\(QS25_{3}^{(0)}\)

Description

Topological configuration of singularities: \(s,a;S,N,N\)

Phase Portrait

Topological Invariants

TCSP	Fin Sep	Inf Sep
\(25\)	\(41\)	\(311101\)

Example

The quadratic differential system

\[\begin{cases} \dot{x} = y+x^{2}+x \, y \\ \dot{y} = e^{2} \, x/5-e \, y+x^{2}+y^{2}/4 \end{cases}\]

with parameters: \(e = -0.4\)

has the following phase portrait done with P4. If you want, you may download the P4 file here. Since the image is not clear enough, we have added a ZOOM of it.

The phase portrait appears in the following papers

With names \(AA^s_3\) and \(AA^n_3\) in {J. C. Artés, R. D. S. Oliveira and A. C. Rezende}, Structurally unstable quadratic vector fields of codimension two: families possessing either a cusp point or two finite saddle-nodes, J. Dynam. Differential Equations { bf 33} (2021), no.~4, 1779--1821; MR4333383
With names \(2S4\) and \(11S3\) in {J. C. Artés and C. Trullàs}, Quadratic Differential Systems with a Weak Focus of First-Order and a Finite Saddle-Node, {International Journal of Bifurcation and Chaos, Vol. 36, No. 6 (2026) 2630013 (99 pages)}Note (for name \(11S3\)): The system has 1 limit cycle.
With names \(1S03\) and \(1S04\) in {J. C. Artés and L. Cairó}, Phase portraits of quadratic differential systems with a weak focus and a (1,1) SN, {Preprint} (2026).Note (for name \(1S03\)): The system has 1 limit cycle.
With names \(Fig 5.21 S^2_{9,3}\) and \(Fig 5.129 S^2_{9,3}\) in {J. C. Artés, J. Llibre and A. C. Rezende}, Structurally unstable quadratic vector fields of codimension one, Birkhäuser/Springer, Cham, 2018, vi+267 pp.Note (for name \(Fig 5.21 S^2_{9,3}\)): The system has 1 limit cycle.Note (for name \(Fig 5.129 S^2_{9,3}\)): The system has 1 limit cycle.
With names \(V5\) and \(V9\) in {J. C. Artés, R. D. S. Oliveira and A. C. Rezende}, Topological classification of quadratic polynomial differential systems with a finite semi-elemental triple saddle, Internat. J. Bifur. Chaos Appl. Sci. Engrg. { bf 26} (2016), no.~11, 1650188, 26 pp.; MR3566296Note (for name \(V9\)): The system has 1 limit cycle.
With name \(S^2_{9,3}\) in {J. C. Artés, R. E. Kooij and J. Llibre}, Structurally stable quadratic vector fields, Mem. Amer. Math. Soc. { bf 134} (1998), no.~639, viii+108 pp.; MR1432139
With names \(V1\) and \(V8\) in {J. C. Artés, J. Llibre and D. Schlomiuk}, The geometry of quadratic differential systems with a weak focus of second order, emph{ Internat. J. Bifur. Chaos Appl. Sci. Engrg.}, textbf{16} (2006), {3127--3194}.Note (for name \(V8\)): The system has 1 limit cycle.
With name \(V1\) in {J. Llibre and D. Schlomiuk}, Geometry of quadratic differential systems with a weak focus of third order, emph{Canad. J. of Math.}, textbf{56}, no. 2 (2004), 310--343.
With names \(Fig 1.3 a\), \(Fig 1.3 b\), \(Fig 1.3 c\), \(Fig 1.3 d\), \(Fig 1.7 e\) and \(Fig 1.7 f\) in {J. W. Reyn and R. E. Kooij}, Phase portraits of non-degenerate quadratic systems with finite multiplicity two, Differential Equations Dynam. Systems { bf 5} (1997), no.~3-4, 355--414; MR1660222Note (for name \(Fig 1.3 b\)): The system has \(d\) limit cycles.Note (for name \(Fig 1.3 c\)): The system has \(2\) limit cycles.Note (for name \(Fig 1.3 d\)): The system has 1 limit cycle.Note (for name \(Fig 1.7 e\)): The system has 1 limit cycle.
With name \(V11\) in {J. C. Artés, A. C. Rezende and R. Oliveira}, Global phase portraits of quadratic polynomial differential systems with a semi-elemental triple node, emph{Internat. J. Bifur. Chaos Appl. Sci. Engrg.}, { bf 23}, no. 8 (2013), 1350140, 21 pp.
With name \(V9\) in {J. C. Artés, J. Llibre and D. Schlomiuk}, The geometry of quadratic polynomial differential systems with a weak focus and an invariant straight line, emph{ Internat. J. Bifur. Chaos Appl. Sci. Engrg.}, textbf{20}, no. 11 (2010), 3627--3662.

