Is there a SciPy function or NumPy function or module for Python that calculates the running mean of a 1D array given a specific window?

  • 2
    Note that if you build the array "online", the problem statement effectively becomes "how can I maintain a vector adding values at the end and popping at the start most efficiently", as you can simply maintain a single accumulator of the mean, adding the new value and subtracting the oldest value each time a value comes in which is trivial in complexity.
    – BjornW
    Commented Sep 22, 2020 at 15:19
  • None of the answers below except for one address what is asked for: updating the moving average as new values are added aka "running." I recommend keeping a cyclical buffer so you don't usually resize it, and you update the next index (modulo the buffer size) by computing the next average knowing the previous average and the new value. Simple algebraic rearrangement will get you there. Commented Feb 26, 2022 at 18:04

31 Answers 31


NOTE: More efficient solutions may include scipy.ndimage.uniform_filter1d (see this answer), or using newer libraries including talib's talib.MA.

Use np.convolve:

np.convolve(x, np.ones(N)/N, mode='valid')


The running mean is a case of the mathematical operation of convolution. For the running mean, you slide a window along the input and compute the mean of the window's contents. For discrete 1D signals, convolution is the same thing, except instead of the mean you compute an arbitrary linear combination, i.e., multiply each element by a corresponding coefficient and add up the results. Those coefficients, one for each position in the window, are sometimes called the convolution kernel. The arithmetic mean of N values is (x_1 + x_2 + ... + x_N) / N, so the corresponding kernel is (1/N, 1/N, ..., 1/N), and that's exactly what we get by using np.ones(N)/N.


The mode argument of np.convolve specifies how to handle the edges. I chose the valid mode here because I think that's how most people expect the running mean to work, but you may have other priorities. Here is a plot that illustrates the difference between the modes:

import numpy as np
import matplotlib.pyplot as plt
modes = ['full', 'same', 'valid']
for m in modes:
    plt.plot(np.convolve(np.ones(200), np.ones(50)/50, mode=m));
plt.axis([-10, 251, -.1, 1.1]);
plt.legend(modes, loc='lower center');

Running mean convolve modes

  • 10
    I like this solution because it is clean (one line) and relatively efficient (work done inside numpy). But Alleo's "Efficient solution" using numpy.cumsum has better complexity. Commented Sep 25, 2015 at 0:31
  • 2
    @denfromufa, I believe the documentation covers the implementation well enough, and it also links to Wikipedia which explains the maths. Considering the focus of the question, do you think this answer needs to copy those?
    – lapis
    Commented Oct 9, 2017 at 18:56
  • For plotting and related tasks it would be helpful to fill it up with None values. My (not so beautiful but short) suggestion: ``` def moving_average(x, N, fill=True): return np.concatenate([x for x in [ [None]*(N // 2 + N % 2)*fill, np.convolve(x, np.ones((N,))/N, mode='valid'), [None]*(N // 2)*fill, ] if len(x)]) ``` Code looks so ugly in SO comments xD I didn't want to add a another answer as there were so many but you might just copy and paste it into your IDE.
    – Chaoste
    Commented Jan 28, 2019 at 12:56
  • 1
    stackoverflow.com/a/69808772/8443371 is twice faster than uniform_filter1d with same magnitude of error Commented Nov 7, 2021 at 12:27

Efficient solution

Convolution is much better than straightforward approach, but (I guess) it uses FFT and thus quite slow. However specially for computing the running mean the following approach works fine

def running_mean(x, N):
    cumsum = numpy.cumsum(numpy.insert(x, 0, 0)) 
    return (cumsum[N:] - cumsum[:-N]) / float(N)

The code to check

In[3]: x = numpy.random.random(100000)
In[4]: N = 1000
In[5]: %timeit result1 = numpy.convolve(x, numpy.ones((N,))/N, mode='valid')
10 loops, best of 3: 41.4 ms per loop
In[6]: %timeit result2 = running_mean(x, N)
1000 loops, best of 3: 1.04 ms per loop

Note that numpy.allclose(result1, result2) is True, two methods are equivalent. The greater N, the greater difference in time.

warning: although cumsum is faster there will be increased floating point error that may cause your results to be invalid/incorrect/unacceptable

the comments pointed out this floating point error issue here but i am making it more obvious here in the answer..

# demonstrate loss of precision with only 100,000 points
x = np.random.randn(100000)+1e6
y1 = running_mean_convolve(x, 10)
y2 = running_mean_cumsum(x, 10)
assert np.allclose(y1, y2, rtol=1e-12, atol=0)
  • the more points you accumulate over the greater the floating point error (so 1e5 points is noticable, 1e6 points is more significant, more than 1e6 and you may want to resetting the accumulators)
  • you can cheat by using np.longdouble but your floating point error still will get significant for relatively large number of points (around >1e5 but depends on your data)
  • you can plot the error and see it increasing relatively fast
  • the convolve solution is slower but does not have this floating point loss of precision
  • the uniform_filter1d solution is faster than this cumsum solution AND does not have this floating point loss of precision
  • 4
    Nice solution! My hunch is numpy.convolve is O(mn); its docs mention that scipy.signal.fftconvolve uses FFT. Commented Sep 24, 2015 at 21:18
  • 3
    This method does not deal with the edges of the array, does it ?
    – JoVe
    Commented Jul 12, 2016 at 14:28
  • 9
    Nice solution, but note that it might suffer from numerical errors for large arrays, since towards the end of the array, you might be subtracting two large numbers to obtain a small result. Commented Oct 10, 2017 at 9:48
  • 2
    This uses integer division instead of float division: running_mean([1,2,3], 2) gives array([1, 2]). Replacing x by [float(value) for value in x] does the trick.
    – ChrisW
    Commented Nov 6, 2017 at 17:31
  • 6
    The numerical stability of this solution can become a problem if x contains floats. Example: running_mean(np.arange(int(1e7))[::-1] + 0.2, 1)[-1] - 0.2 returns 0.003125 while one expects 0.0. More information: en.wikipedia.org/wiki/Loss_of_significance
    – Milan
    Commented Dec 7, 2017 at 11:08

