It is well known that the number of small amplitude limit cycles that can bifurcate from the origin of a weak focus or a non degenerated center for a family of planar polynomial vector fields is governed by the structure of the so called Lyapunov constants, that are polynomials in the parameters of the system. These constants are essentially the coefficients of the odd terms of the Taylor development at zero of the displacement map. Although many authors use that the coefficients of the even terms of this map belong to the ideal generated by the previous odd terms, we have not found a proof in the literature. In this paper we present a simple proof of this fact based on a general property of the composition of one-dimensional analytic rever...
AbstractWe construct a class of planar systems of arbitrary degree n having a reversible center at t...
In this paper, we study systems in the plane having a critical point with pure imaginary eigenvalues...
Abstract. It is a central theme to study the Lyapunov stability of periodic so-lutions of nonlinear ...
It is well known that the number of small amplitude limit cycles that can bifurcate from the origin ...
In this work we study the criticality of some planar systems of polynomial differential equations hav...
This note presents some advances regarding the Lyapunov constants of some families of planar polynom...
AbstractIn this paper we consider analytic vector fields X0 having a non-degenerate center point e. ...
We study planar polynomial differential equations with homogeneous components. This kind of equation...
Agraïments: The first author is supported by the NSF of China (No. 11201086, No.11401255) and the Ex...
We introduce a general reduction method for the study of periodic points near a fixed point in a fam...
We prove that there are one-parameter families of planar differential equations for which the cente...
We construct a class of planar systems of arbitrary degree n having a reversible center at the origi...
In 1991, Chicone and Jacobs showed the equivalence between the computation of the first-order Taylor...
AbstractThe generic isolated bifurcations for one-parameter families of smooth planar vector fields ...
AbstractIn this paper generalized Poincaré-Lyapunov constants Vi, i = 1, 2,…, are defined and an exp...
AbstractWe construct a class of planar systems of arbitrary degree n having a reversible center at t...
In this paper, we study systems in the plane having a critical point with pure imaginary eigenvalues...
Abstract. It is a central theme to study the Lyapunov stability of periodic so-lutions of nonlinear ...
It is well known that the number of small amplitude limit cycles that can bifurcate from the origin ...
In this work we study the criticality of some planar systems of polynomial differential equations hav...
This note presents some advances regarding the Lyapunov constants of some families of planar polynom...
AbstractIn this paper we consider analytic vector fields X0 having a non-degenerate center point e. ...
We study planar polynomial differential equations with homogeneous components. This kind of equation...
Agraïments: The first author is supported by the NSF of China (No. 11201086, No.11401255) and the Ex...
We introduce a general reduction method for the study of periodic points near a fixed point in a fam...
We prove that there are one-parameter families of planar differential equations for which the cente...
We construct a class of planar systems of arbitrary degree n having a reversible center at the origi...
In 1991, Chicone and Jacobs showed the equivalence between the computation of the first-order Taylor...
AbstractThe generic isolated bifurcations for one-parameter families of smooth planar vector fields ...
AbstractIn this paper generalized Poincaré-Lyapunov constants Vi, i = 1, 2,…, are defined and an exp...
AbstractWe construct a class of planar systems of arbitrary degree n having a reversible center at t...
In this paper, we study systems in the plane having a critical point with pure imaginary eigenvalues...
Abstract. It is a central theme to study the Lyapunov stability of periodic so-lutions of nonlinear ...
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