AbstractFor Liénard systems x˙=y, y˙=−fm(x)y−gn(x) with fm and gn real polynomials of degree m and n respectively, in [H. Zoladek, Algebraic invariant curves for the Liénard equation, Trans. Amer. Math. Soc. 350 (1998) 1681–1701] the author showed that if m⩾3 and m+1<n<2m there always exist Liénard systems which have a hyperelliptic limit cycle. Llibre and Zhang [J. Llibre, Xiang Zhang, On the algebraic limit cycles of Liénard systems, Nonlinearity 21 (2008) 2011–2022] proved that the Liénard systems with m=3 and n=5 have no hyperelliptic limit cycles and that there exist Liénard systems with m=4 and 5<n<8 which do have hyperelliptic limit cycles. So, it is still an open problem to characterize the Liénard systems which have an algebraic li...
We provide lower bounds for the maximum number of limit cycles for the m-piecewise discontinuous pol...
Using the averaging theory of first and second order we study the maximum number of limit cycles of ...
We consider a family of planar vector fields that writes as a Liénard system in suitable coordinates...
AbstractFor Liénard systems x˙=y, y˙=−fm(x)y−gn(x) with fm and gn real polynomials of degree m and n...
AbstractIn this paper we study the limit cycles of the Liénard differential system of the form x¨+f(...
In this paper we study hyperelliptic limit cycles of the Lienard systems x = y, y = - f(m)(x) y -...
Agraïments: The second author has been supported by the grant AGAUR PIV-DGR-2010 and by FCT through ...
AbstractIn this note we give a family of planar polynomial differential systems with a prescribed hy...
Agraïments: The second author has been partially supported by FCT through CAMGSD.We study the number...
AbstractThe generalized Liénard equations of the form: ẋ = h(y) − F(x), ẏ = −g(x) where F, g, and ...
Agraïments: This work is partially supported by grant CONACYT-58968.Applying the averaging theory of...
In 1977 Lins Neto et al. (1977) conjectured that the classical Liénard system ẋ=y−F(x),ẏ=−x with F(x...
Agraïments: The first author is supported by NSFC-10831003 and by CICYT grant number 2009PIV00064.We...
We prove that the generalized Liénard polynomial differential system x'=y^2p-1, y'=-x^2q-1 - f(x) y^...
summary:We consider limit cycles of a class of polynomial differential systems of the form $$ \begin...
We provide lower bounds for the maximum number of limit cycles for the m-piecewise discontinuous pol...
Using the averaging theory of first and second order we study the maximum number of limit cycles of ...
We consider a family of planar vector fields that writes as a Liénard system in suitable coordinates...
AbstractFor Liénard systems x˙=y, y˙=−fm(x)y−gn(x) with fm and gn real polynomials of degree m and n...
AbstractIn this paper we study the limit cycles of the Liénard differential system of the form x¨+f(...
In this paper we study hyperelliptic limit cycles of the Lienard systems x = y, y = - f(m)(x) y -...
Agraïments: The second author has been supported by the grant AGAUR PIV-DGR-2010 and by FCT through ...
AbstractIn this note we give a family of planar polynomial differential systems with a prescribed hy...
Agraïments: The second author has been partially supported by FCT through CAMGSD.We study the number...
AbstractThe generalized Liénard equations of the form: ẋ = h(y) − F(x), ẏ = −g(x) where F, g, and ...
Agraïments: This work is partially supported by grant CONACYT-58968.Applying the averaging theory of...
In 1977 Lins Neto et al. (1977) conjectured that the classical Liénard system ẋ=y−F(x),ẏ=−x with F(x...
Agraïments: The first author is supported by NSFC-10831003 and by CICYT grant number 2009PIV00064.We...
We prove that the generalized Liénard polynomial differential system x'=y^2p-1, y'=-x^2q-1 - f(x) y^...
summary:We consider limit cycles of a class of polynomial differential systems of the form $$ \begin...
We provide lower bounds for the maximum number of limit cycles for the m-piecewise discontinuous pol...
Using the averaging theory of first and second order we study the maximum number of limit cycles of ...
We consider a family of planar vector fields that writes as a Liénard system in suitable coordinates...