# Catmull-Rom splines in python

Is there a library or function in python to compute Catmull-Rom spline from three points ?

What I need in the end are the x,y coordinates of points along the spline, provided that they are always equidistant of a given amount t along the spline (say, the spline curve is 3 units long and I want the x,y coordinates at spline length 0, 1, 2 and 3)

Nothing really exciting. I am writing it by myself, but if you find something nice, It would be great for testing (or to save time)

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3 points ? Catmull-Rom is defined for 4 points, say p_1 p0 p1 p2; a cubic curve goes from p0 to p1, and outer points p_1 and p2 determine the slopes at p0 and p1. To draw a curve through some points in an array P, do something like this:

``````for j in range( 1, len(P)-2 ):  # skip the ends
for t in range( 10 ):  # t: 0 .1 .2 .. .9
p = spline_4p( t/10, P[j-1], P[j], P[j+1], P[j+2] )
# draw p

def spline_4p( t, p_1, p0, p1, p2 ):
""" Catmull-Rom
(Ps can be numpy vectors or arrays too: colors, curves ...)
"""
# wikipedia Catmull-Rom -> Cubic_Hermite_spline
# 0 -> p0,  1 -> p1,  1/2 -> (- p_1 + 9 p0 + 9 p1 - p2) / 16
# assert 0 <= t <= 1
return (
t*((2-t)*t - 1)   * p_1
+ (t*t*(3*t - 5) + 2) * p0
+ t*((4 - 3*t)*t + 1) * p1
+ (t-1)*t*t         * p2 ) / 2
``````

One can use piecewise quadratic curves through 3 points -- see Dodgson, Quadratic Interpolation for Image Resampling. What do you really want to do ?

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3 real points, plus the two obligatory endpoints for slope at the end –  Stefano Borini Aug 18 '09 at 17:46
spline_4p( t, p_1, p0, p1, p2 ) goes p0 .. p1, then spline_4p( t, p0, p1, p2, p3 ) p1 .. p2, with p_1 and p3 affecting the slopes. Hth ? –  denis Aug 19 '09 at 8:50
Great and working example! But in t-cycle we should cast t to float: p = spline_4p( float(t)/10, P[j-1], P[j], P[j+1], P[j+2] ) –  alrusdi Oct 15 at 6:45
Thanks @alrusdi. `from __future__ import division` at the the top of all programs is better: then 3 / 2 -> 1.5 –  denis Oct 17 at 9:57

There's this: jj_catmull, which seems to be in Python, maybe you can find what you need there.

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ooohhh.. shiny! thanks, I'll take a look at it as soon as possible. It seems like it does what I need, but I need to check in details. –  Stefano Borini Aug 9 '09 at 14:25
Nope, it makes strong use of XSi stuff. :( –  Stefano Borini Aug 9 '09 at 15:27