Given p, q ∊ Z ≥ 2 with p ≠ q, we study generalized Abel differential equations (Equation presented), where A and B are trigonometric polynomials of degrees n, m ≥ 1, respectively, and we are interested in the number of limit cycles (i.e., isolated periodic orbits) that they can have. More concretely, in this context, an open problem is to prove the existence of an integer, depending only on p, q, m, and n and that we denote by H p,q(n, m), such that the above differential equation has at most H p,q(n, m) limit cycles. In the present paper, by means of a second order analysis using Melnikov functions, we provide lower bounds of H p,q(n, m) that, to the best of our knowledge, are larger than the previous ones appearing in the literature. In ...
Agraïments: The second author has been partially supported by FCT through CAMGSD.We study the number...
It is know that the non-autonomous differential equations dx/dt = a(t) + b(t)|x|, where a(t) and b(t...
We study the number of rational limit cycles of the Abel equation $x'=A(t)x^3+B(t)x^2$, where $A(t)$...
Given p, q ∊ Z ≥ 2 with p ≠ q, we study generalized Abel differential equations (Equation presented)...
AbstractWe consider the Abel equation x˙=A(t)x3+B(t)x2, where A(t) and B(t) are trigonometric polyno...
This paper devotes to the study of the classical Abel equation $\frac{dx}{dt}=g(t)x^{3}+f(t)x^{2}$, ...
Agraïments: M.J.A. was partially supported by grants MTM2005-06098-C02-1. J.L.B. and M.F. were parti...
summary:New results are proved on the maximum number of isolated $T$-periodic solutions (limit cycle...
This paper deals with the problem of finding upper bounds on the number of periodic solutions of a c...
Agraïments: J.L.B. and M.F. were partially supported by grant FEDER(UE) MTM2008-05460.We study the p...
Agraïments: FEDER-Junta Extremadura grant number GR10060We obtain a criterion for determining the st...
Agraïments/Ajudes: The first author is partially supported by by grants MTM2005-06098-C02-1. The sec...
This paper is devoted to prove two unexpected properties of the Abel equation dz/dt = z 3 +B(t)z 2 +...
Agraïments: The second author is supported by the project J3452 "Dynamical Systems Methods in Hydrod...
AbstractThis paper is devoted to prove two unexpected properties of the Abel equation dz/dt=z3+B(t)z...
Agraïments: The second author has been partially supported by FCT through CAMGSD.We study the number...
It is know that the non-autonomous differential equations dx/dt = a(t) + b(t)|x|, where a(t) and b(t...
We study the number of rational limit cycles of the Abel equation $x'=A(t)x^3+B(t)x^2$, where $A(t)$...
Given p, q ∊ Z ≥ 2 with p ≠ q, we study generalized Abel differential equations (Equation presented)...
AbstractWe consider the Abel equation x˙=A(t)x3+B(t)x2, where A(t) and B(t) are trigonometric polyno...
This paper devotes to the study of the classical Abel equation $\frac{dx}{dt}=g(t)x^{3}+f(t)x^{2}$, ...
Agraïments: M.J.A. was partially supported by grants MTM2005-06098-C02-1. J.L.B. and M.F. were parti...
summary:New results are proved on the maximum number of isolated $T$-periodic solutions (limit cycle...
This paper deals with the problem of finding upper bounds on the number of periodic solutions of a c...
Agraïments: J.L.B. and M.F. were partially supported by grant FEDER(UE) MTM2008-05460.We study the p...
Agraïments: FEDER-Junta Extremadura grant number GR10060We obtain a criterion for determining the st...
Agraïments/Ajudes: The first author is partially supported by by grants MTM2005-06098-C02-1. The sec...
This paper is devoted to prove two unexpected properties of the Abel equation dz/dt = z 3 +B(t)z 2 +...
Agraïments: The second author is supported by the project J3452 "Dynamical Systems Methods in Hydrod...
AbstractThis paper is devoted to prove two unexpected properties of the Abel equation dz/dt=z3+B(t)z...
Agraïments: The second author has been partially supported by FCT through CAMGSD.We study the number...
It is know that the non-autonomous differential equations dx/dt = a(t) + b(t)|x|, where a(t) and b(t...
We study the number of rational limit cycles of the Abel equation $x'=A(t)x^3+B(t)x^2$, where $A(t)$...