Make sure the first and second differential are continuous while using cubic spline interpolation

I'm reading this paper. In this paper on page 286 they say they use cubic spline interpolation to ensure the existence of continuous first-order differential and second-order differentials.

I'm currently trying to do this in python. From this sentence I deduce they want to make sure the first and second order derivative of the splines which are next to each other, are the same. My question is now, how can I do this with scipy ? I found this: http://docs.scipy.org/doc/scipy/reference/generated/scipy.interpolate.splev.html

Where there is a parameter `der` (The order of derivative of the spline to compute) . Is this the parameter which as to be 2 then ?

*A follow-up questio*n regarding this, they use the first-order differential points later on. Can I assume these are just the first-order derivates of each splines ? How is it possible to get these ?

-

Splines computed by `scipy.interpolate` that are of order `k` have continuous `1 ... k-1`:th derivatives. For your case order `k=3` would have continuous first and second derivative. You can check that this is true yourself via numerical differentiation of the spline:

```import numpy as np
from scipy import interpolate
import matplotlib.pyplot as plt
x = np.linspace(0, 10, 100)
y = np.sin(x)
spl = interpolate.splrep(x, y, k=3)
xx = np.linspace(0, 10, 100000)
yy = interpolate.splev(xx, spl)
d1 = np.diff(yy) / np.diff(xx)
d2 = np.diff(d1) / np.diff(xx[1:])
d3 = np.diff(d2) / np.diff(xx[1:-1])
plt.subplot(311)
plt.plot(xx[1:], d1)
plt.title('first derivative')
plt.subplot(312)
plt.plot(xx[1:-1], d2)
plt.title('second derivative')
plt.subplot(313)
plt.plot(xx[2:-1], d3)
plt.title('third derivative')
plt.show()
```

The third derivative is the first one showing discontinuities.

Taking the second derivative can indeed be done directly via `splev(..., der=2)`.

(Without reading the paper, I can't comment on your second question.)

-
the paper: www.ojtwist.be/ibi.pdf :) , page 286 in the second half. – Ojtwist Apr 11 '13 at 10:06