Bifurcations of limit cycles from Quintic Hamiltonian systems with a double figure eight loop

Bifurcations of limit cycles from infinity for a class of quintic polynomial system

Huang, W.
Liu, Y.

April 2004

AbstractIn this work, we use an indirect method to investigate bifurcations of limit cycles at infin...

The cyclicity of the elliptic segment loops of the reversible quadratic Hamiltonian systems under quadratic perturbations

Li, CZ
Roussarie, R

January 2004

Denote by Q(H) and Q(R) the Hamiltonian class and reversible class of quadratic integrable systems. ...

New configurations of 24 limit cycles in a quintic system

Wu, Yuhai
Han, Maoan

May 2008

AbstractThis paper concerns with the number and distributions of limit cycles in a Z3-equivariant qu...

Bifurcations of limit cycles from quintic Hamiltonian systems with a double figure eight loop☆☆The work was supported in part by Australia Research Counsil under the Discovery Projects scheme (grant ID: DP0559111).

Zang, Hong
Zhang, Tonghua
Han, Maoan

February 2006

AbstractThis paper deals with Liénard equations of the form x˙=y, y˙=P(x)+yQ(x,y), with P and Q poly...

Bifurcations of limit cycles for a quintic Hamiltonian system with a double cuspidal loop

Asheghi, Rasoul
Zangeneh, Hamid R.Z.

February 2010

AbstractIn this work we consider the number of limit cycles that can bifurcate from periodic orbits ...

Perturbation from an elliptic Hamiltonian of degree four—IV figure eight-loop

Dumortier, Freddy
Li, Chengzhi

March 2003

AbstractThe paper deals with Liénard equations of the form ẋ=y, ẏ=P(x)+yQ(x) with P and Q polynomi...

On the number of limit cycles in small perturbations of a class of hyper-elliptic Hamiltonian systems with one nilpotent saddle

Wang, Jihua
Xiao, Dongmei

February 2011

AbstractIn this paper, we make a complete study on small perturbations of Hamiltonian vector field w...

Perturbations from an Elliptic Hamiltonian of Degree Four I. Saddle Loop and Two Saddle Cycle

Dumortier, Freddy
Li, Chengzhi

October 2001

AbstractThe paper deals with Liénard equations of the form x=y, y=P(x)+yQ(x) with P and Q polynomial...

Perturbations from an elliptic Hamiltonian of degree four I. Saddle loop and two saddle cycle

Dumortier, F
Li, CZ

January 2001

The paper deals with Lienard equations of the form (x) over dot = y, (y) over dot = P(x) + yQ(x) wit...

BIFURCATION OF LIMIT CYCLES IN SMALL PERTURBATIONS OF A CLASS OF HYPER-ELLIPTIC HAMILTONIAN SYSTEMS OF DEGREE 5 WITH A CUSP

Ali Atabaigia
Hamid R. Z. Zangeneha

September 2016

Abstract This paper deals with small perturbations of a class of hyper-elliptic Hamiltonian system, ...

Perturbations from an Elliptic Hamiltonian of Degree Four II. Cuspidal Loop

Dumortier, Freddy
Li, Chengzhi

September 2001

AbstractThe paper deals with Liénard equations of the form x=y, y=P(x)+yQ(x) with P and Q polynomial...

Perturbation from an elliptic Hamiltonian of degree four - IV figure eight-loop

Dumortier, F
Li, CZ

January 2003

The paper deals with Lienard equations of the form <(x)over dot>= y, <(y) over dot>= P(x...

Bifurcations of limit cycles from Quintic Hamiltonian systems with a double figure eight loop

Hong, Zang
Tonghua, Zhang
Chen, Wencheng

August 2004

AbstractThis paper deals with Liénard equations of the form ẋ=y,ẏ=P(x)+yQ(x,y), with P and Q polyn...

Limit cycle bifurcations of some Liénard sytems

Yang, Yunmin
Han, Maoan
Romanovski, Valery

June 2012

In this paper we first give some general theorems on the limit cycle bifurcation for near-Hamiltonia...

Perturbation from an elliptic Hamiltonian of degree four—III global centre

Dumortier, Freddy
Li, Chengzhi

March 2003

AbstractThe paper deals with Liénard equations of the form ẋ=y, ẏ=P(x)+yQ(x) with P and Q polynomi...

Bifurcations of limit cycles from infinity for a class of quintic polynomial system

Huang, W.
Liu, Y.

April 2004

AbstractIn this work, we use an indirect method to investigate bifurcations of limit cycles at infin...

The cyclicity of the elliptic segment loops of the reversible quadratic Hamiltonian systems under quadratic perturbations

Li, CZ
Roussarie, R

January 2004

Denote by Q(H) and Q(R) the Hamiltonian class and reversible class of quadratic integrable systems. ...

