# Rolling or sliding window iterator?

I need a rolling window (aka sliding window) iterable over a sequence/iterator/generator. (Default Python iteration could be considered a special case, where the window length is 1.) I'm currently using the following code. How can I do it more elegantly and/or efficiently?

``````def rolling_window(seq, window_size):
it = iter(seq)
win = [it.next() for cnt in xrange(window_size)] # First window
yield win
for e in it: # Subsequent windows
win[:-1] = win[1:]
win[-1] = e
yield win

if __name__=="__main__":
for w in rolling_window(xrange(6), 3):
print w

"""Example output:
[0, 1, 2]
[1, 2, 3]
[2, 3, 4]
[3, 4, 5]
"""
``````

For the specific case of `window_size == 2` (i.e., iterating over adjacent, overlapping pairs in a sequence), see also How can I iterate over overlapping (current, next) pairs of values from a list?.

• If you're looking to perform some kind of operation on each window as you iterate (e.g. `sum()` or `max()`) it is worth bearing in mind that there are efficient algorithms to compute the new value for each window in constant time (irrespective of window size). I have collected some of these algorithms together in a Python library: rolling. Apr 21, 2018 at 12:07

There's one in an old version of the Python docs with `itertools` examples:

``````from itertools import islice

def window(seq, n=2):
"Returns a sliding window (of width n) over data from the iterable"
"   s -> (s0,s1,...s[n-1]), (s1,s2,...,sn), ...                   "
it = iter(seq)
result = tuple(islice(it, n))
if len(result) == n:
yield result
for elem in it:
result = result[1:] + (elem,)
yield result
``````

The one from the docs is a little more succinct and uses `itertools` to greater effect I imagine.

If your iterator is a simple list/tuple a simple way to slide through it with a specified window size would be:

``````seq = [0, 1, 2, 3, 4, 5]
window_size = 3

for i in range(len(seq) - window_size + 1):
print(seq[i: i + window_size])
``````

Output:

``````[0, 1, 2]
[1, 2, 3]
[2, 3, 4]
[3, 4, 5]
``````
• Nice answer, but (and I know you're just reproducing the recipe as linked), I wonder why the default window size should be 2? Should it have a default at all? Jul 25, 2011 at 22:02
• @TakenMacGuy: I dunno what the author of that recipe's reasoning is, but I'd also choose 2. 2 is the smallest useful window size (otherwise you're just iterating and don't need the window), and it is also common to need to know the previous (or next) item, arguably more so than any other specific n. Jul 26, 2011 at 23:41
• Does anyone know why this example was removed from the docs? Was there something wrong with it, or there is an easier alternative now?
– wim
Apr 15, 2013 at 15:10
• got curious about the example removal and found rhettinger committed on Oct 26, 2003: Replace the window() example with pairwise() which demonstrates tee(). Jun 17, 2016 at 16:03
• When would one enter the `for elem in it` loop? Jan 12, 2018 at 18:12

This seems tailor-made for a `collections.deque` since you essentially have a FIFO (add to one end, remove from the other). However, even if you use a `list` you shouldn't be slicing twice; instead, you should probably just `pop(0)` from the list and `append()` the new item.

Here is an optimized deque-based implementation patterned after your original:

``````from collections import deque

def window(seq, n=2):
it = iter(seq)
win = deque((next(it, None) for _ in xrange(n)), maxlen=n)
yield win
append = win.append
for e in it:
append(e)
yield win
``````

In my tests it handily beats everything else posted here most of the time, though pillmuncher's `tee` version beats it for large iterables and small windows. On larger windows, the `deque` pulls ahead again in raw speed.

Access to individual items in the `deque` may be faster or slower than with lists or tuples. (Items near the beginning are faster, or items near the end if you use a negative index.) I put a `sum(w)` in the body of my loop; this plays to the deque's strength (iterating from one item to the next is fast, so this loop ran a a full 20% faster than the next fastest method, pillmuncher's). When I changed it to individually look up and add items in a window of ten, the tables turned and the `tee` method was 20% faster. I was able to recover some speed by using negative indexes for the last five terms in the addition, but `tee` was still a little faster. Overall I would estimate that either one is plenty fast for most uses and if you need a little more performance, profile and pick the one that works best.

