• Title of article

    Periodic orbits in complex Abel equations

  • Author/Authors

    Anna Cima، نويسنده , , Armengol Gasull، نويسنده , , Francesc Manosas، نويسنده ,

  • Issue Information
    روزنامه با شماره پیاپی سال 2006
  • Pages
    15
  • From page
    314
  • To page
    328
  • Abstract
    This paper is devoted to prove two unexpected properties of the Abel equation dz/dt=z3+B(t)z2+C(t)z, where B and C are smooth, 2π-periodic complex valuated functions, and . The first one is that there is no upper bound for its number of isolated 2π-periodic solutions. In contrast, recall that if the functions B and C are real valuated then the number of complex 2π-periodic solutions is at most three. The second property is that there are examples of the above equation with B and C being low degree trigonometric polynomials such that the center variety is formed by infinitely many connected components in the space of coefficients of B and C. This result is also in contrast with the characterization of the center variety for the examples of Abel equations dz/dt=A(t)z3+B(t)z2 studied in the literature, where the center variety is located in a finite number of connected components.
  • Keywords
    Abel equation , Perturbations , Limit cycles , Periodic orbits , Center variety
  • Journal title
    JOURNAL OF DIFFERENTIAL EQUATIONS
  • Serial Year
    2006
  • Journal title
    JOURNAL OF DIFFERENTIAL EQUATIONS
  • Record number

    751059