New configurations of 24 limit cycles in a quintic system

Wu, Yuhai
Han, Maoan

May 2008

AbstractThis paper concerns with the number and distributions of limit cycles in a Z3-equivariant qu...

Bifurcations of limit cycles from quintic Hamiltonian systems with a double figure eight loop☆☆The work was supported in part by Australia Research Counsil under the Discovery Projects scheme (grant ID: DP0559111).

Zang, Hong
Zhang, Tonghua
Han, Maoan

February 2006

AbstractThis paper deals with Liénard equations of the form x˙=y, y˙=P(x)+yQ(x,y), with P and Q poly...

Bifurcations of limit cycles for a quintic Hamiltonian system with a double cuspidal loop

Asheghi, Rasoul
Zangeneh, Hamid R.Z.

February 2010

AbstractIn this work we consider the number of limit cycles that can bifurcate from periodic orbits ...

Perturbation from an elliptic Hamiltonian of degree four—IV figure eight-loop

Dumortier, Freddy
Li, Chengzhi

March 2003

AbstractThe paper deals with Liénard equations of the form ẋ=y, ẏ=P(x)+yQ(x) with P and Q polynomi...

On the number of limit cycles in small perturbations of a class of hyper-elliptic Hamiltonian systems with one nilpotent saddle

Wang, Jihua
Xiao, Dongmei

February 2011

AbstractIn this paper, we make a complete study on small perturbations of Hamiltonian vector field w...

Perturbations from an Elliptic Hamiltonian of Degree Four I. Saddle Loop and Two Saddle Cycle

Dumortier, Freddy
Li, Chengzhi

October 2001

AbstractThe paper deals with Liénard equations of the form x=y, y=P(x)+yQ(x) with P and Q polynomial...

Perturbations from an elliptic Hamiltonian of degree four I. Saddle loop and two saddle cycle

Dumortier, F
Li, CZ

January 2001

The paper deals with Lienard equations of the form (x) over dot = y, (y) over dot = P(x) + yQ(x) wit...

BIFURCATION OF LIMIT CYCLES IN SMALL PERTURBATIONS OF A CLASS OF HYPER-ELLIPTIC HAMILTONIAN SYSTEMS OF DEGREE 5 WITH A CUSP

Ali Atabaigia
Hamid R. Z. Zangeneha

September 2016

Abstract This paper deals with small perturbations of a class of hyper-elliptic Hamiltonian system, ...

Perturbations from an Elliptic Hamiltonian of Degree Four II. Cuspidal Loop

Dumortier, Freddy
Li, Chengzhi

September 2001

AbstractThe paper deals with Liénard equations of the form x=y, y=P(x)+yQ(x) with P and Q polynomial...

Perturbation from an elliptic Hamiltonian of degree four - IV figure eight-loop

Dumortier, F
Li, CZ

January 2003

The paper deals with Lienard equations of the form <(x)over dot>= y, <(y) over dot>= P(x...

Bifurcations of limit cycles from Quintic Hamiltonian systems with a double figure eight loop

Hong, Zang
Tonghua, Zhang
Chen, Wencheng

August 2004

AbstractThis paper deals with Liénard equations of the form ẋ=y,ẏ=P(x)+yQ(x,y), with P and Q polyn...

Limit cycle bifurcations of some Liénard sytems

Yang, Yunmin
Han, Maoan
Romanovski, Valery

June 2012

In this paper we first give some general theorems on the limit cycle bifurcation for near-Hamiltonia...

Perturbation from an elliptic Hamiltonian of degree four—III global centre

Dumortier, Freddy
Li, Chengzhi

March 2003

AbstractThe paper deals with Liénard equations of the form ẋ=y, ẏ=P(x)+yQ(x) with P and Q polynomi...

Bifurcations of limit cycles from infinity for a class of quintic polynomial system

Huang, W.
Liu, Y.

April 2004

AbstractIn this work, we use an indirect method to investigate bifurcations of limit cycles at infin...

The cyclicity of the elliptic segment loops of the reversible quadratic Hamiltonian systems under quadratic perturbations

Li, CZ
Roussarie, R

January 2004

Denote by Q(H) and Q(R) the Hamiltonian class and reversible class of quadratic integrable systems. ...

New configurations of 24 limit cycles in a quintic system

Wu, Yuhai
Han, Maoan

May 2008

AbstractThis paper concerns with the number and distributions of limit cycles in a Z3-equivariant qu...

Bifurcations of limit cycles from Quintic Hamiltonian systems with a double figure eight loop

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Bifurcations of limit cycles from Quintic Hamiltonian systems with a double figure eight loop

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