• `yield win` should be `yield tuple(win)` or `yield list(win)` to prevent returning an iterator of references to the same `deque` object. Mar 6, 2013 at 19:40
• I submitted this to PyPI. Install with `pip install sliding_window`, and run with `from sliding_window import window`. Feb 24, 2014 at 7:36
• You're in for a shock if you think `list(window(range(10)))` should produce something like [[0,1],[1,2],[2,3],...]
– Paul
Feb 18, 2016 at 20:47
• It obviously won't; you'd need to do something like `list(list(x) for x in window(range(10)))` or else add that to the iterator. For some applications this will matter, for others not, and since I was going for speed I elected not and put the onus on the caller to copy the window if needed. Feb 18, 2016 at 21:56
• If you add back the needed `tuple()` before yield, this method does not have any advantage over the others. Mar 4, 2017 at 6:30

I like `tee()`:

``````from itertools import tee, izip

def window(iterable, size):
iters = tee(iterable, size)
for i in xrange(1, size):
for each in iters[i:]:
next(each, None)
return izip(*iters)

for each in window(xrange(6), 3):
print list(each)
``````

gives:

``````[0, 1, 2]
[1, 2, 3]
[2, 3, 4]
[3, 4, 5]
``````
• From my quick `timeit` tests, this is much slower than Daniel DePaolo's (by about a 2:1 ratio) and doesn't feel much "nicer". Jul 25, 2011 at 23:15
• @David B.: On my box it's only about 8% slower than Daniel DePaolo's. Jul 25, 2011 at 23:42
• @pillmuncher: Python 2.7 or 3.x? I was using 2.7. The ratio is also fairly sensitive to the value of `size`. If you increase it (e.g., if the iterable is 100000 elements long, make the window size 1000), you may see an increase. Jul 26, 2011 at 0:29
• @David B.: What you say makes sense. In my code the setup time for `iters` is O(size!), and calling `next()` many times (in `izip()`) is probably a lot more time consuming than copying a tuple twice. I was using Python 2.6.5, BTW. Jul 26, 2011 at 0:46
• @pillmuncher: You mean, setup time for `iters`is O(size^2), right? Jul 27, 2011 at 20:51

There is a library which does exactly what you need:

``````import more_itertools
list(more_itertools.windowed([1,2,3,4,5,6,7,8,9,10,11,12,13,14,15],n=3, step=3))

Out: [(1, 2, 3), (4, 5, 6), (7, 8, 9), (10, 11, 12), (13, 14, 15)]
``````
• `step=3` should actually be removed to match the OP's request: `list(more_itertools.windowed(range(6), 3))` Jul 6, 2019 at 20:02
• But it returned a list of tuples. Mar 3, 2022 at 17:18
• Another way of doing what this answer does (getting non-overlapping chunks) is more_itertools.chunked. `list(more_itertools.chunked([1,2,3,4,5,6,7,8,9,10,11,12,13,14,15],n=3))` Oct 11, 2022 at 15:24

Here's a generalization that adds support for `step`, `fillvalue` parameters:

``````from collections import deque
from itertools import islice

def sliding_window(iterable, size=2, step=1, fillvalue=None):
if size < 0 or step < 1:
raise ValueError
it = iter(iterable)
q = deque(islice(it, size), maxlen=size)
if not q:
return  # empty iterable or size == 0
q.extend(fillvalue for _ in range(size - len(q)))  # pad to size
while True:
yield iter(q)  # iter() to avoid accidental outside modifications
try:
q.append(next(it))
except StopIteration: # Python 3.5 pep 479 support
return
q.extend(next(it, fillvalue) for _ in range(step - 1))
``````

It yields in chunks `size` items at a time rolling `step` positions per iteration padding each chunk with `fillvalue` if necessary. Example for `size=4, step=3, fillvalue='*'`:

`````` [a b c d]e f g h i j k l m n o p q r s t u v w x y z
a b c[d e f g]h i j k l m n o p q r s t u v w x y z
a b c d e f[g h i j]k l m n o p q r s t u v w x y z
a b c d e f g h i[j k l m]n o p q r s t u v w x y z
a b c d e f g h i j k l[m n o p]q r s t u v w x y z
a b c d e f g h i j k l m n o[p q r s]t u v w x y z
a b c d e f g h i j k l m n o p q r[s t u v]w x y z
a b c d e f g h i j k l m n o p q r s t u[v w x y]z
a b c d e f g h i j k l m n o p q r s t u v w x[y z * *]
``````

For an example of use case for the `step` parameter, see Processing a large .txt file in python efficiently.