You can use scipy.ndimage.uniform_filter1d:

import numpy as np
from scipy.ndimage import uniform_filter1d
N = 1000
x = np.random.random(100000)
y = uniform_filter1d(x, size=N)


  • gives the output with the same numpy shape (i.e. number of points)
  • allows multiple ways to handle the border where 'reflect' is the default, but in my case, I rather wanted 'nearest'

It is also rather quick (nearly 50 times faster than np.convolve and 2-5 times faster than the cumsum approach given above):

%timeit y1 = np.convolve(x, np.ones((N,))/N, mode='same')
100 loops, best of 3: 9.28 ms per loop

%timeit y2 = uniform_filter1d(x, size=N)
10000 loops, best of 3: 191 µs per loop

here's 3 functions that let you compare error/speed of different implementations:

from __future__ import division
import numpy as np
import scipy.ndimage as ndi
def running_mean_convolve(x, N):
    return np.convolve(x, np.ones(N) / float(N), 'valid')
def running_mean_cumsum(x, N):
    cumsum = np.cumsum(np.insert(x, 0, 0))
    return (cumsum[N:] - cumsum[:-N]) / float(N)
def running_mean_uniform_filter1d(x, N):
    return ndi.uniform_filter1d(x, N, mode='constant', origin=-(N//2))[:-(N-1)]
  • 5
    This is the only answer that seems to take into account the border issues (rather important, particularly when plotting). Thank you!
    – Gabriel
    Commented Dec 6, 2018 at 15:38
  • 3
    i profiled uniform_filter1d, np.convolve with a rectangle, and np.cumsum followed by np.subtract. my results: (1.) convolve is the slowest. (2.) cumsum/subtract is about 20-30x faster. (3.) uniform_filter1d is about 2-3x faster than cumsum/subtract. winner is definitely uniform_filter1d. Commented Feb 21, 2020 at 12:55
  • 2
    using uniform_filter1d is faster than the cumsum solution (by about 2-5x). and uniform_filter1d does not get massive floating point error like the cumsum solution does. Commented Feb 21, 2020 at 14:55

Update: The example below shows the old pandas.rolling_mean function which has been removed in recent versions of pandas. A modern equivalent of that function call would use pandas.Series.rolling:

In [8]: pd.Series(x).rolling(window=N).mean().iloc[N-1:].values
array([ 0.49815397,  0.49844183,  0.49840518, ...,  0.49488191,
        0.49456679,  0.49427121])

pandas is more suitable for this than NumPy or SciPy. Its function rolling_mean does the job conveniently. It also returns a NumPy array when the input is an array.

It is difficult to beat rolling_mean in performance with any custom pure Python implementation. Here is an example performance against two of the proposed solutions:

In [1]: import numpy as np

In [2]: import pandas as pd

In [3]: def running_mean(x, N):
   ...:     cumsum = np.cumsum(np.insert(x, 0, 0)) 
   ...:     return (cumsum[N:] - cumsum[:-N]) / N

In [4]: x = np.random.random(100000)

In [5]: N = 1000

In [6]: %timeit np.convolve(x, np.ones((N,))/N, mode='valid')
10 loops, best of 3: 172 ms per loop

In [7]: %timeit running_mean(x, N)
100 loops, best of 3: 6.72 ms per loop

In [8]: %timeit pd.rolling_mean(x, N)[N-1:]
100 loops, best of 3: 4.74 ms per loop

In [9]: np.allclose(pd.rolling_mean(x, N)[N-1:], running_mean(x, N))
Out[9]: True

There are also nice options as to how to deal with the edge values.

  • 6
    The Pandas rolling_mean is a nice tool for the job but has been deprecated for ndarrays. In future Pandas releases it will only function on Pandas series. Where do we turn now for non-Pandas array data?
    – Mike
    Commented May 25, 2016 at 19:45
  • 6
    @Mike rolling_mean() is deprecated, but now you can use rolling and mean separately: df.rolling(windowsize).mean() now works instead (very quickly I might add). for 6,000 row series %timeit test1.rolling(20).mean() returned 1000 loops, best of 3: 1.16 ms per loop
    – Vlox
    Commented May 2, 2017 at 17:41
  • 8
    @Vlox df.rolling() works well enough, the problem is that even this form will not support ndarrays in the future. To use it we will have to load our data into a Pandas Dataframe first. I would love to see this function added to either numpy or scipy.signal.
    – Mike
    Commented May 2, 2017 at 22:14
  • 1
    @Mike totally agree. I am struggling in particular to match pandas .ewm().mean() speed for my own arrays (instead of having to load them into a df first). I mean, it's great that it's fast, but just feels a bit clunky moving in and out of dataframes too often.
    – Vlox
    Commented May 3, 2017 at 13:08
  • 8
    %timeit bottleneck.move_mean(x, N) is 3 to 15 times faster than the cumsum and pandas methods on my pc. Take a look at their benchmark in the repo's README.
    – mab
    Commented Aug 29, 2017 at 18:16

You can calculate a running mean with:

import numpy as np

def runningMean(x, N):
    y = np.zeros((len(x),))
    for ctr in range(len(x)):
         y[ctr] = np.sum(x[ctr:(ctr+N)])
    return y/N

But it's slow.

