We continue the recent investigation [40] about the qualitative properties of the solutions for a class of generalized Liénard systems of the form ẋ = y − F (x, y), ẏ = −g(x). We present some results on the existence/non-existence of limit cycles depending on different growth assumptions of F (·, y). The case of asymmetric conditions at infinity for g(x) and F (x, ·) is also examined. In the second part of the article we consider also a bifurcation result for small limit cycles as well as we discuss the complex dynamics associated to a periodically perturbed reversible system
AbstractWe consider the Liénard equation and we give a sufficient condition to ensure existence and ...
We consider a family of planar vector fields that writes as a Liénard system in suitable coordinates...
The problem of the uniqueness of limit cycles for Liénard systems is investigated in connection with...
We continue the recent investigation [40] about the qualitative properties of the solutions for a cl...
We continue the recent investigation [40] about the qualitative properties of the solutions for a cl...
We study the problem of existence/nonexistence of limit cycles for a class of Lienard generalized di...
AbstractThe generalized Liénard equations of the form: ẋ = h(y) − F(x), ẏ = −g(x) where F, g, and ...
In this paper, we first present a survey of the known results on limit cycles and center conditions ...
International audienceWe provide several new criteria for the non-existence and the existence of lim...
AbstractIn this paper, we consider a generalized Liénard systemdxdt=ϕ(y)−F(x),(0.1)dydt=−g(x), where...
Abstract5proposed a theorem to guarantee the uniqueness of limit cycles for the generalized Liénard ...
A recent theory developed by Wang (2004) for the solution of the second part of Hilbert’s 16th probl...
We study analytically the existence of periodic solutions of the generalized Liénard differential eq...
We consider a class of discontinuous Liénard systems and study the number of limit cycles bifurcated...
Liénard systems and their generalized forms are classical and important models of nonlinear oscillat...
AbstractWe consider the Liénard equation and we give a sufficient condition to ensure existence and ...
We consider a family of planar vector fields that writes as a Liénard system in suitable coordinates...
The problem of the uniqueness of limit cycles for Liénard systems is investigated in connection with...
We continue the recent investigation [40] about the qualitative properties of the solutions for a cl...
We continue the recent investigation [40] about the qualitative properties of the solutions for a cl...
We study the problem of existence/nonexistence of limit cycles for a class of Lienard generalized di...
AbstractThe generalized Liénard equations of the form: ẋ = h(y) − F(x), ẏ = −g(x) where F, g, and ...
In this paper, we first present a survey of the known results on limit cycles and center conditions ...
International audienceWe provide several new criteria for the non-existence and the existence of lim...
AbstractIn this paper, we consider a generalized Liénard systemdxdt=ϕ(y)−F(x),(0.1)dydt=−g(x), where...
Abstract5proposed a theorem to guarantee the uniqueness of limit cycles for the generalized Liénard ...
A recent theory developed by Wang (2004) for the solution of the second part of Hilbert’s 16th probl...
We study analytically the existence of periodic solutions of the generalized Liénard differential eq...
We consider a class of discontinuous Liénard systems and study the number of limit cycles bifurcated...
Liénard systems and their generalized forms are classical and important models of nonlinear oscillat...
AbstractWe consider the Liénard equation and we give a sufficient condition to ensure existence and ...
We consider a family of planar vector fields that writes as a Liénard system in suitable coordinates...
The problem of the uniqueness of limit cycles for Liénard systems is investigated in connection with...