Just a quick contribution.

Since the current python docs don't have "window" in the itertool examples (i.e., at the bottom of http://docs.python.org/library/itertools.html), here's an snippet based on the code for grouper which is one of the examples given:

``````import itertools as it
def window(iterable, size):
shiftedStarts = [it.islice(iterable, s, None) for s in xrange(size)]
return it.izip(*shiftedStarts)
``````

Basically, we create a series of sliced iterators, each with a starting point one spot further forward. Then, we zip these together. Note, this function returns a generator (it is not directly a generator itself).

Much like the appending-element and advancing-iterator versions above, the performance (i.e., which is best) varies with list size and window size. I like this one because it is a two-liner (it could be a one-liner, but I prefer naming concepts).

It turns out that the above code is wrong. It works if the parameter passed to iterable is a sequence but not if it is an iterator. If it is an iterator, the same iterator is shared (but not tee'd) among the islice calls and this breaks things badly.

Here is some fixed code:

``````import itertools as it
def window(iterable, size):
itrs = it.tee(iterable, size)
shiftedStarts = [it.islice(anItr, s, None) for s, anItr in enumerate(itrs)]
return it.izip(*shiftedStarts)
``````

Also, one more version for the books. Instead of copying an iterator and then advancing copies many times, this version makes pairwise copies of each iterator as we move the starting position forward. Thus, iterator t provides both the "complete" iterator with starting point at t and also the basis for creating iterator t + 1:

``````import itertools as it
def window4(iterable, size):
complete_itr, incomplete_itr = it.tee(iterable, 2)
iters = [complete_itr]
for i in xrange(1, size):
incomplete_itr.next()
complete_itr, incomplete_itr = it.tee(incomplete_itr, 2)
iters.append(complete_itr)
return it.izip(*iters)
``````
``````def GetShiftingWindows(thelist, size):
return [ thelist[x:x+size] for x in range( len(thelist) - size + 1 ) ]

>> a = [1, 2, 3, 4, 5]
>> GetShiftingWindows(a, 3)
[ [1, 2, 3], [2, 3, 4], [3, 4, 5] ]
``````
• The instant you see "range(len" in Python it's a code smell. Mar 3, 2017 at 17:57
• @MarkLawrence What makes you think `range(len` is a bad pattern in python? Jan 21, 2018 at 20:33

Just to show how you can combine `itertools` recipes, I'm extending the `pairwise` recipe as directly as possible back into the `window` recipe using the `consume` recipe:

``````def consume(iterator, n):
# Use functions that consume iterators at C speed.
if n is None:
# feed the entire iterator into a zero-length deque
collections.deque(iterator, maxlen=0)
else:
# advance to the empty slice starting at position n
next(islice(iterator, n, n), None)

def window(iterable, n=2):
"s -> (s0, ...,s(n-1)), (s1, ...,sn), (s2, ..., s(n+1)), ..."
iters = tee(iterable, n)
# Could use enumerate(islice(iters, 1, None), 1) to avoid consume(it, 0), but that's
# slower for larger window sizes, while saving only small fixed "noop" cost
for i, it in enumerate(iters):
consume(it, i)
return zip(*iters)
``````

The `window` recipe is the same as for `pairwise`, it just replaces the single element "consume" on the second `tee`-ed iterator with progressively increasing consumes on `n - 1` iterators. Using `consume` instead of wrapping each iterator in `islice` is marginally faster (for sufficiently large iterables) since you only pay the `islice` wrapping overhead during the `consume` phase, not during the process of extracting each window-ed value (so it's bounded by `n`, not the number of items in `iterable`).