Fortunately, numpy includes a convolve function which we can use to speed things up. The running mean is equivalent to convolving x with a vector that is N long, with all members equal to 1/N. The numpy implementation of convolve includes the starting transient, so you have to remove the first N-1 points:

def runningMeanFast(x, N):
    return np.convolve(x, np.ones((N,))/N)[(N-1):]

On my machine, the fast version is 20-30 times faster, depending on the length of the input vector and size of the averaging window.

Note that convolve does include a 'same' mode which seems like it should address the starting transient issue, but it splits it between the beginning and end.

  • Note that removing the first N-1 points still leaves a boundary effect in the last points. An easier way to solve the issue is to use mode='valid' in convolve which doesn't require any post-processing.
    – lapis
    Commented Mar 24, 2014 at 10:08
  • 1
    @Psycho - mode='valid' removes the transient from both ends, right? If len(x)=10 and N=4, for a running mean I would want 10 results but valid returns 7.
    – mtrw
    Commented Mar 24, 2014 at 13:09
  • 1
    It removes the transient from the end, and the beginning doesn't have one. Well, I guess it's a matter of priorities, I don't need the same number of results on the expense of getting a slope towards zero that isn't there in the data. BTW, here is a command to show the difference between the modes: modes = ('full', 'same', 'valid'); [plot(convolve(ones((200,)), ones((50,))/50, mode=m)) for m in modes]; axis([-10, 251, -.1, 1.1]); legend(modes, loc='lower center') (with pyplot and numpy imported).
    – lapis
    Commented Mar 24, 2014 at 13:56
  • runningMean Have I side effect of averaging with zeros, when you go out of array with x[ctr:(ctr+N)] for right side of array.
    – mrgloom
    Commented Nov 2, 2018 at 14:19
  • runningMeanFast also have this border effect issue.
    – mrgloom
    Commented Nov 2, 2018 at 14:39

For a short, fast solution that does the whole thing in one loop, without dependencies, the code below works great.

mylist = [1, 2, 3, 4, 5, 6, 7]
N = 3
cumsum, moving_aves = [0], []

for i, x in enumerate(mylist, 1):
    cumsum.append(cumsum[i-1] + x)
    if i>=N:
        moving_ave = (cumsum[i] - cumsum[i-N])/N
        #can do stuff with moving_ave here
  • 96
    Fast?! This solution is orders of magnitude slower than the solutions with Numpy.
    – Bart
    Commented Sep 17, 2018 at 7:34
  • 6
    Although this native solution is cool, the OP asked for a numpy/scipy function - presumably those will be considerably faster.
    – Demis
    Commented Oct 8, 2018 at 15:19
  • 1
    But it doesn't require 100+MB framework, ideal for SBC Commented Oct 20, 2021 at 16:41

or module for python that calculates

in my tests at Tradewave.net TA-lib always wins:

import talib as ta
import numpy as np
import pandas as pd
import scipy
from scipy import signal
import time as t

PAIR = info.primary_pair

def initialize():
    storage.elapsed = storage.get('elapsed', [0,0,0,0,0,0])

def cumsum_sma(array, period):
    ret = np.cumsum(array, dtype=float)
    ret[period:] = ret[period:] - ret[:-period]
    return ret[period - 1:] / period

def pandas_sma(array, period):
    return pd.rolling_mean(array, period)

def api_sma(array, period):
    # this method is native to Tradewave and does NOT return an array
    return (data[PAIR].ma(PERIOD))

def talib_sma(array, period):
    return ta.MA(array, period)

def convolve_sma(array, period):
    return np.convolve(array, np.ones((period,))/period, mode='valid')

def fftconvolve_sma(array, period):    
    return scipy.signal.fftconvolve(
        array, np.ones((period,))/period, mode='valid')    

def tick():

    close = data[PAIR].warmup_period('close')

    t1 = t.time()
    sma_api = api_sma(close, PERIOD)
    t2 = t.time()
    sma_cumsum = cumsum_sma(close, PERIOD)
    t3 = t.time()
    sma_pandas = pandas_sma(close, PERIOD)
    t4 = t.time()
    sma_talib = talib_sma(close, PERIOD)
    t5 = t.time()
    sma_convolve = convolve_sma(close, PERIOD)
    t6 = t.time()
    sma_fftconvolve = fftconvolve_sma(close, PERIOD)
    t7 = t.time()

    storage.elapsed[-1] = storage.elapsed[-1] + t2-t1
    storage.elapsed[-2] = storage.elapsed[-2] + t3-t2
    storage.elapsed[-3] = storage.elapsed[-3] + t4-t3
    storage.elapsed[-4] = storage.elapsed[-4] + t5-t4
    storage.elapsed[-5] = storage.elapsed[-5] + t6-t5    
    storage.elapsed[-6] = storage.elapsed[-6] + t7-t6        

    plot('sma_api', sma_api)  
    plot('sma_cumsum', sma_cumsum[-5])
    plot('sma_pandas', sma_pandas[-10])
    plot('sma_talib', sma_talib[-15])
    plot('sma_convolve', sma_convolve[-20])    
    plot('sma_fftconvolve', sma_fftconvolve[-25])

def stop():

    log('ticks....: %s' % info.max_ticks)

    log('api......: %.5f' % storage.elapsed[-1])
    log('cumsum...: %.5f' % storage.elapsed[-2])
    log('pandas...: %.5f' % storage.elapsed[-3])
    log('talib....: %.5f' % storage.elapsed[-4])
    log('convolve.: %.5f' % storage.elapsed[-5])    
    log('fft......: %.5f' % storage.elapsed[-6])


