Additional files for the article
Quadratic systems possessing an
infinite elliptic-saddle or an
infinite nilpotent saddle
Artés, Joan C.; Rezende, Alex; Mota, Marcos C.
This paper presents a global study of the class QES of all real quadratic polynomial diferential
systems possessing exactly one elemental infinite singular point and one triple infinite singular point, which is either an infinite nilpotent elliptic-saddle or a nilpotent saddle. This class can be divided into three different families, namely, QES(A) of phase portraits possessing three real infinite singular points, QES(B) of phase portraits possessing one real and two complex infinite singular points, and QES(C) of phase portraits possessing one real triple infinite singular point.
Here we provide the complete study of the geometry of these three families. Modulo the action of the affine group and time homotheties, families QES(A) and QES(B) are three-dimensional and family QES(C) is two- dimensional. We study the respective bifurcation diagrams of their closures with respect to specific normal forms, in subsets of real Euclidean spaces. The bifurcation diagram of family QES(A) (respectively, QES(B) and QES(C)) yields 1274 (respectively, 89 and 14) subsets with 91 (respectively, 27 and 12) topologically distinct phase portraits for
systems in the closure QES(A) (respectively, QES(B) and QES(C)) within the representatives of QES(A) (respectively, QES(B) and QES(C)) given by a specific normal form.
Back to the main page