I can write something myself by finding zero-crossings of the first derivative or something, but it seems like a common-enough function to be included in standard libraries. Anyone know of one?

My particular application is a 2D array, but usually it would be used for finding peaks in FFTs, etc.

Specifically, in these kinds of problems, there are multiple strong peaks, and then lots of smaller "peaks" that are just caused by noise that should be ignored. These are just examples; not my actual data:

1-dimensional peaks:

FFT output with peaks

2-dimensional peaks:

Radon transform output with circled peak

The peak-finding algorithm would find the location of these peaks (not just their values), and ideally would find the true inter-sample peak, not just the index with maximum value, probably using quadratic interpolation or something.

Typically you only care about a few strong peaks, so they'd either be chosen because they're above a certain threshold, or because they're the first n peaks of an ordered list, ranked by amplitude.

As I said, I know how to write something like this myself. I'm just asking if there's a pre-existing function or package that's known to work well.


I translated a MATLAB script and it works decently for the 1-D case, but could be better.

Updated update:

sixtenbe created a better version for the 1-D case.


The function scipy.signal.find_peaks, as its name suggests, is useful for this. But it's important to understand well its parameters width, threshold, distance and above all prominence to get a good peak extraction.

According to my tests and the documentation, the concept of prominence is "the useful concept" to keep the good peaks, and discard the noisy peaks.

What is (topographic) prominence? It is "the minimum height necessary to descend to get from the summit to any higher terrain", as it can be seen here:

enter image description here

The idea is:

The higher the prominence, the more "important" the peak is.


enter image description here

I used a (noisy) frequency-varying sinusoid on purpose because it shows many difficulties. We can see that the width parameter is not very useful here because if you set a minimum width too high, then it won't be able to track very close peaks in the high frequency part. If you set width too low, you would have many unwanted peaks in the left part of the signal. Same problem with distance. threshold only compares with the direct neighbours, which is not useful here. prominence is the one that gives the best solution. Note that you can combine many of these parameters!


import numpy as np
import matplotlib.pyplot as plt 
from scipy.signal import find_peaks

x = np.sin(2*np.pi*(2**np.linspace(2,10,1000))*np.arange(1000)/48000) + np.random.normal(0, 1, 1000) * 0.15
peaks, _ = find_peaks(x, distance=20)
peaks2, _ = find_peaks(x, prominence=1)      # BEST!
peaks3, _ = find_peaks(x, width=20)
peaks4, _ = find_peaks(x, threshold=0.4)     # Required vertical distance to its direct neighbouring samples, pretty useless
plt.subplot(2, 2, 1)
plt.plot(peaks, x[peaks], "xr"); plt.plot(x); plt.legend(['distance'])
plt.subplot(2, 2, 2)
plt.plot(peaks2, x[peaks2], "ob"); plt.plot(x); plt.legend(['prominence'])
plt.subplot(2, 2, 3)
plt.plot(peaks3, x[peaks3], "vg"); plt.plot(x); plt.legend(['width'])
plt.subplot(2, 2, 4)
plt.plot(peaks4, x[peaks4], "xk"); plt.plot(x); plt.legend(['threshold'])
| improve this answer | |
  • This's what I am after. But do you happen to know any implementation that finds prominence in 2D array? – Jason Nov 9 '18 at 18:46

I'm looking at a similar problem, and I've found some of the best references come from chemistry (from peaks finding in mass-spec data). For a good thorough review of peaking finding algorithms read this. This is one of the best clearest reviews of peak finding techniques that I've run across. (Wavelets are the best for finding peaks of this sort in noisy data.).

It looks like your peaks are clearly defined and aren't hidden in the noise. That being the case I'd recommend using smooth savtizky-golay derivatives to find the peaks (If you just differentiate the data above you'll have a mess of false positives.). This is a very effective technique and is pretty easy to implemented (you do need a matrix class w/ basic operations). If you simply find the zero crossing of the first S-G derivative I think you'll be happy.

