SMOOTH LOCAL NORMAL FORMS OF HYPERBOLIC ROUSSARIE VECTOR FIELDS

In 1975, Roussarie studied a special class of vector fields, whose singular points fill a submanifold of codimension two and the ratio between two non-zero eigenvalues lambda(1) : lambda(2) = 1 : -1 He established a smooth orbital normal form for such fields at points where lambda(1,2) are real and the quadratic part of the field satisfied a certain genericity condition. In this paper, we establish smooth orbital normal forms for such fields at points where this condition fails. Moreover, we prove similar results for vector fields, whose singular points fill a submanifold of codimension two and the ratio between two non-zero eigenvalues lambda(1) : lambda(2) = p : -q with arbitrary integers p, q >= 1.

Authors
Pavlova N.G. 1, 2, 3 , Remizov A.O.1
Journal
Moscow Mathematical Journal
Publisher
Independent University of Moscow
Number of issue
2
Language
English
Pages
413-426
Status
Published
DOI
10.17323/1609-4514-2021-21-2-413-426
Volume
21
Year
2021
Organizations
  • 1 Moscow Inst Phys & Technol, Inst Per 9, Dolgoprudnyi 141700, Russia
  • 2 Inst Control Sci RAS, Profsoyuznaya Str 65, Moscow 117997, Russia
  • 3 Peoples Friendship Univ RUSSIA, Mikluho Maklaya Str 6, Moscow 117198, Russia
Keywords
Vector field; singular point; resonance; normal form
Date of creation
20.07.2021
Date of change
20.07.2021
Short link
https://repository.rudn.ru/en/records/article/record/74570/
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