Performance-wise, compared to some other solutions, this is pretty good (and better than any of the other solutions I tested as it scales). Tested on Python 3.5.0, Linux x86-64, using `ipython` `%timeit` magic.

kindall's the `deque` solution, tweaked for performance/correctness by using `islice` instead of a home-rolled generator expression and testing the resulting length so it doesn't yield results when the iterable is shorter than the window, as well as passing the `maxlen` of the `deque` positionally instead of by keyword (makes a surprising difference for smaller inputs):

``````>>> %timeit -r5 deque(windowkindall(range(10), 3), 0)
100000 loops, best of 5: 1.87 μs per loop
>>> %timeit -r5 deque(windowkindall(range(1000), 3), 0)
10000 loops, best of 5: 72.6 μs per loop
>>> %timeit -r5 deque(windowkindall(range(1000), 30), 0)
1000 loops, best of 5: 71.6 μs per loop
``````

Same as previous adapted kindall solution, but with each `yield win` changed to `yield tuple(win)` so storing results from the generator works without all stored results really being a view of the most recent result (all other reasonable solutions are safe in this scenario), and adding `tuple=tuple` to the function definition to move use of `tuple` from the `B` in `LEGB` to the `L`:

``````>>> %timeit -r5 deque(windowkindalltupled(range(10), 3), 0)
100000 loops, best of 5: 3.05 μs per loop
>>> %timeit -r5 deque(windowkindalltupled(range(1000), 3), 0)
10000 loops, best of 5: 207 μs per loop
>>> %timeit -r5 deque(windowkindalltupled(range(1000), 30), 0)
1000 loops, best of 5: 348 μs per loop
``````

`consume`-based solution shown above:

``````>>> %timeit -r5 deque(windowconsume(range(10), 3), 0)
100000 loops, best of 5: 3.92 μs per loop
>>> %timeit -r5 deque(windowconsume(range(1000), 3), 0)
10000 loops, best of 5: 42.8 μs per loop
>>> %timeit -r5 deque(windowconsume(range(1000), 30), 0)
1000 loops, best of 5: 232 μs per loop
``````

Same as `consume`, but inlining `else` case of `consume` to avoid function call and `n is None` test to reduce runtime, particularly for small inputs where the setup overhead is a meaningful part of the work:

``````>>> %timeit -r5 deque(windowinlineconsume(range(10), 3), 0)
100000 loops, best of 5: 3.57 μs per loop
>>> %timeit -r5 deque(windowinlineconsume(range(1000), 3), 0)
10000 loops, best of 5: 40.9 μs per loop
>>> %timeit -r5 deque(windowinlineconsume(range(1000), 30), 0)
1000 loops, best of 5: 211 μs per loop
``````

(Side-note: A variant on `pairwise` that uses `tee` with the default argument of 2 repeatedly to make nested `tee` objects, so any given iterator is only advanced once, not independently consumed an increasing number of times, similar to MrDrFenner's answer is similar to non-inlined `consume` and slower than the inlined `consume` on all tests, so I've omitted it those results for brevity).

As you can see, if you don't care about the possibility of the caller needing to store results, my optimized version of kindall's solution wins most of the time, except in the "large iterable, small window size case" (where inlined `consume` wins); it degrades quickly as the iterable size increases, while not degrading at all as the window size increases (every other solution degrades more slowly for iterable size increases, but also degrades for window size increases). It can even be adapted for the "need tuples" case by wrapping in `map(tuple, ...)`, which runs ever so slightly slower than putting the tupling in the function, but it's trivial (takes 1-5% longer) and lets you keep the flexibility of running faster when you can tolerate repeatedly returning the same value.

If you need safety against returns being stored, inlined `consume` wins on all but the smallest input sizes (with non-inlined `consume` being slightly slower but scaling similarly). The `deque` & tupling based solution wins only for the smallest inputs, due to smaller setup costs, and the gain is small; it degrades badly as the iterable gets longer.

For the record, the adapted version of kindall's solution that `yield`s `tuple`s I used was:

``````def windowkindalltupled(iterable, n=2, tuple=tuple):
it = iter(iterable)
win = deque(islice(it, n), n)
if len(win) < n:
return
append = win.append
yield tuple(win)
for e in it:
append(e)
yield tuple(win)
``````

Drop the caching of `tuple` in the function definition line and the use of `tuple` in each `yield` to get the faster but less safe version.

• Obviously, this is less efficient than it could be; `consume` is general purpose (including the ability to do a complete `consume`) and thus needs an extra import and a per-use test for `n is None`. In real code, if and only if I'd determined performance was a problem, or I really needed more concise code, I'd consider inlining the `else` case of `consume` into `window`, assuming I wasn't using `consume` for anything else. But if performance hasn't been shown to be an issue, I'd keep the separate definitions; the named `consume` function makes the operation less magical/self-documenting. Dec 2, 2016 at 18:10

I use the following code as a simple sliding window that uses generators to drastically increase readability. Its speed has so far been sufficient for use in bioinformatics sequence analysis in my experience.

