# How to draw orthographic projection from equirectangular projection

I have this image :

I don’t know exactly what kind on projection it is, I guess equirectangular or mercator by the shape. It's the texture for an attitude indicator, b.

I want to draw a orthographic projection, b or maybe a General Perspective projection (which one looks better) of it according to a direction vector defined by two angles (heading and pitch). This direction define a point on the sphere, this point should be the center of the projection.

I want it to look from the pilot point of view, so only half of the sphere should be drawn.

I use python, and I have not yet chosen a graphic library, I will probably be using pygame though.

I’ve found something related : http://www.pygame.org/project-Off-Center+Map+Projections-2881-.html but it uses OpenGL and I have no experience with it, but I can try if needed.

How should I do that ? I probably can draw it manually by calculating every pixel from the calculation formulas but I think there are some kind of library tools to do that efficiently (hardware accelerated probably ?).

For an all-Python solution (using numpy/scipy array ops, which will be faster than any explicit per-pixel looping), this:

``````#!/usr/bin/env python

import math
import numpy as np
import scipy
import scipy.misc
import scipy.ndimage.interpolation
import subprocess

size=256
frames=50

for frame in xrange(0,frames):

# Image pixel co-ordinates
px=np.arange(-1.0,1.0,2.0/size)+1.0/size
py=np.arange(-1.0,1.0,2.0/size)+1.0/size
hx,hy=scipy.meshgrid(px,py)

# Compute z of sphere hit position, if pixel's ray hits
r2=hx*hx+hy*hy
hit=(r2<=1.0)
hz=np.where(
hit,
-np.sqrt(1.0-np.where(hit,r2,0.0)),
np.NaN
)

# Some spin and tilt to make things interesting
spin=2.0*np.pi*(frame+0.5)/frames
cs=math.cos(spin)
ss=math.sin(spin)
ms=np.array([[cs,0.0,ss],[0.0,1.0,0.0],[-ss,0.0,cs]])

tilt=0.125*np.pi*math.sin(2.0*spin)
ct=math.cos(tilt)
st=math.sin(tilt)
mt=np.array([[1.0,0.0,0.0],[0.0,ct,st],[0.0,-st,ct]])

# Rotate the hit points
xyz=np.dstack([hx,hy,hz])
xyz=np.tensordot(xyz,mt,axes=([2],[1]))
xyz=np.tensordot(xyz,ms,axes=([2],[1]))
x=xyz[:,:,0]
y=xyz[:,:,1]
z=xyz[:,:,2]

# Compute map position of hit
latitude =np.where(hit,(0.5+np.arcsin(y)/np.pi)*src.shape[0],0.0)
longitude=np.where(hit,(1.0+np.arctan2(z,x)/np.pi)*0.5*src.shape[1],0.0)
latlong=np.array([latitude,longitude])

# Resample, and zap non-hit pixels
dst=np.zeros((size,size,3))
for channel in [0,1,2]:
dst[:,:,channel]=np.where(
hit,
scipy.ndimage.interpolation.map_coordinates(
src[:,:,channel],
latlong,
order=1
),
0.0
)

# Save to f0000.png, f0001.png, ...
scipy.misc.imsave('f{:04}.png'.format(frame),dst)

# Use imagemagick to make an animated gif
subprocess.call('convert -delay 10 f????.png anim.gif',shell=True)
``````

will get you

.

OpenGL is really the place to be doing this sort of pixel wrangling though, especially if it's for anything interactive.

• Amazing really nice work ! – luxcem May 16 '15 at 13:56

I glanced at the code in the "Off-Center Map Projections" stuff you linked...

As a starting point for you, I'd say it was pretty good, especially if you want to achieve this with any sort of efficiency in PyGame as offloading any sort of per-pixel operations to OpenGL will be much faster than they'll ever be in Python.

Obviously to get any further you'll need to understand the OpenGL; the projection is implemented in `main.py`'s GLSL code (the stuff in the string passed to `mod_program.ShaderFragment`) - the atan and asin there shouldn't be a surprise if you've read up on equirectangular projections.

However, to get to what you want, you'll have to figure out how to render a sphere instead of the viewport-filling quad (rendered in main.py at `glBegin(GL_QUADS);`). Or alternatively, stick with the screen-filling quad and do a ray-sphere intersection in the shader code too (which is effectively what the python code in my other answer does).

• Thank you for help, I’ll definitively look at OpenGL. – luxcem May 15 '15 at 23:04