Free wave equation: Difference between revisions

The free wave equation on ${\displaystyle {\mathbb {R} }^{1+d}}$ is given by

${\displaystyle \Box f=0}$

where f is a scalar or vector field on Minkowski space ${\displaystyle {\mathbb {R} }^{1+d}}$. In coordinates, this becomes

${\displaystyle -\partial _{tt}f+\Delta f=0.}$

It is the prototype for many nonlinear wave equations.

One can add a mass term to create the Klein-Gordon equation.

Exact solutions

Being this a linear equation one can always write down a solution using Fourier series or transform. These solutions represent superpositions of traveling waves.

Solution in ${\displaystyle {\mathbb {R} }^{1+1}}$

In this case one can write down the solution as

${\displaystyle \,f(x,t)=g_{1}(x-t)+g_{2}(x+t)\!}$

being ${\displaystyle g_{1},\ g_{2}}$ two arbitrary functions. This gives a complete solution to the Cauchy problem that can be cast as follows

${\displaystyle \,f=f_{0}(x)\ \partial _{t}f=f_{1}(x)\!}$

for ${\displaystyle \,t=0\!}$, so that

${\displaystyle f(x,t)={\frac {1}{2}}[f_{0}(x+t)+f_{0}(x-t)]+{\frac {1}{2}}[F_{1}(x+t)+F_{1}(x-t)]}$

being ${\displaystyle \,F_{1}\!}$ an arbitrarily chosen primitive of ${\displaystyle \,f_{1}\!}$.