Duffing equation
A second-order ordinary differential equation
$$x''+kx'+\omega_0^2x+\alpha x^3=F\cos\omega t,\tag{*}$$
where $k>0$, $\omega_0$, $\alpha$, $F$, $\omega$ are constants. This equation is an important example of a system with one degree of freedom with a non-linear restoring force $f(x)=-\omega_0^2x-\alpha x^3$ and damping, which executes forced oscillations under the effect of a harmonic external force $F(t)=F\cos\omega t$. If $\alpha>0$ one speaks of a rigid elastic force while if $\alpha<0$ one speaks of a soft force. G. Duffing [1] was the first to study the solutions of equation \ref{*}.
Solutions of Duffing's equation cannot be obtained in closed form. It has been proved that the equation has a large number of distinct periodic solutions. In equation \ref{*}, possible harmonic oscillations are $x=A\cos\omega t$ with an amplitude $A=A(\omega)$ which is a function of the frequency (an amplitude curve); to certain values of the frequency $\omega$ there may correspond several types of oscillations with different amplitudes. Under certain conditions Duffing's equation yields subharmonic oscillations with frequencies $\omega/n$, where $n$ is an integer. The solutions of equation \ref{*} are often studied by the method of the small parameter.
References
[1] | G. Duffing, "Erzwungene Schwingungen bei veränderlicher Eigenfrequenz und ihre technische Bedeutung" , Vieweg (1918) |
[2] | J.J. Stoker, "Nonlinear vibrations in mechanical and electrical systems" , Interscience (1950) |
[3] | C. Hayashi, "Nonlinear oscillations in physical systems" , McGraw-Hill (1964) |
Comments
References
[a1] | Ph. Holmes, "Non-linear oscillations, dynamical systems, and bifurcations of vector fields" , Springer (1983) |
Duffing equation. Encyclopedia of Mathematics. URL: http://encyclopediaofmath.org/index.php?title=Duffing_equation&oldid=12267