Global configurations of singularities for quadratic differential systems with exactly three finite singularities of total multiplicity four

Artes Joan; Llibreb Jaume; Schlomiuk Dana; Vulpe Nicolae

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2023-12-21 10:49

SM ISO690:2012

ARTES, Joan, LLIBREB, Jaume, SCHLOMIUK, Dana, VULPE, Nicolae. Global configurations of singularities for quadratic differential systems with exactly three finite singularities of total multiplicity four. In: Electronic Journal of Qualitative Theory of Differential Equations, 2015, vol. 2015, pp. 1-43. ISSN 1417-3875. DOI: https://doi.org/10.14232/ejqtde.2015.1.49

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Electronic Journal of Qualitative Theory of Differential Equations

Volumul 2015 / 2015 / ISSN 1417-3875

Global configurations of singularities for quadratic differential systems with exactly three finite singularities of total multiplicity four

DOI:https://doi.org/10.14232/ejqtde.2015.1.49

Pag. 1-43

Artes Joan¹, Llibreb Jaume¹, Schlomiuk Dana², Vulpe Nicolae³

¹ Universitat Autònoma de Barcelona,
² Université de Montréal,
³ Institute of Mathematics and Computer Science ASM

Disponibil în IBN: 20 mai 2023

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Rezumat

In this article we obtain the geometric classification of singularities, finite and infinite, for the two subclasses of quadratic differential systems with total finite multiplicity m_f = 4 possessing exactly three finite singularities, namely: systems with one double real and two complex simple singularities (31 configurations) and (ii) systems with one double real and two simple real singularities (265 configurations). We also give here the global bifurcation diagrams of configurations of singularities, both finite and infinite, with respect to the geometric equivalence relation, for these classes of quadratic systems. The bifurcation diagram is done in the 12-dimensional space of parameters and it is expressed in terms of polynomial invariants. This gives an algorithm for determining the geometric configuration of singularities for any system in anyone of the two subclasses considered.

Cuvinte-cheie
affine invariant polynomials, configuration of singularities, geometric equivalence relation, infinite and finite singularities, Poincare compactification, Quadratic vector fields