[2015-01-31 23:00:00] ticks....: 744
[2015-01-31 23:00:00] api......: 0.16445
[2015-01-31 23:00:00] cumsum...: 0.03189
[2015-01-31 23:00:00] pandas...: 0.03677
[2015-01-31 23:00:00] talib....: 0.00700  # <<< Winner!
[2015-01-31 23:00:00] convolve.: 0.04871
[2015-01-31 23:00:00] fft......: 0.22306

enter image description here

  • NameError: name 'info' is not defined . I am getting this error, Sir. Commented Aug 8, 2018 at 10:12
  • 3
    Looks like you time series are shifted after smoothing, is it desired effect?
    – mrgloom
    Commented Nov 2, 2018 at 14:20
  • 1
    @mrgloom yes, for visualization purposes; else they would appear as one line on the chart ; Md. Rezwanul Haque you could remove all references to PAIR and info; those were internal sandboxed methods for the now defunct tradewave.net Commented Jan 20, 2019 at 15:55
  • can you add scipy.ndimage uniform_filter1d ? thanks!
    – Oren
    Commented Jun 22, 2021 at 12:50
  • I know, it's been a few years, but out of curiosity: What were you using there in terms of plotting?
    – bluenote10
    Commented Feb 3 at 7:42

For a ready-to-use solution, see https://scipy-cookbook.readthedocs.io/items/SignalSmooth.html. It provides running average with the flat window type. Note that this is a bit more sophisticated than the simple do-it-yourself convolve-method, since it tries to handle the problems at the beginning and the end of the data by reflecting it (which may or may not work in your case...).

To start with, you could try:

a = np.random.random(100)
b = smooth(a, window='flat')
  • 1
    This method relies on numpy.convolve, the difference only in altering the sequence.
    – Alleo
    Commented Dec 28, 2014 at 22:14
  • 14
    I'm always annoyed by signal processing function that return output signals of different shape than the input signals when both inputs and outputs are of the same nature (e.g., both temporal signals). It breaks the correspondence with related independent variable (e.g., time, frequency) making plotting or comparison not a direct matter... anyway, if you share the feeling, you might want to change the last lines of the proposed function as y=np.convolve(w/w.sum(),s,mode='same'); return y[window_len-1:-(window_len-1)] Commented Aug 25, 2015 at 19:56
  • @ChristianO'Reilly, you should post that as a separate answer- that's exactly what I was looking for, as I indeed have two other arrays that have to match the lengths of the smoothed data, for plotting etc. I'd like to know exactly how you did that - is w the window size, and s the data?
    – Demis
    Commented Oct 8, 2018 at 15:28
  • @Demis Glad the comment helped. More info on the numpy convolve function here docs.scipy.org/doc/numpy-1.15.0/reference/generated/… A convolution function (en.wikipedia.org/wiki/Convolution) convolves two signals with one another. In this case, it convolves your signal (s) with a normalized (i.e. unitary area) window (w/w.sum()). Commented Oct 10, 2018 at 7:58

I know this is an old question, but here is a solution that doesn't use any extra data structures or libraries. It is linear in the number of elements of the input list and I cannot think of any other way to make it more efficient (actually if anyone knows of a better way to allocate the result, please let me know).

NOTE: this would be much faster using a numpy array instead of a list, but I wanted to eliminate all dependencies. It would also be possible to improve performance by multi-threaded execution

The function assumes that the input list is one dimensional, so be careful.

### Running mean/Moving average
def running_mean(l, N):
    sum = 0
    result = list( 0 for x in l)

    for i in range( 0, N ):
        sum = sum + l[i]
        result[i] = sum / (i+1)

    for i in range( N, len(l) ):
        sum = sum - l[i-N] + l[i]
        result[i] = sum / N

    return result


Assume that we have a list data = [ 1, 2, 3, 4, 5, 6 ] on which we want to compute a rolling mean with period of 3, and that you also want a output list that is the same size of the input one (that's most often the case).

The first element has index 0, so the rolling mean should be computed on elements of index -2, -1 and 0. Obviously we don't have data[-2] and data[-1] (unless you want to use special boundary conditions), so we assume that those elements are 0. This is equivalent to zero-padding the list, except we don't actually pad it, just keep track of the indices that require padding (from 0 to N-1).

So, for the first N elements we just keep adding up the elements in an accumulator.

result[0] = (0 + 0 + 1) / 3  = 0.333    ==   (sum + 1) / 3
result[1] = (0 + 1 + 2) / 3  = 1        ==   (sum + 2) / 3
result[2] = (1 + 2 + 3) / 3  = 2        ==   (sum + 3) / 3

From elements N+1 forwards simple accumulation doesn't work. we expect result[3] = (2 + 3 + 4)/3 = 3 but this is different from (sum + 4)/3 = 3.333.

The way to compute the correct value is to subtract data[0] = 1 from sum+4, thus giving sum + 4 - 1 = 9.

This happens because currently sum = data[0] + data[1] + data[2], but it is also true for every i >= N because, before the subtraction, sum is data[i-N] + ... + data[i-2] + data[i-1].


I feel this can be elegantly solved using bottleneck

See basic sample below:

import numpy as np
import bottleneck as bn

a = np.random.randint(4, 1000, size=100)
mm = bn.move_mean(a, window=5, min_count=1)
  • "mm" is the moving mean for "a".

  • "window" is the max number of entries to consider for moving mean.

  • "min_count" is min number of entries to consider for moving mean (e.g. for first few elements or if the array has nan values).

The good part is Bottleneck helps to deal with nan values and it's also very efficient.

