# Interpolating a closed curve using scipy

I'm writing a python script to interpolate a given set of points with splines. The points are defined by their `[x, y]` coordinates.

I tried to use this code:

``````x = np.array([23, 24, 24, 25, 25])
y = np.array([13, 12, 13, 12, 13])
tck, u = scipy.interpolate.splprep([x,y], s=0)
unew = np.arange(0, 1.00, 0.005)
out = scipy.interpolate.splev(unew, tck)
``````

which gives me a curve like this:

However, I need to have a smooth closed curve - on the picture above the derivatives at one of the points are obviously not the same. How can I achieve this?

Your closed path can be considered as a parametric curve, x=f(u), y=g(u) where u is distance along the curve, bounded on the interval [0, 1). You can use `scipy.interpolate.splprep` with `per=True` to treat your `x` and `y` points as periodic, then evaluate the fitted splines using `scipy.interpolate.splev`:

``````import numpy as np
from scipy import interpolate
from matplotlib import pyplot as plt

x = np.array([23, 24, 24, 25, 25])
y = np.array([13, 12, 13, 12, 13])

# append the starting x,y coordinates
x = np.r_[x, x[0]]
y = np.r_[y, y[0]]

# fit splines to x=f(u) and y=g(u), treating both as periodic. also note that s=0
# is needed in order to force the spline fit to pass through all the input points.
tck, u = interpolate.splprep([x, y], s=0, per=True)

# evaluate the spline fits for 1000 evenly spaced distance values
xi, yi = interpolate.splev(np.linspace(0, 1, 1000), tck)

# plot the result
fig, ax = plt.subplots(1, 1)
ax.plot(x, y, 'or')
ax.plot(xi, yi, '-b')
``````

• It works perfect if I don't append the starting coordinates. Nov 27, 2015 at 18:48
• Really? Doesn't work for me - I get a 'figure of 8' if I don't append the starting coordinates. The docs for the `per` argument also say "If non-zero, data points are considered periodic with period x[m-1] - x[0] and a smooth periodic spline approximation is returned. Values of y[m-1] and w[m-1] are not used.", which suggests to me that it will ignore the last coordinates in `x` and `y`. Nov 27, 2015 at 18:55
• I get this problem if I append coordinates: mail.scipy.org/pipermail/scipy-user/2007-September/013650.html Nov 27, 2015 at 18:58
• Weird. Maybe it's version-related? All I can say is that appending the start coordinates works perfectly for me using scipy 0.14.1 and 0.16.0, whereas not appending them results in a figure-of-eight curve that does not pass through the point at (25, 13). Perhaps it has something to do with the extra point in your plot at (22, 13)? Nov 27, 2015 at 19:03
• @ali_m would it be possible to evaluate the spline fits for `n` specific values (instead of 1000 evenly spaced distance values)?
– AJMA
Apr 19, 2019 at 15:40