I am studying torsional Alfven waves in spicules. In this concern I have encountered the following equation:
$ \left(1-m^2 e^{-αz}\right)y''(z)+\left(4π i m e^{-αz}-1/h\right)y'(z)+\left(\frac{1}{4h^2} +4π^2 ω^2 e^{-αz}\right)y(z)=0 $
where $i=\sqrt{-1}$. The boundary conditions are: $y(0)=0$, $y(1)=0$, and the constants are: $h=0.23, α=1.84, m=0.25$. We need to find $ω_1$ and $ω_2$ and $y_1$ and $y_2$ i.e. fundamental and first harmonic eigenvalue and eigenfunction. If you want to guess the initial value of $ω$, you can set it $ω=1$.
