# Convert Polar Image to a Cartesian Image

I am attempting to convert an image in polar coordinates (axes are angle x radius) to an image in cartesian coordinates (axes are x and y).

This is simple enough in matlab using pcolor() but the issue is that I must do this in a mex file (c++ interface to Matlab). This seem's easy enough except that Matlab ONLY uses array containers so I can't think of a clever or eloquent way of doing this.

I do have access to the image dimensions and I can imagine a very messy way of repackaging the input image array as a matrix in C++ and carying out the conversion but this would be messy and problematic.

Also, I need to be able to interpolate gaps between points in the xy plain.

Any ideas?

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I think what I'll try at the moment is to take the input array, and to loop through it generating an intensity for each (angle,radius) and store this in a map with a key of ciel(rcos(theta)) and ciel(rsin(theta))). Can I generate a 2D key for a map? I forget... I'll store each angle,radius value at each x,y key. –  Dan Snyder Apr 12 '11 at 15:56
Not really working... –  Dan Snyder Apr 12 '11 at 16:49
If you mean you want to convert (r,phi) pairs to (x,y) pairs, I don't see what is messy and problematic in providing the input array of pairs to the mex file, and get the output array of pairs as output. Or did I misunderstood your question? Some code will help. –  Itamar Katz Apr 13 '11 at 9:31

## 1 Answer

This is reasonably standard in image processing, particularly in registration. However, it takes some thought and isn't "obvious". It wasn't obvious to me the first time either.

I'm assuming you have two images, in different "domains", in your case a source image in polar coordinates and a target image in Cartesian coordinates. I'm assuming you know the region in the target image you want to populate.

The commonly known best thing to do in image processing is to loop over coordinates in the known area of the target image that you want to populate. For each of these positions (x,y), you'll have some conversion to polar. It's probably `r = sqrt(x*x+y*y)` and `theta = atan2(y,x)` or something like that. Then you sample from that position in the polar coordinate position with interpolation.

Among choices of interpolation are:

1. Nearest neighbor - you just round to the nearest `r` and `theta` and choose the value of that.
2. Bilinear -
3. Bi-cubic
4. ...

Of course you should take care of boundary conditions and what happens if your `r` and `theta` go out of your image.

This procedure also is similar (looping over the target image and sampling from the source image, and doing lookups based on the reverse transform) for all kinds of coordinates transformations. The nice thing is that you don't leave holes where your source imagine is relevant.

Hope this helps with the image part.

As for the mex part, here's some links: Mex tutorial Mex tutorial

Can you be more specific about what you need about the mex part?

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