Existence of periodic solutions and homoclinic orbits forthird‐order nonlinear differential equations

Abstract: The existence of periodic solutions for the third-order differential equation x¨˙+ω2x˙=μF(x,x˙,x¨) is studied. We give some conditions for this equation in order to reduce it to a second-order nonlinear differential equation. We show that the existence of periodic solutions for the second-order equation implies the existence of periodic solutions for the above equation. Then we use the Hopf bifurcation theorem for the second-order equation and obtain many periodic solutions for it. Also we… Show more

“…Hence, there exists 0 <δ < δ(µ) such that R(δ, µ) = 0 and (∂R/∂δ)(δ, µ) = 0. The stability parameter of Hopf the bifurcation is [6,11] …”

Existence of turbulent behavior for non-chaotic two dimensional jets

“…Hence, there exists 0 <δ < δ(µ) such that R(δ, µ) = 0 and (∂R/∂δ)(δ, µ) = 0. The stability parameter of Hopf the bifurcation is [6,11] …”

Existence of turbulent behavior for non-chaotic two dimensional jets

Continuation of Periodic Orbits of a Third Order Oscillator under Autonomous Perturbation

Effect of All Quadratic Terms on Third Order Oscillation