Cubic NLW/NLKG

The cubic nonlinear wave and Klein-Gordon equations have been studied on R, on R^2, and on R^3.

This kind of equation displays a class of solutions with a peculiar dispersion law. To show explicitly this, let us consider the massless equation

${\displaystyle \Box \phi +\lambda \phi ^{3}=0}$

being ${\displaystyle \lambda >0}$. An exact solution of this equation is given by

${\displaystyle \phi (x)=\mu \left({\frac {2}{\lambda }}\right)^{1 \over 4}{\rm {sn}}(p\cdot x+\theta ,i),}$

being sn a Jacobi elliptic function and ${\displaystyle \mu ,\theta }$ two integration constants, when

${\displaystyle p^{2}=\mu ^{2}\left({\frac {\lambda }{2}}\right)^{1 \over 2}.}$

We see that we started with an equation without a mass term but the exact solution describes a wave with a dispersion relation proper to a massive solution. This can be seen as the superposition of an infinite number of massive linear waves through a Fourier series of the Jacobi function, that is

${\displaystyle \phi (t,0)=\sum _{n=0}^{\infty }(-1)^{n}{\frac {2\pi }{K(i)}}{\frac {e^{\left(n+{1 \over 2}\right)\pi }}{1+e^{-(2n+1)\pi }}}\sin \left((2n+1){\frac {\pi }{2K(i)}}\left({\frac {\lambda }{2}}\right)^{1 \over 4}\mu t\right)}$

being ${\displaystyle K(i)}$ an elliptic integral. We recognize the spectrum

${\displaystyle m_{n}=(2n+1){\frac {\pi }{2K(i)}}\left({\frac {\lambda }{2}}\right)^{1 \over 4}\mu .}$

Via the mapping theorem FraE2007 this is also an exact solution of Yang-Mills equations with the substitution ${\displaystyle \lambda \rightarrow Ng^{2}}$ for a SU(N) Lie group.