I include it here because I didn't see this method used yet. Again, I make no claims about its compared performance.

``````def slidingWindow(sequence,winSize,step=1):
"""Returns a generator that will iterate through
the defined chunks of input sequence. Input sequence
must be sliceable."""

# Verify the inputs
if not ((type(winSize) == type(0)) and (type(step) == type(0))):
raise Exception("**ERROR** type(winSize) and type(step) must be int.")
if step > winSize:
raise Exception("**ERROR** step must not be larger than winSize.")
if winSize > len(sequence):
raise Exception("**ERROR** winSize must not be larger than sequence length.")

# Pre-compute number of chunks to emit
numOfChunks = ((len(sequence)-winSize)/step)+1

# Do the work
for i in range(0,numOfChunks*step,step):
yield sequence[i:i+winSize]
``````
• The main drawback here is the `len(sequence)` call. This won't work if `sequence` is an iterator or generator. When the input does fit in memory, this does offer a more readable solution than with iterators. Mar 26, 2012 at 19:23
• Yes, you're right. This particular case was originally meant for scanning DNA sequences which are usually represented as strings. It certainly DOES have the limitation you mention. If you wanted you could simply test each slice to make sure its still the right length and then forget about having to know the length of the whole sequence. But it would add a bit more overhead (a len() test every iteration).
– Gus
Mar 26, 2012 at 20:19

a slightly modified version of the deque window, to make it a true rolling window. So that it starts being populated with just one element, then grows to it's maximum window size, and then shrinks as it's left edge comes near the end:

``````from collections import deque
def window(seq, n=2):
it = iter(seq)
win = deque((next(it, None) for _ in xrange(1)), maxlen=n)
yield win
append = win.append
for e in it:
append(e)
yield win
for _ in xrange(len(win)-1):
win.popleft()
yield win

for wnd in window(range(5), n=3):
print(list(wnd))
``````

this gives

``````
[0, 1]
[0, 1, 2]
[1, 2, 3]
[2, 3, 4]
[3, 4]

``````

why not

``````def pairwise(iterable):
"s -> (s0,s1), (s1,s2), (s2, s3), ..."
a, b = tee(iterable)
next(b, None)
return zip(a, b)
``````

It is documented in Python doc . You can easily extend it to wider window.

Let's make it lazy!

``````from itertools import islice, tee

def window(iterable, size):
iterators = tee(iterable, size)
iterators = [islice(iterator, i, None) for i, iterator in enumerate(iterators)]
yield from zip(*iterators)

list(window(range(5), 3))
# [(0, 1, 2), (1, 2, 3), (2, 3, 4)]
``````
``````def rolling_window(list, degree):
for i in range(len(list)-degree+1):
yield [list[i+o] for o in range(degree)]
``````

Made this for a rolling average function

• `[list[i+o] for o in range(degree)]` is equivalent to `list[i:i+degree]` Oct 24, 2021 at 14:10

# Multiple iterators!

``````def window(seq, size, step=1):
# initialize iterators
iters = [iter(seq) for i in range(size)]
# stagger iterators (without yielding)
[next(iters[i]) for j in range(size) for i in range(-1, -j-1, -1)]
while(True):
yield [next(i) for i in iters]
# next line does nothing for step = 1 (skips iterations for step > 1)
[next(i) for i in iters for j in range(step-1)]
``````

`next(it)` raises `StopIteration` when the sequence is finished, and for some cool reason that's beyond me, the yield statement here excepts it and the function returns, ignoring the leftover values that don't form a full window.

