Numpy interp not interpolating/extrapolating the values, only finding if the data point is above or below the max empirical value

I have the following empirical data:

``````emp_data = np.array([[0.5, -24.111869188789498],
[1.0, -30.166986253668671],
[1.5, -33.310250723584765],
[2.0, -35.629672538473848],
[2.5, -39.416821042883605],
[3.0, -41.05367278405226],
[3.5, -42.702793174115918],
[3.653, -41.173808136289971],
[4.0, -45.327195234249011],
[4.5, -47.170664776211105],
[5.0, -45.838914309065679],
[5.5, -47.83778613822286],
[6.0, -49.55982614930786],
[6.5, -48.899619370977753]])
``````

And I want to interpolate or extrapolate a value from this data based on a new data point similar to the second column. eg -38. If I try interpolate this value interp returns 6.5.

``````numpy.interp(-38, emp_data[:,1], emp_data[:,0])
Out[65]: 6.5
``````

numpy interp returns 6.5 for any value below -48.89 (the max value in the emprical data) and 0.5 for any value above. Anyone know why?

thanks

-
the docs mention that the `xp` values must be increasing. Have tried sorting the array? –  Zhenya May 8 '13 at 9:27

From the help of `numpy.interp`

Does not check that the x-coordinate sequence `xp` is increasing. If `xp` is not increasing, the results are nonsense. A simple check for increasingness is::

``````np.all(np.diff(xp) > 0)
``````

It looks like you have mixed up abscissae, i.e. x-values, and ordinates, i.e. f(x) or y-values.

So, if you want to find the x-value, where `f(x)=-38`, in an automated fashion, you need something more than just interpolation. For example, you may fit a polynomial `p(x)` to your data and then look for the roots of `p(x)-(-38)`.

-
Looks like you're right, I've ordered xp and it interpolates within the data but can't extrapolate outside of the range of xp. do you jnow of any simple ways to fit a polynomial to the data (eg another numpy function?) –  mark mcmurray May 8 '13 at 9:43
I don't think it is a good idea to reverse x and y, as you do by sorting and interpolating, since this is only well posed if your function is injective, i.e. increasing (or decreasing). –  Jan May 8 '13 at 9:53
There is `numpy.polyfit` to find the interpolant. You should use it for finding the roots. However, extrapolating leads to large errors. –  Jan May 8 '13 at 9:55
I don't need this to be hugely accurate - just give me a general ballpark figure really so that would probably work. –  mark mcmurray May 8 '13 at 10:12
So if I find the polynomial I want to find the value of p where p(x) = -38 (or whatever value I'm trying to extrapolate? –  mark mcmurray May 8 '13 at 10:16