I'm trying to plot the streamlines of a magnetic field around a sphere using matplotlib, and it does work quite nicely. However, the resulting image is not symmetric, but it should be (I think).

This is the code used to generate the image. Excuse the length, but I thought it would be better than just posting a non-working snippet. Also, it's not very pythonic; that's because I converted it from Matlab, which was easier than I expected.

```
from __future__ import division
import numpy as np
import matplotlib.pyplot as plt
from matplotlib.patches import Circle
def cart2spherical(x, y, z):
r = np.sqrt(x**2 + y**2 + z**2)
phi = np.arctan2(y, x)
theta = np.arccos(z/r)
if r == 0:
theta = 0
return (r, theta, phi)
def S(theta, phi):
S = np.array([[np.sin(theta)*np.cos(phi), np.cos(theta)*np.cos(phi), -np.sin(phi)],
[np.sin(theta)*np.sin(phi), np.cos(theta)*np.sin(phi), np.cos(phi)],
[np.cos(theta), -np.sin(theta), 0]])
return S
def computeB(r, theta, phi, a=1, muR=100, B0=1):
delta = (muR - 1)/(muR + 2)
if r > a:
Bspherical = B0*np.array([np.cos(theta) * (1 + 2*delta*a**3 / r**3),
np.sin(theta) * (delta*a**3 / r**3 - 1),
0])
B = np.dot(S(theta, phi), Bspherical)
else:
B = 3*B0*(muR / (muR + 2)) * np.array([0, 0, 1])
return B
Z, X = np.mgrid[-2.5:2.5:1000j, -2.5:2.5:1000j]
Bx = np.zeros(np.shape(X))
Bz = np.zeros(np.shape(X))
Babs = np.zeros(np.shape(X))
for i in range(len(X)):
for j in range(len(Z)):
r, theta, phi = cart2spherical(X[0, i], 0, Z[j, 0])
B = computeB(r, theta, phi)
Bx[i, j], Bz[i, j] = B[0], B[2]
Babs[i, j] = np.sqrt(B[0]**2 + B[1]**2 + B[2]**2)
fig=plt.figure()
ax=fig.add_subplot(111)
plt.streamplot(X, Z, Bx, Bz, color='k', linewidth=0.8*Babs, density=1.3,
minlength=0.9, arrowstyle='-')
ax.add_patch(Circle((0, 0), radius=1, facecolor='none', linewidth=2))
plt.axis('equal')
plt.axis('off')
fig.savefig('streamlines.pdf', transparent=True, bbox_inches='tight', pad_inches=0)
```

`streamplot`

, this looks like it just chose stream lines badly, but your data is fine. – tcaswell Apr 27 '13 at 15:26