Anyway, this is the least-lines solution yet whose only requirement is that `seq` implement either `__iter__` or `__getitem__` and doesn't rely on `itertools` or `collections` besides @dansalmo's solution :)

• note: the stagger step is O(n^2) where n is the size of the window, and only happens on the first call. It could be optimized down to O(n), but it would make the code a little messier :P Oct 28, 2013 at 5:46
``````#Importing the numpy library
import numpy as np
arr = np.arange(6) #Sequence
window_size = 3
np.lib.stride_tricks.as_strided(arr, shape= (len(arr) - window_size +1, window_size),
strides = arr.strides*2)

"""Example output:

[0, 1, 2]
[1, 2, 3]
[2, 3, 4]
[3, 4, 5]
``````

"""

I tested a few solutions along with the one I came up with. I found the one I came up with to be the fastest so I thought I would share my python3 implementation.

``````import itertools
import sys

def windowed(l, stride):
return zip(*[itertools.islice(l, i, sys.maxsize) for i in range(stride)])
``````
• Looks similar to the first solution from this answer: stackoverflow.com/a/11249883/7851470 May 23, 2020 at 19:56
• @georgy I think I skipped over that answer because it was written in Python2 but I agree, it's essentially the same! May 24, 2020 at 20:11

The toolz/cytoolz package has a sliding_window function.

``````>>> from cytoolz import sliding_window
>>> list(sliding_window(3, range(6))) # returns [(0, 1, 2), (1, 2, 3), (2, 3, 4), (3, 4, 5)]
``````

In Python 3.10, we have the `itertools.pairwise(iterable)` function to slide a window with two elements:

Here's the doc :

Return successive overlapping pairs taken from the input iterable.

The number of 2-tuples in the output iterator will be one fewer than the number of inputs. It will be empty if the input iterable has fewer than two values.

Roughly equivalent to:

``````def pairwise(iterable):
# pairwise('ABCDEFG') --> AB BC CD DE EF FG
a, b = tee(iterable)
next(b, None)
return zip(a, b)
``````
``````>>> n, m = 6, 3
>>> k = n - m+1
>>> print ('{}\n'*(k)).format(*[range(i, i+m) for i in xrange(k)])
[0, 1, 2]
[1, 2, 3]
[2, 3, 4]
[3, 4, 5]
``````

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

def sliding_window(l, window_size=2):
if window_size > len(l):
raise ValueError("Window size must be smaller or equal to the number of elements in the list.")

t = []
for i in xrange(0, window_size):
t.append(l[i:])

return zip(*t)

print sliding_window(mylist, 3)
``````

Output:

``````[(1, 2, 3), (2, 3, 4), (3, 4, 5), (4, 5, 6), (5, 6, 7)]
``````

This is an old question but for those still interested there is a great implementation of a window slider using generators in this page (by Adrian Rosebrock).

It is an implementation for OpenCV however you can easily use it for any other purpose. For the eager ones i'll paste the code here but to understand it better I recommend visiting the original page.

``````def sliding_window(image, stepSize, windowSize):
# slide a window across the image
for y in xrange(0, image.shape, stepSize):
for x in xrange(0, image.shape, stepSize):
# yield the current window
yield (x, y, image[y:y + windowSize, x:x + windowSize])
``````

Tip: You can check the `.shape` of the window when iterating the generator to discard those that do not meet your requirements

Cheers

Modified DiPaolo's answer to allow arbitrary fill and variable step size

``````import itertools
def window(seq, n=2,step=1,fill=None,keep=0):
"Returns a sliding window (of width n) over data from the iterable"
"   s -> (s0,s1,...s[n-1]), (s1,s2,...,sn), ...                   "
it = iter(seq)
result = tuple(itertools.islice(it, n))
if len(result) == n:
yield result
while True:
#         for elem in it:
elem = tuple( next(it, fill) for _ in range(step))
result = result[step:] + elem
if elem[-1] is fill:
if keep:
yield result
break
yield result
``````

here is a one liner. I timed it and it's comprable to the performance of the top answer and gets progressively better with larger seq from 20% slower with len(seq) = 20 and 7% slower with len(seq) = 10000

``````zip(*[seq[i:(len(seq) - n - 1 + i)] for i in range(n)])
``````
• that is off by 2, this works: zip(*[seq[i:(len(seq) - n + 1 + i)] for i in range(n)]) Apr 30, 2020 at 13:23

Trying my part, simple, one liner, pythonic way using islice. But, may not be optimally efficient.