| improve this answer | |
  • 2
    I was looking for a general purpose solution, not one that only works on those particular images. I adapted a MATLAB script to Python and it works decently. – endolith Dec 17 '09 at 18:30
  • 1
    Right on. Matlab is a good source for algorithms. What technique does the script use? (BTW, SG is a very general purpose technique). – Paul Dec 17 '09 at 21:23
  • 2
    I linked it above. It basically just searches for local maxima that are larger than a certain threshold above their neighbors. There are certainly better methods. – endolith Dec 18 '09 at 19:35
  • 1
    @Paul I bookmarked that page. IYO and in summary, what specific technique did you think worked the best for this peak picking business? – Spacey Mar 22 '12 at 23:39
  • why are zeros of derivative better than just testing if a middle out of three points is larger or smaller of the other two. i have already applied sg transfor, seems like an extra cost. – kirill_igum May 3 '15 at 1:16

There is a function in scipy named scipy.signal.find_peaks_cwt which sounds like is suitable for your needs, however I don't have experience with it so I cannot recommend..


| improve this answer | |
  • 12
    Yeah, that didn't exist when I asked this, and I'm still not sure how to use it – endolith Sep 17 '13 at 16:04
  • 1
    You added this a while ago, but this worked awesome. Using it is simple as pie. Just pass in the array, and another array (ie. np.arange(1,10)) which lists all the widths of peaks you would want; nice benefit to filter for skinny or wide peaks if one needs. Thanks again! – Miles Nov 3 '15 at 12:56

For those not sure about which peak-finding algorithms to use in Python, here a rapid overview of the alternatives: https://github.com/MonsieurV/py-findpeaks

Wanting myself an equivalent to the MatLab findpeaks function, I've found that the detect_peaks function from Marcos Duarte is a good catch.

Pretty easy to use:

import numpy as np
from vector import vector, plot_peaks
from libs import detect_peaks
print('Detect peaks with minimum height and distance filters.')
indexes = detect_peaks.detect_peaks(vector, mph=7, mpd=2)
print('Peaks are: %s' % (indexes))

Which will give you:

detect_peaks results

| improve this answer | |
  • 1
    Since this post was written, the find_peaks function was added to scipy. – onewhaleid Apr 15 '19 at 2:06

Detecting peaks in a spectrum in a reliable way has been studied quite a bit, for example all the work on sinusoidal modelling for music/audio signals in the 80ies. Look for "Sinusoidal Modeling" in the literature.

If your signals are as clean as the example, a simple "give me something with an amplitude higher than N neighbours" should work reasonably well. If you have noisy signals, a simple but effective way is to look at your peaks in time, to track them: you then detect spectral lines instead of spectral peaks. IOW, you compute the FFT on a sliding window of your signal, to get a set of spectrum in time (also called spectrogram). You then look at the evolution of the spectral peak in time (i.e. in consecutive windows).

| improve this answer | |
  • Look at peaks in time? Detect spectral lines? I'm not sure what this means. Would it work for square waves? – endolith Nov 27 '09 at 17:10
  • Oh, you're talking about using STFT instead of FFT. This question isn't about FFTs specifically; that's just an example. It's about finding the peaks in any general 1D or 2D array. – endolith Nov 30 '09 at 16:44

I do not think that what you are looking for is provided by SciPy. I would write the code myself, in this situation.

The spline interpolation and smoothing from scipy.interpolate are quite nice and might be quite helpful in fitting peaks and then finding the location of their maximum.

| improve this answer | |
  • 16
    My apologies, but I think that this should be a comment, not an answer. It just suggests writing it by oneself, with a vague suggestion for functions which might be useful (the ones in Paul's answer are much more relevant, incidentally). – Ami Tavory Dec 5 '18 at 11:26

There are standard statistical functions and methods for finding outliers to data, which is probably what you need in the first case. Using derivatives would solve your second. I'm not sure for a method which solves both continuous functions and sampled data, however.

| improve this answer | |

First things first, the definition of "peak" is vague if without further specifications. For example, for the following series, would you call 5-4-5 one peak or two?


In this case, you'll need at least two thresholds: 1) a high threshold only above which can an extreme value register as a peak; and 2) a low threshold so that extreme values separated by small values below it will become two peaks.

Peak detection is a well-studied topic in Extreme Value Theory literature, also known as "declustering of extreme values". Its typical applications include identifying hazard events based on continuous readings of environmental variables e.g. analysing wind speed to detect storm events.

| improve this answer | |

Not the answer you're looking for? Browse other questions tagged or ask your own question.