Sign up ×
Stack Overflow is a community of 4.7 million programmers, just like you, helping each other. Join them; it only takes a minute:

Im making a density plot like this How to create a density plot in matplotlib? im going to make axvlines to few spot on the plot and my problem is that I need to know that what is the exact x value of the highest peak.

I can find it with a loop:

    density = gaussian_kde(data)
    aa = 0
    bb = 0
    for i in range(max value of data):
       if density(i)[0]>aa:
            aa = density(i)[0]
            bb = i

after this bb has the x value of the peak but the time to do this loop is too long. it takes about 25 seconds at the moment and in future the size of data will be bigger

I hope that this isn't duplicate but atleast I couldn't find asnwer to this problem.

share|improve this question
Just a few comments on this: density = density = gaussian_kde(data) is a weird assignment as you have density twice. Then, unless you're using Python 3, you should not use range for great numbers, better use xrange because it won't hold the entire list of numbers in memory. – Johannes P Jul 29 '13 at 12:19
oh yeah. that density=density =.. wasn't there – user2108375 Jul 29 '13 at 14:11

1 Answer 1

up vote 3 down vote accepted

You could use numpy.argmax:

ys = density(np.arange(9))
bb = np.argmax(ys)
aa = ys[bb]

This would compute the same values of aa and bb as the code you posted. However, this only finds the max among integer values of x. If you look at Justin Peel's graph you'll see that the peak density can occur at some non-integer x-value. So, to find a closer approximation to the peak density, use

xs = np.linspace(0,8,200)
ys = density(xs)
index = np.argmax(ys)
max_y = ys[index]
max_x = xs[index]
share|improve this answer
thanks... got it working – user2108375 Jul 29 '13 at 14:36
Are there any ways to get the number of peaks not only the max one ? – Yasmin Jul 7 at 17:38
Since stackoverflow's goal is to build a searchable archive of good questions matched with good answers, let's make this a new question. Or, before asking, look at or, and adapt the 2D solution to 1D. – unutbu Jul 7 at 17:43

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.