  • This lib is really fast. The pure Python moving average function is slow. Bootleneck is a PyData library, which I think is stable and can gain continuous support from the Python community, so why not use it?
    – GoingMyWay
    Commented Jan 20, 2020 at 3:56

I haven't yet checked how fast this is, but you could try:

from collections import deque

cache = deque() # keep track of seen values
n = 10          # window size
A = xrange(100) # some dummy iterable
cum_sum = 0     # initialize cumulative sum

for t, val in enumerate(A, 1):
    cum_sum += val
    if t < n:
        avg = cum_sum / float(t)
    else:                           # if window is saturated,
        cum_sum -= cache.popleft()  # subtract oldest value
        avg = cum_sum / float(n)
  • 2
    This is what I was going to do. Can anyone please critique why this is a bad way to go?
    – staggart
    Commented Dec 29, 2015 at 21:06
  • 1
    This simple python solution worked well for me without requiring numpy. I ended up rolling it into a class for re-use. Commented Jan 27, 2016 at 16:22

Instead of numpy or scipy, I would recommend pandas to do this more swiftly:


This takes the moving average (MA) of 3 periods of the column "data". You can also calculate the shifted versions, for example the one that excludes the current cell (shifted one back) can be calculated easily as:

  • How is this different from the solution proposed in 2016?
    – Mr. T
    Commented Jun 16, 2018 at 13:56
  • 3
    The solution proposed in 2016 uses pandas.rolling_mean while mine uses pandas.DataFrame.rolling. You can also calculate moving min(), max(), sum() etc. as well as mean() with this method easily. Commented Jun 16, 2018 at 15:21
  • In the former you need to use a different method like pandas.rolling_min, pandas.rolling_max etc. They are similar yet different. Commented Jun 16, 2018 at 15:29

Python standard library solution

This generator-function takes an iterable and a window size N and yields the average over the current values inside the window. It uses a deque, which is a datastructure similar to a list, but optimized for fast modifications (pop, append) at both endpoints.

from collections import deque
from itertools import islice

def sliding_avg(iterable, N):        
    it = iter(iterable)
    window = deque(islice(it, N))        
    num_vals = len(window)

    if num_vals < N:
        msg = 'window size {} exceeds total number of values {}'
        raise ValueError(msg.format(N, num_vals))

    N = float(N) # force floating point division if using Python 2
    s = sum(window)
    while True:
        yield s/N
            nxt = next(it)
        except StopIteration:
        s = s - window.popleft() + nxt

Here is the function in action:

>>> values = range(100)
>>> N = 5
>>> window_avg = sliding_avg(values, N)
>>> next(window_avg) # (0 + 1 + 2 + 3 + 4)/5
>>> 2.0
>>> next(window_avg) # (1 + 2 + 3 + 4 + 5)/5
>>> 3.0
>>> next(window_avg) # (2 + 3 + 4 + 5 + 6)/5
>>> 4.0

A bit late to the party, but I've made my own little function that does NOT wrap around the ends or pads with zeroes that are then used to find the average as well. As a further treat is, that it also re-samples the signal at linearly spaced points. Customize the code at will to get other features.

The method is a simple matrix multiplication with a normalized Gaussian kernel.

def running_mean(y_in, x_in, N_out=101, sigma=1):
    Returns running mean as a Bell-curve weighted average at evenly spaced
    points. Does NOT wrap signal around, or pad with zeros.
    y_in -- y values, the values to be smoothed and re-sampled
    x_in -- x values for array
    Keyword arguments:
    N_out -- NoOf elements in resampled array.
    sigma -- 'Width' of Bell-curve in units of param x .
    import numpy as np
    N_in = len(y_in)

    # Gaussian kernel
    x_out = np.linspace(np.min(x_in), np.max(x_in), N_out)
    x_in_mesh, x_out_mesh = np.meshgrid(x_in, x_out)
    gauss_kernel = np.exp(-np.square(x_in_mesh - x_out_mesh) / (2 * sigma**2))
    # Normalize kernel, such that the sum is one along axis 1
    normalization = np.tile(np.reshape(np.sum(gauss_kernel, axis=1), (N_out, 1)), (1, N_in))
    gauss_kernel_normalized = gauss_kernel / normalization
    # Perform running average as a linear operation
    y_out = gauss_kernel_normalized @ y_in

    return y_out, x_out

A simple usage on a sinusoidal signal with added normal distributed noise: enter image description here

  • This does not work for me (python 3.6). 1 There is no function named sum, using np.sum instead 2 The @ operator (no idea what that is) throws an error. I may look into it later but I'm lacking the time right now
    – Bastian
    Commented Sep 26, 2017 at 12:14
  • The @ is the matrix multiplication operator which implements np.matmul. Check if your y_in array is a numpy array, that might be the problem.
    – xyzzyqed
    Commented Jul 24, 2018 at 9:45
  • Is this really a running average, or just a smoothing method? The function "size" is not defined; it should be len.
    – KeithB
    Commented Dec 4, 2020 at 10:55
  • 1
    size and sum should be len and np.sum. I have tried to edit these.
    – c z
    Commented May 14, 2021 at 15:49
  • @KeithB A running average is a (very simple) smoothing method. Using gaussian KDE is more complex, but means less weight applies to points further away, rather than using a hard window. But yes, it will follow the average (of a normal distribution).
    – c z
    Commented May 14, 2021 at 15:57

Another approach to find moving average without using numpy or pandas

import itertools
sample = [2, 6, 10, 8, 11, 10]
    lambda a,b: b/a, 
    enumerate(itertools.accumulate(sample), 1))

will print [2.0, 4.0, 6.0, 6.5, 7.4, 7.833333333333333]

  • 2.0 = (2)/1
  • 4.0 = (2 + 6) / 2
  • 6.0 = (2 + 6 + 10) / 3
  • ...
  • itertools.accumulate does not exist in python 2.7, but does in python 3.4
    – grayaii
    Commented Aug 3, 2016 at 18:30
  • What if one wants a window size? Commented Jul 14, 2022 at 22:16

There are many answers above about calculating a running mean. My answer adds two extra features:

  1. ignores nan values
  2. calculates the mean for the N neighboring values NOT including the value of interest itself

This second feature is particularly useful for determining which values differ from the general trend by a certain amount.

