# Relative order of elements in list

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):
rel=[]
for i in a:
loc = 0
for v in a:
if i > v:
loc += 1
rel.append(loc)
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.

-

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]
``````
-
@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]
``````
-
+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.

Edit:

Outside of lambda.

-
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.

-
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. http://www.numpy.org/

``````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]
``````
-
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