This paper deals with Liénard equations of the form x ̇ =y, y ̇ =P(x)+yQ(x,y) , with P and Q polynomial of degree 5 and 4, respectively.

This paper deals with Liénard equations of the form x ˙ = y , y ˙ = P ( x ) + y Q ( x , y ) , with P and Q polynomials of degree 5 and 4 respectively.

Semantic Scholar extracted view of "Bifurcations of limit cycles from Quintic Hamiltonian systems with a double figure eight loop" by Hong Zang et al.

This paper deals with Liénard equations of the form x˙=y, y˙=P(x)+yQ(x,y), with P and Q polynomials of degree 5 and 4 respectively.

In this paper, we study the number of bifurcated limit cycles from some polynomial systems with a double homoclinic loop passing through a nilpotent saddle ...

This paper deals with Liénard equations of the form x˙ = y,y˙ = P(x) + yQ(x,y), with P and Q polynomial of degree 5 and 4, respectively.

Request PDF | BIFURCATIONS OF LIMIT CYCLES FROM A QUINTIC HAMILTONIAN SYSTEM WITH A FIGURE DOUBLE-FISH | In this paper, we consider Liénard systems of the ...

Apr 30, 2007 · Bifurcations of limit cycles from quintic Hamiltonian systems with a double figure eight loop (Q5898796). From MaRDI portal.

This paper studies the Poincaré bifurcation of a nonlinear oscillator of generalized Liénard type by using the Melnikov function and gives a rigorous proof ...

This paper is concerned with the distribution and number of limit cycles for a cubic Hamiltonian system under cubic perturbation. The fact that there exist ...