I use numpy.cumsum since it is the most time-efficient method (see Alleo's answer above).

N=10 # number of points to test on each side of point of interest, best if even
padded_x = np.insert(np.insert( np.insert(x, len(x), np.empty(int(N/2))*np.nan), 0, np.empty(int(N/2))*np.nan ),0,0)
n_nan = np.cumsum(np.isnan(padded_x))
cumsum = np.nancumsum(padded_x) 
window_sum = cumsum[N+1:] - cumsum[:-(N+1)] - x # subtract value of interest from sum of all values within window
window_n_nan = n_nan[N+1:] - n_nan[:-(N+1)] - np.isnan(x)
window_n_values = (N - window_n_nan)
movavg = (window_sum) / (window_n_values)

This code works for even Ns only. It can be adjusted for odd numbers by changing the np.insert of padded_x and n_nan.

Example output (raw in black, movavg in blue): raw data (black) and moving average (blue) of 10 points around each value, not including that value. nan values are ignored.

This code can be easily adapted to remove all moving average values calculated from fewer than cutoff = 3 non-nan values.

window_n_values = (N - window_n_nan).astype(float) # dtype must be float to set some values to nan
cutoff = 3
window_n_values[window_n_values<cutoff] = np.nan
movavg = (window_sum) / (window_n_values)

raw data (black) and moving average (blue) while ignoring any window with fewer than 3 non-nan values


There is a comment by mab buried in one of the answers above which has this method. bottleneck has move_mean which is a simple moving average:

import numpy as np
import bottleneck as bn

a = np.arange(10) + np.random.random(10)

mva = bn.move_mean(a, window=2, min_count=1)

min_count is a handy parameter that will basically take the moving average up to that point in your array. If you don't set min_count, it will equal window, and everything up to window points will be nan.


With @Aikude's variables, I wrote one-liner.

import numpy as np

mylist = [1, 2, 3, 4, 5, 6, 7]
N = 3

mean = [np.mean(mylist[x:x+N]) for x in range(len(mylist)-N+1)]

>>> [2.0, 3.0, 4.0, 5.0, 6.0]

All the aforementioned solutions are poor because they lack

  • speed due to a native python instead of a numpy vectorized implementation,
  • numerical stability due to poor use of numpy.cumsum, or
  • speed due to O(len(x) * w) implementations as convolutions.


import numpy
m = 10000
x = numpy.random.rand(m)
w = 1000

Note that x_[:w].sum() equals x[:w-1].sum(). So for the first average the numpy.cumsum(...) adds x[w] / w (via x_[w+1] / w), and subtracts 0 (from x_[0] / w). This results in x[0:w].mean()

Via cumsum, you'll update the second average by additionally add x[w+1] / w and subtracting x[0] / w, resulting in x[1:w+1].mean().

This goes on until x[-w:].mean() is reached.

x_ = numpy.insert(x, 0, 0)
sliding_average = x_[:w].sum() / w + numpy.cumsum(x_[w:] - x_[:-w]) / w

This solution is vectorized, O(m), readable and numerically stable.

  • Nice solution. I will try to adapt it with masks so that it handles nans in the original data and places nans in the sliding average only if the current window contained a nan. The use of np.cumsum unfortunately makes the first nan encountered "contaminate" the rest of the calculation.
    – Guimoute
    Commented Apr 9, 2021 at 15:47
  • I would create two versions of the signals, one where the nans are replaces by zero, and one from np.isnan. Apply the sliding window on both, then replace in the first outcome with nan those where the second outcome is > 0.
    – Herbert
    Commented Apr 11, 2021 at 11:48

This question is now even older than when NeXuS wrote about it last month, BUT I like how his code deals with edge cases. However, because it is a "simple moving average," its results lag behind the data they apply to. I thought that dealing with edge cases in a more satisfying way than NumPy's modes valid, same, and full could be achieved by applying a similar approach to a convolution() based method.

My contribution uses a central running average to align its results with their data. When there are too few points available for the full-sized window to be used, running averages are computed from successively smaller windows at the edges of the array. [Actually, from successively larger windows, but that's an implementation detail.]

import numpy as np

def running_mean(l, N):
    # Also works for the(strictly invalid) cases when N is even.
    if (N//2)*2 == N:
        N = N - 1
    front = np.zeros(N//2)
    back = np.zeros(N//2)

    for i in range(1, (N//2)*2, 2):
        front[i//2] = np.convolve(l[:i], np.ones((i,))/i, mode = 'valid')
    for i in range(1, (N//2)*2, 2):
        back[i//2] = np.convolve(l[-i:], np.ones((i,))/i, mode = 'valid')
    return np.concatenate([front, np.convolve(l, np.ones((N,))/N, mode = 'valid'), back[::-1]])

It's relatively slow because it uses convolve(), and could likely be spruced up quite a lot by a true Pythonista, however, I believe that the idea stands.


A new convolve recipe was merged into Python 3.10.


import collections, operator

from itertools import chain, repeat

size = 3 + 1
kernel = [1/size] * size                                              


def convolve(signal, kernel):
    # See:  https://betterexplained.com/articles/intuitive-convolution/
    # convolve(data, [0.25, 0.25, 0.25, 0.25]) --> Moving average (blur)
    # convolve(data, [1, -1]) --> 1st finite difference (1st derivative)
    # convolve(data, [1, -2, 1]) --> 2nd finite difference (2nd derivative)
    kernel = list(reversed(kernel))
    n = len(kernel)
    window = collections.deque([0] * n, maxlen=n)
    for x in chain(signal, repeat(0, n-1)):
        yield sum(map(operator.mul, kernel, window))


list(convolve(range(1, 6), kernel))
# [0.25, 0.75, 1.5, 2.5, 3.5, 3.0, 2.25, 1.25]


A convolution is a general mathematical operation that can be applied to moving averages. The idea is, given some data, you slide a subset of data (a window) as a "mask" or "kernel" across the data, carrying out a particular mathematical operation over each window. In the case of moving averages, the kernel is the average:

enter image description here

You can use this implementation now through more_itertools.convolve. more_itertools is a popular third-party package; install via > pip install more_itertools.


