic systems. Axioms (2023). https://doi.org/10.3390/axioms12080756
- 16. Chicone, C., Tian, J.: On general properties of quadratic systems. Am. Math. Mon. 89(3), 167–178 (1982)
- 17. Coppel, W.A.: A survey of quadratic systems. J. Differ. Equ. 2, 293–304 (1966)
- 18. Dumortier, F., Llibre, J., Artés, J.C.: Qualitative Theory of Planar Differential Systems. Universitext, Springer (2006)
- 19. Gasull, A., Li-Ren, S., Llibre, J.: Chordal quadratic systems. Rocky Mountain J. Math. 16, 751–782 (1986)
- 20. Reyn, J.: Phase Portraits of Planar Quadratic Systems, Mathematics and Its Applications vol. 583, Springer (2007)
- 21. Rychkov, G.S.: A complete investigation of the number of limit cycles of the equation (b10x + y)dy = 2 i+ j=1 ai j xi...
- 22. Schlomiuk, D., Vulpe, N.: Planar quadratic differential systems with invariant straight lines of at least five total multiplicity. Qual....
- 23. Schlomiuk, D., Vulpe, N.: Integrals and phase portraits of planar quadratic differential systems with invariant lines of at least five...
- 24. Schlomiuk, D., Vulpe, N.: Integrals and phase portraits of planar quadratic differential systems with invariant lines of total multiplicity...
- 25. Schlomiuk, D., Vulpe, N.: Planar quadratic differential systems with invariant straight lines of total multiplicity four. Nonlinear Anal....
- 26. Schlomiuk, D., Vulpe, N.: Global classification of the planar Lotka-Volterra differential systems according to their configurations of...
- 27. Schlomiuk, D., Vulpe, N.: Global topological classification of Lotka-Volterra quadratic differential systems. Electron. J. Differ. Equ....
- 28. Vulpe, N.I.: Affine-invariant conditions for the topological discrimination of quadratic systems with a center. Differ. Equ. 19, 273–280...
- 29. Ye, Y.: Theory of imit cycles, Transl. Math. Monogr., vol. 66, Amer. Math. Soc., Providence, RI (1986)