Waves/Group Velocity

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We now ask the following question: How fast do wave packets move? Surprisingly, we often find that wave packets move at a speed very different from the phase speed, ${\displaystyle c=\omega /k}$, of the wave composing the wave packet.

We shall find that the speed of motion of wave packets, referred to as the group velocity, is given by

${\displaystyle u={\frac{d\omega }{dk}|}_{k=k_0}\text{(group velocity)}.}$ (2.36)

The derivative of ${\displaystyle \omega (k)}$ with respect to ${\displaystyle k}$ is first computed and then evaluated at ${\displaystyle k=k_0}$, the central wavenumber of the wave packet of interest.

The relationship between the angular frequency and the wavenumber for a wave, ${\displaystyle \omega =\omega (k)}$, depends on the type of wave being considered. Whatever this relationship turns out to be in a particular case, it is called the dispersion relation for the type of wave in question.

As an example of a group velocity calculation, suppose we want to find the velocity of deep ocean wave packets for a central wavelength of ${\displaystyle {\lambda }_0=60\text{ m}}$. This corresponds to a central wavenumber of ${\displaystyle k_0=2\pi /{\lambda }_0\approx 0.1{\text{ m}}^{-1}}$. The phase speed of deep ocean waves is ${\displaystyle c=(g/k{)}^{1/2}}$. However, since ${\displaystyle c\equiv \omega /k}$, we find the frequency of deep ocean waves to be ${\displaystyle \omega =(gk{)}^{1/2}}$. The group velocity is therefore ${\displaystyle u\equiv d\omega /dk=(g/k{)}^{1/2}/2=c/2}$. For the specified central wavenumber, we find that ${\displaystyle u\approx (9.8\text{ m}{\text{ s}}^{-2}/0.1{\text{ m}}^{-1}{)}^{1/2}/2\approx 5\text{ m}{\text{ s}}^{-1}}$. By contrast, the phase speed of deep ocean waves with this wavelength is ${\displaystyle c\approx 10\text{ m}{\text{ s}}^{-1}}$.

Dispersive waves are waves in which the phase speed varies with wavenumber. It is easy to show that dispersive waves have unequal phase and group velocities, while these velocities are equal for non-dispersive waves.

We now derive equation (1.36). It is easiest to do this for the simplest wave packets, namely those constructed out of the superposition of just two sine waves. We will proceed by adding two waves with full space and time dependence:

${\displaystyle A=\sin (k_{1}x-{\omega }_{1}t)+\sin (k_{2}x-{\omega }_{2}t)}$ (2.37)

After algebraic and trigonometric manipulations familiar from earlier sections, we find

${\displaystyle A=2\sin (k_{0}x-{\omega }_{0}t)\cos (\mathrm{\Delta }kx-\mathrm{\Delta }\omega t),}$ (2.38)

where as before we have ${\displaystyle k_0=(k_1+k_2)/2}$, ${\displaystyle {\omega }_0=({\omega }_1+{\omega }_2)/2}$, ${\displaystyle \mathrm{\Delta }k=(k_2-k_1)/2}$, and ${\displaystyle \mathrm{\Delta }\omega =({\omega }_2-{\omega }_1)/2}$. Again think of this as a sine wave of frequency ${\displaystyle {\omega }_0}$ and wavenumber ${\displaystyle k_0}$ modulated by a cosine function. In this case the modulation pattern moves with a speed so as to keep the argument of the cosine function constant:

${\displaystyle \mathrm{\Delta }kx-\mathrm{\Delta }\omega t=const.}$ (2.39)

Differentiating this with respect to ${\displaystyle t}$ while holding ${\displaystyle \mathrm{\Delta }k}$ and ${\displaystyle \mathrm{\Delta }\omega }$ constant yields

${\displaystyle u\equiv \frac{dx}{dt}=\frac{\mathrm{\Delta }\omega }{\mathrm{\Delta }k}.}$ (2.40)

In the limit in which the deltas become very small, this reduces to the derivative

${\displaystyle u=\frac{d\omega }{dk},}$ (2.41)

which is the desired result.

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