Solutions of definable ODEs with regular separation and dichotomy interlacement versus Hardy

  1. Olivier Le Gal 1
  2. Mickaël Matusinski 2
  3. Fernando Sanz Sánchez 3
  1. 1 Université de Savoie, Bâtiment Chablais, Campus Scientifique
  2. 2 Univ. Bordeaux
  3. 3 Universidad de Valladolid
    info

    Universidad de Valladolid

    Valladolid, España

    ROR https://ror.org/01fvbaw18

Revue:
Revista matemática iberoamericana

ISSN: 0213-2230

Année de publication: 2022

Volumen: 38

Número: 5

Pages: 1501-1527

Type: Article

DOI: 10.4171/RMI/1311 DIALNET GOOGLE SCHOLAR lock_openAccès ouvert editor

D'autres publications dans: Revista matemática iberoamericana

Résumé

We introduce a notion of regular separation for solutions of systems of ODEs y'=F(x,y)y′=F(x,y), where FF is definable in a polynomially bounded o-minimal structure and y=(y_1,y_2)y=(y1,y2). Given a pair of solutions with flat contact, we prove that, if one of them has the property of regular separation, the pair is either interlaced or generates a Hardy field. We adapt this result to trajectories of three-dimensional vector fields with definable coefficients. In the particular case of real analytic vector fields, it improves the dichotomy interlaced/separated of certain integral pencils, obtained by F. Cano, R. Moussu and the third author. In this context, we show that the set of trajectories with the regular separation property and asymptotic to a formal invariant curve is never empty and it is represented by a subanalytic set of minimal dimension containing the curve. Finally, we show how to construct examples of formal invariant curves which are transcendental with respect to subanalytic sets, using the so-called (SAT) property, introduced by J.-P. Rolin, R. Shaefke and the third author