In this paper we study the non-existence and the uniqueness of limit cycles for the Liénard differential equation of the form x'' − f(x)x' + g(x) = 0 where the functions f and g satisfy xf(x) > 0 and xg(x) > 0 for x ≠ 0 but can be discontinuous at x = 0. In particular, our results allow us to prove the non-existence of limit cycles under suitable assumptions, and also prove the existence and uniqueness of a limit cycle in a class of discontinuous Liénard systems which are relevant in engineering applications
AbstractIn monographs [Theory of Limit Cycles, 1984] and [Qualitative Theory of Differential Equatio...
We provide lower bounds for the maximum number of limit cycles for the m-piecewise discontinuous pol...
Agraïments/Ajudes: The second author is partially supported by a FAPESP-BRAZIL grant 2012/20884-8. B...
In this paper, we investigate the existence and uniqueness of crossing limit cycle for a planar nonl...
AbstractWe consider the Liénard equation and we give a sufficient condition to ensure existence and ...
The problem of uniqueness of limit cycles for the Li\ue9nard equation \u1e8d+f(x)\u1e8b+g(x)=0 is in...
We study the problem of existence/nonexistence of limit cycles for a class of Lienard generalized di...
We give an account of the results about limit cycle’s uniqueness for Liénard equations, starting fro...
The problem of the uniqueness of limit cycles for Liénard systems is investigated in connection with...
AbstractIn this paper we study the limit cycles of the Liénard differential system of the form x¨+f(...
AbstractWe shall give two criteria for the uniqueness of limit cycles of systems of Liénard type ẋ ...
Abstract. In this paper, we investigate the uniqueness and stability of limit cycles for a nonlinear...
In this paper we consider discontinuous piecewise linear differential systems whose discontinuity se...
AbstractIn this paper, we consider a generalized Liénard systemdxdt=ϕ(y)−F(x),(0.1)dydt=−g(x), where...
We study the number of limit cycles which can bifurcate from the periodic orbits of a linear center ...
AbstractIn monographs [Theory of Limit Cycles, 1984] and [Qualitative Theory of Differential Equatio...
We provide lower bounds for the maximum number of limit cycles for the m-piecewise discontinuous pol...
Agraïments/Ajudes: The second author is partially supported by a FAPESP-BRAZIL grant 2012/20884-8. B...
In this paper, we investigate the existence and uniqueness of crossing limit cycle for a planar nonl...
AbstractWe consider the Liénard equation and we give a sufficient condition to ensure existence and ...
The problem of uniqueness of limit cycles for the Li\ue9nard equation \u1e8d+f(x)\u1e8b+g(x)=0 is in...
We study the problem of existence/nonexistence of limit cycles for a class of Lienard generalized di...
We give an account of the results about limit cycle’s uniqueness for Liénard equations, starting fro...
The problem of the uniqueness of limit cycles for Liénard systems is investigated in connection with...
AbstractIn this paper we study the limit cycles of the Liénard differential system of the form x¨+f(...
AbstractWe shall give two criteria for the uniqueness of limit cycles of systems of Liénard type ẋ ...
Abstract. In this paper, we investigate the uniqueness and stability of limit cycles for a nonlinear...
In this paper we consider discontinuous piecewise linear differential systems whose discontinuity se...
AbstractIn this paper, we consider a generalized Liénard systemdxdt=ϕ(y)−F(x),(0.1)dydt=−g(x), where...
We study the number of limit cycles which can bifurcate from the periodic orbits of a linear center ...
AbstractIn monographs [Theory of Limit Cycles, 1984] and [Qualitative Theory of Differential Equatio...
We provide lower bounds for the maximum number of limit cycles for the m-piecewise discontinuous pol...
Agraïments/Ajudes: The second author is partially supported by a FAPESP-BRAZIL grant 2012/20884-8. B...