Take the 2-minute tour ×
Stack Overflow is a question and answer site for professional and enthusiast programmers. It's 100% free, no registration required.

I have a polar (r,theta) grid (which means that each cell is an annulus section) containing values of some physical quantity (e.g. temperature), and I would like to re-grid (or re-project) these values onto a cartesian grid. Are there any Python packages that can do this?

I am not interested in converting the coordinates of the centers of the cells from polar to cartesian - this is very easy. Instead, I'm looking for a package that can actually re-grid the data properly.

Thanks for any suggestions!

share|improve this question
    
That's not an easy problem, and it would be both interesting and a huge bear to write. I think it would take me 2-3 days to come up with something horribly inefficient. –  Omnifarious Jan 29 '10 at 19:53
add comment

3 Answers

Thanks for your answers - after thinking a bit more about this I came up with the following code:

import numpy as np

import matplotlib
matplotlib.use('Agg')
import matplotlib.pyplot as mpl

from scipy.interpolate import interp1d
from scipy.ndimage import map_coordinates


def polar2cartesian(r, t, grid, x, y, order=3):

    X, Y = np.meshgrid(x, y)

    new_r = np.sqrt(X*X+Y*Y)
    new_t = np.arctan2(X, Y)

    ir = interp1d(r, np.arange(len(r)), bounds_error=False)
    it = interp1d(t, np.arange(len(t)))

    new_ir = ir(new_r.ravel())
    new_it = it(new_t.ravel())

    new_ir[new_r.ravel() > r.max()] = len(r)-1
    new_ir[new_r.ravel() < r.min()] = 0

    return map_coordinates(grid, np.array([new_ir, new_it]),
                            order=order).reshape(new_r.shape)

# Define original polar grid

nr = 10
nt = 10

r = np.linspace(1, 100, nr)
t = np.linspace(0., np.pi, nt)
z = np.random.random((nr, nt))

# Define new cartesian grid

nx = 100
ny = 200

x = np.linspace(0., 100., nx)
y = np.linspace(-100., 100., ny)

# Interpolate polar grid to cartesian grid (nearest neighbor)

fig = mpl.figure()
ax = fig.add_subplot(111)
ax.imshow(polar2cartesian(r, t, z, x, y, order=0), interpolation='nearest')
fig.savefig('test1.png')

# Interpolate polar grid to cartesian grid (cubic spline)

fig = mpl.figure()
ax = fig.add_subplot(111)
ax.imshow(polar2cartesian(r, t, z, x, y, order=3), interpolation='nearest')
fig.savefig('test2.png')

Which is not strictly re-gridding, but works fine for what I need. Just posting the code in case it is useful to anyone else. Feel free to suggest improvements!

share|improve this answer
add comment

You can do this more compactly with scipy.ndimage.geometric_transform. Here is some sample code:

import numpy as N
import scipy as S
import scipy.ndimage

temperature = <whatever> 
# This is the data in your polar grid.
# The 0th and 1st axes correspond to r and θ, respectively.
# For the sake of simplicity, θ goes from 0 to 2π, 
# and r's units are just its indices.

def polar2cartesian(outcoords, inputshape, origin):
    """Coordinate transform for converting a polar array to Cartesian coordinates. 
    inputshape is a tuple containing the shape of the polar array. origin is a
    tuple containing the x and y indices of where the origin should be in the
    output array."""

    xindex, yindex = outcoords
    x0, y0 = origin
    x = xindex - x0
    y = yindex - y0

    r = N.sqrt(x**2 + y**2)
    theta = N.arctan2(y, x)
    theta_index = N.round((theta + N.pi) * inputshape[1] / (2 * N.pi))

    return (r,theta_index)

temperature_cartesian = S.ndimage.geometric_transform(temperature, polar2cartesian, 
    order=0,
    output_shape = (temperature.shape[0] * 2, temperature.shape[0] * 2),
    extra_keywords = {'inputshape':temperature.shape,
        'center':(temperature.shape[0], temperature.shape[0])})

You can change order=0 as desired for better interpolation. The output array temperature_cartesian is 2r by 2r here, but you can specify any size and origin you like.

share|improve this answer
add comment

I came to this post some time ago when trying to do something similar, this is, reprojecting polar data into a cartesian grid and vice-versa. The solution proposed here works fine. However, it takes some time to perform the coordinate transform. I just wanted to share another approach which can reduce the processing time up to 50 times or more.

The algorithm uses the scipy.ndimage.interpolation.map_coordinates function.

Let's see a little example:

import numpy as np

# Auxiliary function to map polar data to a cartesian plane
def polar_to_cart(polar_data, theta_step, range_step, x, y, order=3):

    from scipy.ndimage.interpolation import map_coordinates as mp

    # "x" and "y" are numpy arrays with the desired cartesian coordinates
    # we make a meshgrid with them
    X, Y = np.meshgrid(x, y)

    # Now that we have the X and Y coordinates of each point in the output plane
    # we can calculate their corresponding theta and range
    Tc = np.degrees(np.arctan2(Y, X)).ravel()
    Rc = (np.sqrt(X**2 + Y**2)).ravel()

    # Negative angles are corrected
    Tc[Tc < 0] = 360 + Tc[Tc < 0]

    # Using the known theta and range steps, the coordinates are mapped to
    # those of the data grid
    Tc = Tc / theta_step
    Rc = Rc / range_step

    # An array of polar coordinates is created stacking the previous arrays
    coords = np.vstack((Ac, Sc))

    # To avoid holes in the 360º - 0º boundary, the last column of the data
    # copied in the begining
    polar_data = np.vstack((polar_data, polar_data[-1,:]))

    # The data is mapped to the new coordinates
    # Values outside range are substituted with nans
    cart_data = mp(polar_data, coords, order=order, mode='constant', cval=np.nan)

    # The data is reshaped and returned
    return(cart_data.reshape(len(y), len(x)).T)

polar_data = ... # Here a 2D array of data is assumed, with shape thetas x ranges

# We create the x and y axes of the output cartesian data
x = y = np.arange(-100000, 100000, 1000)

# We call the mapping function assuming 1 degree of theta step and 500 meters of
# range step. The default order of 3 is used.
cart_data = polar_to_cart(polar_data, 1, 500, x, y)

I hope this helps someone in the same situation as me.

share|improve this answer
add comment

Your Answer

 
discard

By posting your answer, you agree to the privacy policy and terms of service.

Not the answer you're looking for? Browse other questions tagged or ask your own question.