TY - JOUR
T1 - Limit cycles for generalized Abel equations
AU - Gasull, Armengol
AU - Guillamon, Antoni
PY - 2006/1/1
Y1 - 2006/1/1
N2 - This paper deals with the problem of finding upper bounds on the number of periodic solutions of a class of one-dimensional nonautonomous differential equations: those with the right-hand sides being polynomials of degree n and whose coefficients are real smooth one-periodic functions. The case n = 3 gives the so-called Abel equations which have been thoroughly studied and are well understood. We consider two natural generalizations of Abel equations. Our results extend previous works of Lins Neto and Panov and try to step forward in the understanding of the case n > 3. They can be applied, as well, to control the number of limit cycles of some planar ordinary differential equations. © World Scientific Publishing Company.
AB - This paper deals with the problem of finding upper bounds on the number of periodic solutions of a class of one-dimensional nonautonomous differential equations: those with the right-hand sides being polynomials of degree n and whose coefficients are real smooth one-periodic functions. The case n = 3 gives the so-called Abel equations which have been thoroughly studied and are well understood. We consider two natural generalizations of Abel equations. Our results extend previous works of Lins Neto and Panov and try to step forward in the understanding of the case n > 3. They can be applied, as well, to control the number of limit cycles of some planar ordinary differential equations. © World Scientific Publishing Company.
KW - Abel equation
KW - Limit cycles
KW - Planar differential equations
UR - https://www.scopus.com/pages/publications/33847291335
U2 - 10.1142/S0218127406017130
DO - 10.1142/S0218127406017130
M3 - Article
SN - 0218-1274
VL - 16
SP - 3737
EP - 3745
JO - International Journal of Bifurcation and Chaos in Applied Sciences and Engineering
JF - International Journal of Bifurcation and Chaos in Applied Sciences and Engineering
ER -