This paper is devoted to prove two unexpected properties of the Abel equation dz/dt = z 3 +B(t)z 2 +C(t)z, where B and C are smooth, 2π−periodic complex valuated functions, t ∈ R and z ∈ C. 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 ...
AbstractWe give a few sufficient conditions for the existence of periodic solutions of the equation ...
AbstractAbel equations of the form r′=a(t)r2+b(t)r3,t∈[t0,t1], are of interest because of their clos...
This paper deals with the problem of finding upper bounds on the number of periodic solutions of a c...
AbstractThis paper is devoted to prove two unexpected properties of the Abel equation dz/dt=z3+B(t)z...
This paper is devoted to prove two unexpected properties of the Abel equation dz/dt = z 3 +B(t)z 2 +...
AbstractWe consider the Abel equation x˙=A(t)x3+B(t)x2, where A(t) and B(t) are trigonometric polyno...
AbstractFor a class of polynomial non-autonomous differential equations of degree n, we use phase pl...
AbstractA solution of the Abel equation x˙=A(t)x3+B(t)x2 such that x(0)=x(1) is called a periodic or...
17 pages; no figuresInternational audienceA solution of the Abel equation $\dot{x}=A(t)x^3+B(t)x^2$ ...
Given p, q ∊ Z ≥ 2 with p ≠ q, we study generalized Abel differential equations (Equation presented)...
We study the number of limit cycles of T -periodic Chini equations and some generalized Abel equatio...
AbstractIn this paper, we investigate the differential equation x˙=S(x,t)=A(t)xm+B(t)xn+C(t)xl, wher...
Agraïments: J.L.B. and M.F. were partially supported by grant FEDER(UE) MTM2008-05460.We study the p...
This paper devotes to the study of the classical Abel equation $\frac{dx}{dt}=g(t)x^{3}+f(t)x^{2}$, ...
Abstract. We give a full description of the dynamics of the Abel equation z ̇ = z3 + f(t) for some ...
AbstractWe give a few sufficient conditions for the existence of periodic solutions of the equation ...
AbstractAbel equations of the form r′=a(t)r2+b(t)r3,t∈[t0,t1], are of interest because of their clos...
This paper deals with the problem of finding upper bounds on the number of periodic solutions of a c...
AbstractThis paper is devoted to prove two unexpected properties of the Abel equation dz/dt=z3+B(t)z...
This paper is devoted to prove two unexpected properties of the Abel equation dz/dt = z 3 +B(t)z 2 +...
AbstractWe consider the Abel equation x˙=A(t)x3+B(t)x2, where A(t) and B(t) are trigonometric polyno...
AbstractFor a class of polynomial non-autonomous differential equations of degree n, we use phase pl...
AbstractA solution of the Abel equation x˙=A(t)x3+B(t)x2 such that x(0)=x(1) is called a periodic or...
17 pages; no figuresInternational audienceA solution of the Abel equation $\dot{x}=A(t)x^3+B(t)x^2$ ...
Given p, q ∊ Z ≥ 2 with p ≠ q, we study generalized Abel differential equations (Equation presented)...
We study the number of limit cycles of T -periodic Chini equations and some generalized Abel equatio...
AbstractIn this paper, we investigate the differential equation x˙=S(x,t)=A(t)xm+B(t)xn+C(t)xl, wher...
Agraïments: J.L.B. and M.F. were partially supported by grant FEDER(UE) MTM2008-05460.We study the p...
This paper devotes to the study of the classical Abel equation $\frac{dx}{dt}=g(t)x^{3}+f(t)x^{2}$, ...
Abstract. We give a full description of the dynamics of the Abel equation z ̇ = z3 + f(t) for some ...
AbstractWe give a few sufficient conditions for the existence of periodic solutions of the equation ...
AbstractAbel equations of the form r′=a(t)r2+b(t)r3,t∈[t0,t1], are of interest because of their clos...
This paper deals with the problem of finding upper bounds on the number of periodic solutions of a c...