From reading the other answers I don't think this is what the question asked for, but I got here with the need of keeping a running average of a list of values that was growing in size.

So if you want to keep a list of values that you are acquiring from somewhere (a site, a measuring device, etc.) and the average of the last n values updated, you can use the code bellow, that minimizes the effort of adding new elements:

class Running_Average(object):
    def __init__(self, buffer_size=10):
        Create a new Running_Average object.

        This object allows the efficient calculation of the average of the last
        `buffer_size` numbers added to it.

        >>> a = Running_Average(2)
        >>> a.add(1)
        >>> a.get()
        >>> a.add(1)  # there are two 1 in buffer
        >>> a.get()
        >>> a.add(2)  # there's a 1 and a 2 in the buffer
        >>> a.get()
        >>> a.add(2)
        >>> a.get()  # now there's only two 2 in the buffer
        self._buffer_size = int(buffer_size)  # make sure it's an int

    def add(self, new):
        Add a new number to the buffer, or replaces the oldest one there.
        new = float(new)  # make sure it's a float
        n = len(self._buffer)
        if n < self.buffer_size:  # still have to had numbers to the buffer.
            if self._average != self._average:  # ~ if isNaN().
                self._average = new  # no previous numbers, so it's new.
                self._average *= n  # so it's only the sum of numbers.
                self._average += new  # add new number.
                self._average /= (n+1)  # divide by new number of numbers.
        else:  # buffer full, replace oldest value.
            old = self._buffer[self._index]  # the previous oldest number.
            self._buffer[self._index] = new  # replace with new one.
            self._index += 1  # update the index and make sure it's...
            self._index %= self.buffer_size  # ... smaller than buffer_size.
            self._average -= old/self.buffer_size  # remove old one...
            self._average += new/self.buffer_size  # ...and add new one...
            # ... weighted by the number of elements.

    def __call__(self):
        Return the moving average value, for the lazy ones who don't want
        to write .get .
        return self._average

    def get(self):
        Return the moving average value.
        return self()

    def reset(self):
        Reset the moving average.

        If for some reason you don't want to just create a new one.
        self._buffer = []  # could use np.empty(self.buffer_size)...
        self._index = 0  # and use this to keep track of how many numbers.
        self._average = float('nan')  # could use np.NaN .

    def get_buffer_size(self):
        Return current buffer_size.
        return self._buffer_size

    def set_buffer_size(self, buffer_size):
        >>> a = Running_Average(10)
        >>> for i in range(15):
        ...     a.add(i)
        >>> a()
        >>> a._buffer  # should not access this!!
        [10.0, 11.0, 12.0, 13.0, 14.0, 5.0, 6.0, 7.0, 8.0, 9.0]

        Decreasing buffer size:
        >>> a.buffer_size = 6
        >>> a._buffer  # should not access this!!
        [9.0, 10.0, 11.0, 12.0, 13.0, 14.0]
        >>> a.buffer_size = 2
        >>> a._buffer
        [13.0, 14.0]

        Increasing buffer size:
        >>> a.buffer_size = 5
        Warning: no older data available!
        >>> a._buffer
        [13.0, 14.0]

        Keeping buffer size:
        >>> a = Running_Average(10)
        >>> for i in range(15):
        ...     a.add(i)
        >>> a()
        >>> a._buffer  # should not access this!!
        [10.0, 11.0, 12.0, 13.0, 14.0, 5.0, 6.0, 7.0, 8.0, 9.0]
        >>> a.buffer_size = 10  # reorders buffer!
        >>> a._buffer
        [5.0, 6.0, 7.0, 8.0, 9.0, 10.0, 11.0, 12.0, 13.0, 14.0]
        buffer_size = int(buffer_size)
        # order the buffer so index is zero again:
        new_buffer = self._buffer[self._index:]
        self._index = 0
        if self._buffer_size < buffer_size:
            print('Warning: no older data available!')  # should use Warnings!
            diff = self._buffer_size - buffer_size
            new_buffer = new_buffer[diff:]
        self._buffer_size = buffer_size
        self._buffer = new_buffer

    buffer_size = property(get_buffer_size, set_buffer_size)

And you can test it with, for example:

def graph_test(N=200):
    import matplotlib.pyplot as plt
    values = list(range(N))
    values_average_calculator = Running_Average(N/2)
    values_averages = []
    for value in values:
    fig, ax = plt.subplots(1, 1)
    ax.plot(values, label='values')
    ax.plot(values_averages, label='averages')
    ax.set_xlim(0, N)
    ax.set_ylim(0, N)

Which gives:

Values and their average as a function of values #


For educational purposes, let me add two more Numpy solutions (which are slower than the cumsum solution):

import numpy as np
from numpy.lib.stride_tricks import as_strided

def ra_strides(arr, window):
    ''' Running average using as_strided'''
    n = arr.shape[0] - window + 1
    arr_strided = as_strided(arr, shape=[n, window], strides=2*arr.strides)
    return arr_strided.mean(axis=1)

def ra_add(arr, window):
    ''' Running average using add.reduceat'''
    n = arr.shape[0] - window + 1
    indices = np.array([0, window]*n) + np.repeat(np.arange(n), 2)
    arr = np.append(arr, 0)
    return np.add.reduceat(arr, indices )[::2]/window

Functions used: as_strided, add.reduceat


Use Only Python Standard Library (Memory Efficient)

