Infinitesimal Poincaré-Bendixson problem in dimension 3

C. Alonso-González; F. Cano; Rudy Rosas

Infinitesimal Poincaré-Bendixson problem in dimension 3

C. Alonso-González
, F. Cano
, Rudy Rosas

Sección de Matemáticas

Universitat d'Alacant
Universidad de Valladolid

Research output: Contribution to journal › Article › peer-review

4 Scopus citations

Abstract

We describe the sets of accumulation of secants for orbits of real analytic vector fields in dimension 3 having the origin as only ω-limit point. It is a kind of infinitesimal Poincaré-Bendixson problem in dimension 3. These sets have structure of a cyclic graph when the singularities are isolated under one blow-up. In the case of hyperbolic reduction of singularities with conditions of Morse-Smale-type, we prove that the accumulation set is at most a single poly-cycle isomorphic to.

Original language	Spanish
Pages (from-to)	5994-6019
Number of pages	26
Journal	International Mathematics Research Notices
Volume	2014
State	Published - 1 Jan 2014

Cite this

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abstract = "We describe the sets of accumulation of secants for orbits of real analytic vector fields in dimension 3 having the origin as only ω-limit point. It is a kind of infinitesimal Poincar{\'e}-Bendixson problem in dimension 3. These sets have structure of a cyclic graph when the singularities are isolated under one blow-up. In the case of hyperbolic reduction of singularities with conditions of Morse-Smale-type, we prove that the accumulation set is at most a single poly-cycle isomorphic to.",

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AU - Cano, F.

AU - Rosas, Rudy

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N2 - We describe the sets of accumulation of secants for orbits of real analytic vector fields in dimension 3 having the origin as only ω-limit point. It is a kind of infinitesimal Poincaré-Bendixson problem in dimension 3. These sets have structure of a cyclic graph when the singularities are isolated under one blow-up. In the case of hyperbolic reduction of singularities with conditions of Morse-Smale-type, we prove that the accumulation set is at most a single poly-cycle isomorphic to.

AB - We describe the sets of accumulation of secants for orbits of real analytic vector fields in dimension 3 having the origin as only ω-limit point. It is a kind of infinitesimal Poincaré-Bendixson problem in dimension 3. These sets have structure of a cyclic graph when the singularities are isolated under one blow-up. In the case of hyperbolic reduction of singularities with conditions of Morse-Smale-type, we prove that the accumulation set is at most a single poly-cycle isomorphic to.

M3 - Artículo

SN - 1073-7928

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SP - 5994

EP - 6019

JO - International Mathematics Research Notices

JF - International Mathematics Research Notices

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