- #1
DannyJ108
- 25
- 2
- Homework Statement
- The Lorentz model to calculate the refraction index of a dielectric, in the simplest of terms states the following equation: (see relevant equations)
- Relevant Equations
- ##n^2(\omega) = 1 + \frac {\omega^2_p} {\omega^2_0 - \omega^2}##
Hello fellow users,
I've been given the Lorentz model to calculate the refraction index of a dielectric, the formula in its simplest way states that:
##n^2(\omega) = 1 + \frac {\omega^2_p} {\omega^2_0 - \omega^2}##
Where ##\omega_p## is the plasma frequency and ##\omega_0## is the resonance frequency.
If ##\omega > \omega_0## the refraction index ##n## can be smaller than 1 and experimental results verify this. How does this result reconcile with the fact that "nothing can travel faster than light in a vacuum"?
I need to make a bibliographical search and give an explanation for this, but I can't find an exact answer to this question or the same formula I'm given.
I need your help please! Thank you in advance!
I've been given the Lorentz model to calculate the refraction index of a dielectric, the formula in its simplest way states that:
##n^2(\omega) = 1 + \frac {\omega^2_p} {\omega^2_0 - \omega^2}##
Where ##\omega_p## is the plasma frequency and ##\omega_0## is the resonance frequency.
If ##\omega > \omega_0## the refraction index ##n## can be smaller than 1 and experimental results verify this. How does this result reconcile with the fact that "nothing can travel faster than light in a vacuum"?
I need to make a bibliographical search and give an explanation for this, but I can't find an exact answer to this question or the same formula I'm given.
I need your help please! Thank you in advance!