# Pythonic: Find all consecutive sub-sequences of certain length

I have a list of integers and I want to find all consecutive sub-sequences of length n in this list. For example:

``````>>> int_list = [1,4,6,7,8,9]
>>> conseq_sequences(int_list, length=3)
[[6,7,8], [7,8,9]]
``````

The best I could come up with is:

``````def conseq_sequences(self, li, length):
return [li[n:n+length]
for n in xrange(len(li)-length+1)
if li[n:n+length] == range(li[n], li[n]+length)]
``````

This isn't overly readable. Is there any readable pythonic way of doing this?

-
You can assume int_list being ordered. – Zakum May 26 '14 at 17:57

Here's a more general solution that works for arbitrary input iterables (not just sequences):

``````from itertools import groupby, islice, tee
from operator import itemgetter

def consecutive_subseq(iterable, length):
for _, consec_run in groupby(enumerate(iterable), lambda x: x[0] - x[1]):
k_wise = tee(map(itemgetter(1), consec_run), length)
for n, it in enumerate(k_wise):
next(islice(it, n, n), None) # consume n items from it
yield from zip(*k_wise)
``````

Example:

``````print(*consecutive_subseq([1,4,6,7,8,9], 3))
# -> (6, 7, 8) (7, 8, 9)
``````

The code uses Python 3 syntax that could be adapted for Python 2 if needed.

-
Looks most elegant to me in terms of using built-in libraries. Will have to look up the links you provided in order to completely get what's happening. Readability is still pretty tough, though! – Zakum May 26 '14 at 17:56

One solution could be as follows:

``````import numpy # used diff function from numpy, but if not present, than some lambda or other helper function could be used.

def conseq_sequences(li, length):
return [int_list[i:i+length] for i in range(0, len(int_list)) if sum(numpy.diff(int_list[i:i+length]))==length-1]
``````

Basically, first, I get consecutive sub-lists of given length from the list, and then check if the sum of the differences of their elements is equal to `length - 1`.

Please not that if elements are consecutive, their difference will add up to `length - 1`, e.g. for sub-list `[5,6,7]` the difference of its elements is `[1, 1]` and sum of it is `2`.

But to be honest not sure if this solution is clearer or more pythonic than yours.

Just in case you don't have `numpy`, the `diff` function can be easly defined as follows:

``````def diff(l):
'''For example, when l=[1,2,3] than return is [1,1]'''
return [x - l[i - 1] for i, x in enumerate(l)][1:]
``````
-
`````` def conseq_sequences(li, length):
res = zip(*(li[i:] for i in xrange(length)))
final = []
for x in res:
for k, g in groupby(enumerate(x), lambda (i, x): i - x):
get_map = map(itemgetter(1), g)
if len(get_map) == length:
final.append(get_map)
return final
``````

Without imports.

``````def conseq_sequences(li, length):
res = zip(*(li[i:] for i in xrange(length)))
final = []
for ele in res:
if all(x == y+1 for x, y in zip(ele[1:], ele)):
final.append(ele)
return final
``````

Which can be turned into list comprehension:

``````def conseq_sequences(li, length):
res = zip(*(li[i:] for i in xrange(length)))
return [ ele for ele in res if all(x == y+1 for x, y in zip(ele[1:], ele))]
``````
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This behaves differently from the OP's code on inputs like `[4, 1, 5, 2, 6]`. – user2357112 May 25 '14 at 23:52
@user2357112, temporarily brain dead, I completely overlooked the consecutive part. – Padraic Cunningham May 25 '14 at 23:56
`````` def condition (tup):
if tup[0] + 1 == tup[1] and tup[1] + 1 == tup[2] :
return True
return False

def conseq_sequence(li):
return [x for x in map(None, iter(li), iter(li[1:]), iter(li[2:])) if condition(x)]
``````
-
This doesnt respect the consecutiveness-constraint: `conseq_sequence([1,4,2,7,3])` gives as result `[[1, 2, 3], [2, 3, 4]]`. However the list `[1,2,3]` isn't a sublist of our intial list and as for `[2,3,4]` the number appear in a different order in the initial list and aren't consequitive either. – Zakum May 26 '14 at 17:50
Sorry, i forgot about that condition. Now the code also takes care of that condition – Pranav Raj May 26 '14 at 18:29
I have made an assumption that the list's length will be greater than 3, that can be checked easily – Pranav Raj May 26 '14 at 18:31