Neighbours of Codimension 1

Through the border \(QS27_{5}^{(1)}\), by means of a bifurcation of type \(B\), we reach the neighbor \(QS23_{1}^{(0)}\).
Through the border \(QS27_{6}^{(1)}\), by means of a bifurcation of type \(B\), we reach the neighbor \(QS23_{1}^{(0)}\).
Through the border \(QS45_{3}^{(1)}\), by means of a bifurcation of type \(A\), we reach the neighbor \(QS13_{1}^{(0)}\).
Through the border \(QS25_{5}^{(1)}\), by means of a bifurcation of type \(D\), we reach the neighbor \(QS25_{2}^{(0)}\).
Through the border \(QS25_{2}^{(1)}\), by means of a bifurcation of type \(D\), we reach the neighbor \(QS25_{2}^{(0)}\).
Through the border \(QS38_{1}^{(1)}\), by means of a bifurcation of type \(A\), we reach the neighbor \(QS10_{1}^{(0)}\).
Through the border \(QS38_{2}^{(1)}\), by means of a bifurcation of type \(A\), we reach the neighbor \(QS10_{1}^{(0)}\).
Through the border \(QS38_{3}^{(1)}\), by means of a bifurcation of type \(A\), we reach the neighbor \(QS10_{1}^{(0)}\).
Through the border \(QS38_{5}^{(1)}\), by means of a bifurcation of type \(A\), we reach the neighbor \(QS10_{2}^{(0)}\).
Through the border \(QS38_{9}^{(1)}\), by means of a bifurcation of type \(A\), we reach the neighbor \(QS10_{4}^{(0)}\).
Through the border \(QS38_{15}^{(1)}\), by means of a bifurcation of type \(A\), we reach the neighbor \(QS10_{7}^{(0)}\).
Through the border \(QS38_{18}^{(1)}\), by means of a bifurcation of type \(A\), we reach the neighbor \(QS10_{8}^{(0)}\).
Through the border \(QS38_{25}^{(1)}\), by means of a bifurcation of type \(A\), we reach the neighbor \(QS10_{12}^{(0)}\).
Through the border \(QS38_{28}^{(1)}\), by means of a bifurcation of type \(A\), we reach the neighbor \(QS10_{13}^{(0)}\).
Through the border \(QS38_{29}^{(1)}\), by means of a bifurcation of type \(A\), we reach the neighbor \(QS10_{14}^{(0)}\).
Through the border \(QS85_{2}^{(1)}\), by means of a bifurcation of type \(C\), we reach the neighbor \(QS19_{2}^{(0)}\).

Comments

This phase portrait appears in J. Llibre and D. Schlomiuk (emph{Canad. J. of Math.}, textbf{56}, no. 2 (2004), 310--343) featuring a weak focus of third order. Since the portrait is of codimension 0, a configuration structurally equivalent to \(QS25_{3}^{(0)}\) could potentially exhibit up to three limit cycles (or compound double/triple arrangements) bifurcating from the focus.