Just give another version of using the standard library deque only. It's quite a surprise to me that most of the answers are using pandas or numpy.

def moving_average(iterable, n=3):
    d = deque(maxlen=n)
    for i in iterable:
        if len(d) == n:
            yield sum(d)/n

r = moving_average([40, 30, 50, 46, 39, 44])
assert list(r) == [40.0, 42.0, 45.0, 43.0]

Actually I found another implementation in python docs

def moving_average(iterable, n=3):
    # moving_average([40, 30, 50, 46, 39, 44]) --> 40.0 42.0 45.0 43.0
    # http://en.wikipedia.org/wiki/Moving_average
    it = iter(iterable)
    d = deque(itertools.islice(it, n-1))
    s = sum(d)
    for elem in it:
        s += elem - d.popleft()
        yield s / n

However the implementation seems to me is a bit more complex than it should be. But it must be in the standard python docs for a reason, could someone comment on the implementation of mine and the standard doc?

  • 3
    One big difference that you keep summing the window members each iteration, and they efficiently update the sum (remove one member and add another). in terms of complexity you are doing O(n*d) calculations (d being the size of the window, n size of iterable) and they are doing O(n)
    – Iftah
    Commented Oct 15, 2019 at 9:02
  • @Iftah, nice, thanks for the explanation, you are right.
    – MaThMaX
    Commented Oct 16, 2019 at 3:33

How about a moving average filter? It is also a one-liner and has the advantage, that you can easily manipulate the window type if you need something else than the rectangle, ie. a N-long simple moving average of an array a:

lfilter(np.ones(N)/N, [1], a)[N:]

And with the triangular window applied:

lfilter(np.ones(N)*scipy.signal.triang(N)/N, [1], a)[N:]

Note: I usually discard the first N samples as bogus hence [N:] at the end, but it is not necessary and the matter of a personal choice only.


My solution is based on the "simple moving average" from Wikipedia.

from numba import jit
def sma(x, N):
    s = np.zeros_like(x)
    k = 1 / N
    s[0] = x[0] * k
    for i in range(1, N + 1):
        s[i] = s[i - 1] + x[i] * k
    for i in range(N, x.shape[0]):
        s[i] = s[i - 1] + (x[i] - x[i - N]) * k
    s = s[N - 1:]
    return s

Comparison to the previously suggested solutions shows that it is twice faster than the fastest solution by scipy, "uniform_filter1d", and has the same error order. Speed tests:

import numpy as np    
x = np.random.random(10000000)
N = 1000

from scipy.ndimage.filters import uniform_filter1d
%timeit uniform_filter1d(x, size=N)
95.7 ms ± 9.34 ms per loop (mean ± std. dev. of 7 runs, 10 loops each)
%timeit sma(x, N)
47.3 ms ± 3.42 ms per loop (mean ± std. dev. of 7 runs, 1 loop each)

Error comparison:

np.max(np.abs(np.convolve(x, np.ones((N,))/N, mode='valid') - uniform_filter1d(x, size=N, mode='constant', origin=-(N//2))[:-(N-1)]))
np.max(np.abs(np.convolve(x, np.ones((N,))/N, mode='valid') - sma(x, N)))

Although there are solutions for this question here, please take a look at my solution. It is very simple and working well.

import numpy as np
dataset = np.asarray([1, 2, 3, 4, 5, 6, 7])
ma = list()
window = 3
for t in range(0, len(dataset)):
    if t+window <= len(dataset):
        indices = range(t, t+window)
        ma.append(np.average(np.take(dataset, indices)))
    ma = np.asarray(ma)

Another solution just using a standard library and deque:

from collections import deque
import itertools

def moving_average(iterable, n=3):
    # http://en.wikipedia.org/wiki/Moving_average
    it = iter(iterable) 
    # create an iterable object from input argument
    d = deque(itertools.islice(it, n-1))  
    # create deque object by slicing iterable
    s = sum(d)
    for elem in it:
        s += elem - d.popleft()
        yield s / n

# example on how to use it
for i in  moving_average([40, 30, 50, 46, 39, 44]):

# 40.0
# 42.0
# 45.0
# 43.0

If you have to do this repeatedly for very small arrays (less than about 200 elements) I found the fastest results by just using linear algebra. The slowest part is to set up your multiplication matrix y, which you only have to do once, but after that it might be faster.

import numpy as np
import random 

N = 100      # window size
size =200     # array length

x = np.random.random(size)
y = np.eye(size, dtype=float)

# prepare matrix
for i in range(size):
  y[i,i:i+N] = 1./N
# calculate running mean
z = np.inner(x,y.T)[N-1:]


There is another method using built-in numpy functions (np.lib.stride_tricks.sliding_window_view), however it ends up being about the same speed as (or slightly faster than) np.convolve.

Following the structure of the popular answers, the way to do it is:

M = 10**6
x = np.random.random(M)
N = 10**3
result3 = np.lib.stride_tricks.sliding_window_view(x, N).mean(axis=-1)

Here, the numpy function call creates an M by N matrix, then mean(axis=-1) just computes the average.

It's nice as a one-liner (and similar in speed to np.convolve here), but is slower than some of the other approaches (like np.cumsum here):

>>> t0 = time.time()
>>> result3 = np.lib.stride_tricks.sliding_window_view(x, N).mean(axis=-1)
>>> t1 = time.time()
>>> print(f'{t1-t0}')

# the convolve solution
>>> t0 = time.time(); result1 = np.convolve(x, np.ones((N,))/N, mode='valid'); t1 = time.time(); print(f'{t1-t0}')

# the cumsum solution
>>> t0 = time.time(); result2 = running_mean(x, N); t1 = time.time(); print(f'{t1-t0}')

See the numpy docs for more info about numpy.lib.stride_tricks.sliding_window_view.

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