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
Link To Document