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 strange situation which I would like a bit of assistance. I have the following data:

xdata = [ 11.125,  11.375,  11.625,  11.875,  12.125,  12.375,  12.625,  12.875,  13.125, 13.375,  13.625,  13.875,  14.125,  14.375,  14.625,  14.875,  15.125,  15.375]
ydata = [ 5.49305494,  6.51732366,  6.54733551,  6.38045781,  6.16101383,  5.93700054,  5.70674253,  5.47409529,  5.23715401,  4.98422568,  4.72124987,  4.43762374,   4.11756956,  3.74888544,  3.32613096,  2.79169065,  2.0374265,   1.07918125]

What I would like is to use the fill_between() function, such that the filled region is between two x-values which are not part of the list xdata, while at the same time fills the region between y=0, and the curve generated by the ydata provided.

I've thought of two things: 1) Not caring about being bounded by the y-data (in which case I would use the axvspan() function); this is no longer really an option, and 2) doing some sort of interpolation scheme in order to find the interpolated ydata values for which the x values I have (which again are not part of xdata). If I do move forward with the second idea, I would need to know how matplotlib interpolates between data points by default when using the plot() function in order to try to match the curve generated by the ydata exactly.

I'm open to the interpolation idea, but I'm really open to anything that works. Thanks!

share|improve this question
What are the "two x-values which are not part of the list xdata"? –  askewchan Apr 23 '14 at 16:56
Can you please describe how your desired output is different from this? i.stack.imgur.com/4y6pM.png –  askewchan Apr 23 '14 at 16:58
Sure, I can describe it in a bit more detail (it does differ from the image you generated). Let's call the x values: x1=13.3979400087, and x2=13.414973348. Basically, I want the fill between to look like what you have included in your image, however, I would like it to start at the x value x1, and end at the x value x2. Does this make more sense? –  astromax Apr 23 '14 at 19:31
So basically crop the image shown at x1 and x2? This would be equivalent to using linear interpolation (straight lines between each data point): plt.fill_between([x1, x2], 0, np.interp([x1, x2], xdata, ydata) –  askewchan Apr 23 '14 at 21:59

1 Answer 1

up vote 1 down vote accepted

I think you probably have to do interpolation. Even somehow "cropping" the result from

plt.fill_between(xdata, 0, ydata)

Not cropped

As discussed in the comments above would be equivalent to linear interpolation (straight lines between each data point). Here's how you could do it:

xdata = ...
ydata = ...
xleft, xright = 13.3979400087, 13.414973348
xfill = np.linspace(xleft, xright)
yfill = np.interp(xfill, xdata, ydata)
plt.fill_between(xfill, 0, yfill, color='r')

If you do this on top of the original, you can see it better: Linear

Of course, you could do fancier interpolation, with a spline being the next step:

from scipy import interpolate
# same as above ...
yfill_spline = interpolate.spline(xdata, ydata, xfill) #note the different args ordering from np.interp
plt.fill_between(xfill, 0, yfill_spline, color='g')

The difference is pretty subtle for your example so I've zoomed in to the top edge of the filled region, but with higher curvature data you'll notice a difference more easily: Linear and Spline

For comparison, see the uncropped version with linear vs spline interpolation. You'd notice a big difference between the methods if you had xleft and xright near the peak (1112 or so). Linear and Spline, uncropped

share|improve this answer
This is great - I'll give this a shot and get back to you. –  astromax Apr 24 '14 at 14:06
Okay - this worked. I also came up with my own solution, which was use a combination of two things: 1) axvspan for the region of interest, and then 2) place a fill_between region which is white and has a higher zorder above the curve. Thanks for the help. –  astromax Apr 24 '14 at 14:28

Your Answer


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.