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I'm writing a function that takes in a list of integers and returns a list of relative positioned elements.

That is to say, if my input into said function is [1, 5, 4] the output would be [0, 2, 1], since 1 is the lowest element, 5 is the highest and 4 in the middle, all elements are unique values, or a set()

But code speaks, the function i have so far is

def relative_order(a):
    for i in a:
        loc = 0
        for v in a:
            if i > v:
                loc += 1
    return rel

It does work, but since i'm sending big lists into this function, and i have to compare each element to all elements in each iteration it's taking ~5sec with a list of 10.000 elements.

My question is how can i improve the speed on said function and maybe be a bit more Pythonic, i tried comprehension lists, but my Python skills are lacking and i only came up with an imperative way of implementing this problem.

share|improve this question
up vote 11 down vote accepted

This can be written as a list comprehension like this:

lst = [1, 5, 4]
s = sorted(lst)    
[s.index(x) for x in lst]
=> [0, 2, 1]

And here's another test, using @frb's example:

lst = [10, 2, 3, 9]
s = sorted(lst)    
[s.index(x) for x in lst]
=> [3, 0, 1, 2]
share|improve this answer
@nightcracker well to be fair the speed improved from 4.54sec to 0.52sec using this one. – olafurj Jul 20 '13 at 23:46
@ÓscarLópez just what i was looking for, thanks! – olafurj Jul 20 '13 at 23:47
@HashCollision my pleasure! a bit tricky to get right, but here you go :) – Óscar López Jul 20 '13 at 23:48
Just coming back to this - I deleted my answer because frb showed it was incorrect. I phrased my previous comment very poorly - I meant to say I don't like the performance of this answer (but I very much like the answer itself - it's conceptually clear, which is very important). To make up you get a +1 :) The runtime of this answer is O(n^2), which is pretty bad for large lists. If performance were important I would probably do a decorate-sort-undecorate construction, but I'm not sure how performant that is in Python. – orlp Jul 21 '13 at 0:03
@akk while I appreciate the upvote, I would also point out that downvoting a working answer (even if it's not the most efficient version) is somewhat contrary to the spirit of SO - if you don't think the answer is deserving of an upvote that you don't need to upvote it, but I certainly see no reason to downvote it. Need I point out that your answer is actually incorrect (there's several deleted answers on this question that also made similar assumptions - myself included) - yet no one has chosen to downvote yours... – Jon Clements Jul 21 '13 at 11:00

Here's another go that should be more efficient that keeping .index'ing into the list as it's stated that no duplicate values will occur, so we can do the lookup O(1) instead of linear... (and actually meets the requirements):

>>> a = [10, 2, 3, 9]
>>> indexed = {v: i for i, v in enumerate(sorted(a))}
>>> map(indexed.get, a)
[3, 0, 1, 2]
share|improve this answer
+1 : more efficient than my answer. But I'd rather use this instead of map: [indexed[x] for x in a] – Óscar López Jul 21 '13 at 0:11
@ÓscarLópez fair enough - I just used map as that with a builtin function should be faster than a list-comp – Jon Clements Jul 21 '13 at 0:15
@ÓscarLópez Having said that - I'm getting the opposite results that I would expect... umm.... – Jon Clements Jul 21 '13 at 0:20
@ÓscarLópez map(indexed.get, a) is 87.7usec, [indexed[x] for x in a] is 104usec and [s.index(x) for x in a] is 9.2msec... That's based on a range of 1,000 unique integers (randomly shuffled) – Jon Clements Jul 21 '13 at 0:36
@JonClements Haha! Big-O wins again. – orlp Jul 21 '13 at 0:37

The method you have a̶n̶d̶ ̶t̶h̶e̶ ̶c̶u̶r̶r̶e̶n̶t̶ ̶a̶n̶s̶w̶e̶r̶ takes order n^2 time.

This should work in log(n) time:

def relative_order(a):
    positions = sorted(range(len(a)), key=lambda i: a[i])
    return sorted(range(len(a)), key = lambda i: positions[i])

It's still order log(n) and so should work for your large lists too.


Outside of lambda.

share|improve this answer
That is not O(log(n)). – user2357112 Jul 21 '13 at 0:06
Sorting is O(n log n) – Óscar López Jul 21 '13 at 0:14
This answer was an epic fail – Anon Jul 21 '13 at 4:10
def relative_order(a):
    l = sorted(a)
    # hash table of element -> index in ordered list
    d = dict(zip(l, range(len(l))))
    return [d[e] for e in a]

print relative_order([1, 5, 4])
print relative_order([2, 3, 1])
print relative_order([10, 2, 3, 9])

[0, 2, 1]
[1, 2, 0]
[3, 0, 1, 2]

the algorithm should be as efficient as sort, but use additional space.

share|improve this answer
just realize it's the same thing as Jon Clements', ha... – Dyno Fu Jul 21 '13 at 0:21

Your question is about sorting. I would recommend the use of Numpy or 'Numeric Python'. Numpy is a Python module that is optimised for "fast, compact, multidimensional array faciliities". It is the package of choice for scientific computing in Python.

import numpy as np

input_array = np.array([1, 5, 4])
sorted_indices = np.argsort(input_array)

print sorted_indices
#[0 2, 1]

I have also added profiler output based on an array of size 50000. It shows this method is (around 4x) faster than using the Python sorted function as per earlier answers.

ncalls  tottime  percall  cumtime  percall filename:lineno(function)

    1    0.009    0.009    0.009    0.009 {method 'argsort' of 'numpy.ndarray' objects}
    1    0.034    0.034    0.034    0.034 {sorted}

Warning: Commentary suggested the answer is not inline with the authors function. This is true. I guess the whole point of argsort is that:

sorted_array = input_array[sorted_indices] 

gives you a sorted array.

The OP is, curious to my mind, asking for a result which requires a sorted array to be available via:

for i, val in enumerate(sorted_indices):
    sorted_array[val] = input_array[i]
share|improve this answer
This answer is incorrect. np.argsort(np.array([10, 2, 3, 9])) returns array([1, 2, 3, 0]), but the correct answer is array([3, 0, 1, 2]) – Óscar López Jul 21 '13 at 4:36
And how is array([1, 2, 3, 0]) incorrect? – akk Jul 21 '13 at 4:47
you did not get the question right, take a look and run all the other answers. Look: If the input list were sorted 10 would be at the index 3, 2 at index 0, 3 at index 1 and 9 at index 2. That's what OP is asking, that's what my answer does. – Óscar López Jul 21 '13 at 4:58
Thanks, I have amended my answer – akk Jul 21 '13 at 5:25

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