scipy.special.ellip_harm_2#

scipy.special.ellip_harm_2(h2, k2, n, p, s)[source]#

Ellipsoidal harmonic functions F^p_n(l)

These are also known as Lame functions of the second kind, and are solutions to the Lame equation:

\[(s^2 - h^2)(s^2 - k^2)F''(s) + s(2s^2 - h^2 - k^2)F'(s) + (a - q s^2)F(s) = 0\]

where \(q = (n+1)n\) and \(a\) is the eigenvalue (not returned) corresponding to the solutions.

Parameters:
h2float

h**2

k2float

k**2; should be larger than h**2

nint

Degree.

pint

Order, can range between [1,2n+1].

sfloat

Coordinate

Returns:
Ffloat

The harmonic \(F^p_n(s)\)

Notes

Lame functions of the second kind are related to the functions of the first kind:

\[F^p_n(s)=(2n + 1)E^p_n(s)\int_{0}^{1/s} \frac{du}{(E^p_n(1/u))^2\sqrt{(1-u^2k^2)(1-u^2h^2)}}\]

Added in version 0.15.0.

Examples

>>> from scipy.special import ellip_harm_2
>>> w = ellip_harm_2(5,8,2,1,10)
>>> w
0.00108056853382