A note on the Poincaré-Bendixson index theorem
1996; Tokyo Institute of Technology; Volume: 19; Issue: 2 Linguagem: Inglês
10.2996/kmj/1138043594
ISSN1881-5472
AutoresMarek Izydorek, Sławomir Rybicki, Zbigniew Szafraniec,
Tópico(s)Geometric Analysis and Curvature Flows
ResumoThe local scheme for an equilibrium state of an analytic planar dynamical systems is investigated.Upper bounds of the numbers of elliptic and hyperbolic sectors are derived.Methods of singularity theory are applied to obtain appropriate estimations in terms of indices of maps explicitly constructed from a vector field. I. IntroductionThe study of geometric differential equations was founded by H. Poincare in his classical "Memoire" [PCR1] (see alsoAt 15 years distance, Poincare's ideas was followed by Bendixson's whose attention was mainly turned to the local phase-portrait around a critical point.In his major paper [BDX] Bendixson derived the index formula where deg(F) is the index of a stationary point of a planar vector field and β, SC are respectively the numbers of elliptic and hyperbolic sectors.This equality, known in bibliography as the Poincare-Bendixson formula, gives an interesting application of topological methods to planar differential equations.Under some additional assumptions one can give another Poincare-Bendixson formulawhere n e , n h are respectively the numbers of internal and external tangent points of a vector field to a C, Jordan curve going around a stationary point.
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