``````from itertools import islice
array = range(0, 10)
window_size = 4
map(lambda i: list(islice(array, i, i + window_size)), range(0, len(array) - window_size + 1))
# output = [[0, 1, 2, 3], [1, 2, 3, 4], [2, 3, 4, 5], [3, 4, 5, 6], [4, 5, 6, 7], [5, 6, 7, 8], [6, 7, 8, 9]]
``````

Explanation: Create window by using islice of window_size and iterate this operation using map over all array.

Optimized Function for sliding window data in Deep learning

``````def SlidingWindow(X, window_length, stride):
indexer = np.arange(window_length)[None, :] + stride*np.arange(int(len(X)/stride)-window_length+4)[:, None]
return X.take(indexer)
``````

to apply on multidimensional array

``````import numpy as np
def SlidingWindow(X, window_length, stride1):
stride=  X.shape*stride1
window_length = window_length*X.shape
indexer = np.arange(window_length)[None, :] + stride1*np.arange(int(len(X)/stride1)-window_length-1)[:, None]
return X.take(indexer)
``````

my two versions of `window` implementation

``````from typing import Sized, Iterable

def window(seq: Sized, n: int, strid: int = 1, drop_last: bool = False):
for i in range(0, len(seq), strid):
res = seq[i:i + n]
if drop_last and len(res) < n:
break
yield res

def window2(seq: Iterable, n: int, strid: int = 1, drop_last: bool = False):
it = iter(seq)
result = []
step = 0
for i, ele in enumerate(it):
result.append(ele)
result = result[-n:]
if len(result) == n:
if step % strid == 0:
yield result
step += 1
if not drop_last:
yield result

``````

Another simple way to generate window of fixed length from a list

``````from collections import deque

def window(ls,window_size=3):
window = deque(maxlen=window_size)

for element in ls:

if len(window)==window_size:
yield list(window)
window.append(element)

ls = [0,1,2,3,4,5]

for w in window(ls):
print(w)
``````

My (keep it simple) solution that I ended up using:

``````def sliding_window(items, size):
return [items[start:end] for start, end
in zip(range(0, len(items) - size + 1), range(size, len(items) + 1))]
``````

Needless to say, the `items` sequence needs to be sliceable. Working with indices is not ideal, but it seems to be the least bad option given the alternatives... This can also easily be changed to a generator: just replace `[...]` with `(...)`.

I find this solution more elegant than using built-in functions.

``````words = ["this", "is", "an", "example"]

all_windows = []
for i in range(sliding_window):
front = sliding_window-i
all_windows.append(front*['']+doc+i*[''])
return np.array(all_windows).transpose()[1:]
else:
return np.array(all_windows).transpose()[sliding_window:-1]

>>> get_sliding_windows(words,3)
>>> array([['this', 'is', 'an'],
['is', 'an', 'example'],
['an', 'example', '']], dtype='<U7')

>>> array([['', '', 'this'],
['', 'this', 'is'],
['this', 'is', 'an'],
['is', 'an', 'example'],
['an', 'example', ''],
['example', '', '']], dtype='<U7')
``````

# Update

This is a duplicated answer here, as Kelly find out. But I am leaving this here as a counter-example since I include a pointless `min`.

So if you feel tempted to use min to avoid `IndexError` don't, there is no need, `range` will handle that case for you.

Curiously the following handle automatically when `n > len(l)` returning `[]` which is semantically correct.

``````>>> l = [0, 1, 2, 3, 4]

>>> n = 2
>>> [l[i: i + min(n, len(l)-i)] for i in range(len(l)-n+1)]
>>> [[0, 1], [1, 2], [2, 3], [3, 4]]
>>>
>>> n = 3
>>> [l[i: i + min(n, len(l)-i)] for i in range(len(l)-n+1)]
>>> [[0, 1, 2], [1, 2, 3], [2, 3, 4]]
>>>
>>> n = 4
>>> [l[i: i + min(n, len(l)-i)] for i in range(len(l)-n+1)]
>>> [[0, 1, 2, 3], [1, 2, 3, 4]]
>>>
>>> n = 5
>>> [l[i: i + min(n, len(l)-i)] for i in range(len(l)-n+1)]
>>> [[0, 1, 2, 3, 4]]
>>>
>>> n = 10 # n > len(l)
>>> [l[i: i + min(n, len(l)-i)] for i in range(len(l)-n+1)]
>>> []
``````
• This is a list comprehension posted years before yours, identical to yours except without your pointless `min` part. Dec 21, 2022 at 17:45
• You wouldn't get an `IndexError` anyway, for example `l[3:666]` gives you `[3, 4]` without error. Dec 22, 2022 at 12:15