# insertion sort get indices?

I use the following algorithm for insertion sort:

``````def insertionSort(A):
indices = [z for z in xrange(len(A))]
for j in range(1, len(A)):
key = A[j]
i = j-1
while (i>=0) and (A[i]<key):
A[i+1] = A[i]
indices[j-i-1] = i+1
i = i-1

A[i+1] = key
``````

However, I need to maintain a list to map the indices of the original values of A to the sorted values of A, which means if I have a list of [1,3,4,2] after sorting the list = [4,3,2,1] i will have a indices list of [3,1,0,2].

Any pointers? I'm kinda stuck.

EDITED: apologies, sorting in descending order..

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Your code sorts in reverse, `[1,3,4,2]` to `[4, 3, 2, 1]` ... –  Jochen Ritzel Mar 3 '11 at 18:59
(1,0), (3,1), (4,2), (2,3) sorted by t[0] gives (1,0), (2,3), (3,1), (4,2), so the indices list should be [0,3,1,2]. –  XORcist Mar 3 '11 at 19:35
Why is everyone getting that wrong? It seems clear enough. It maps from the original positions to the sorted positions, not the other way around. –  Glenn Maynard Mar 3 '11 at 20:12

Why are you writing a sort? Use Python's builtin sorting.

``````def sort_with_indexes(data):
sorted_data = sorted(enumerate(data), key=lambda key: key[1])
indexes = range(len(data))
indexes.sort(key=lambda key: sorted_data[key][0])
return [i[1] for i in sorted_data], indexes

data, indexes = sort_with_indexes([1,3,4,2])
print data, indexes
``````
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Please, indices. You use "indexes" when you say something like "he indexes the records" –  NullUserException Mar 3 '11 at 19:20
They're both valid. Welcome to modern English. –  Glenn Maynard Mar 3 '11 at 19:30
@Glenn Wow, indeed. It still strikes me as extremely odd. –  NullUserException Mar 3 '11 at 19:38
@Glenn, I want to sort a nearly sorted list, and is unsure what sorted() uses... –  goh Mar 4 '11 at 0:43
Python's sort is well-documented as being very efficient for nearly-sorted lists. –  Glenn Maynard Mar 4 '11 at 1:00

the fix to NullUserException's answer is simple:

``````sorted_list, mapping = zip(*sorted([ (v, i) for i, v in enumerate(l) ]))
index_list = [ mapping.index(i) for i in range(len(sorted_list)) ]
``````

just replace the call to sorted with your sorting algorithm.

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When you set `A[i+1]=key`, clearly `indices[j]=i+1`. However, when you set `A[i+1]=A[i]` You must increment the value of the element of `indices` that has the value `i` (because the element of `A` that was at `i` is now at `i+1`). Unfortunately, I think the naive implementation of this algorithm will be O(n^3) in the worst case.

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Seems like your idea of changing the indices array while changing the original in order to keep track of them should work. I find that when I sometimes have trouble tracking two indices at once and I'll often resort to stepping through the loop(s) on paper to figure out where I'm going wrong.

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I modified your version slightly. It now sorts the list A in place (non descending) and returns a list with the "sorted indices".

``````def insertionSort(A):
sorted_indices = [0]
for j in range(1, len(A)):
sorted_indices.append(j)
key = A[j]
i = j - 1
while i >= 0 and A[i] > key:
A[i+1] = A[i]
sorted_indices[i+1] = sorted_indices[i]
i -= 1
A[i+1] = key
sorted_indices[i+1] = j
return sorted_indices
``````
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This gives `[0, 3, 1, 2]`, which we've already established is wrong. –  senderle Mar 3 '11 at 20:28

I was trying to solve the same problem, but I was sorting arrays rather than lists. The problem with using sorted was that it returns a list, which for my purposes took up too much memory. Luckily, you can do this with numpy using arrays and argsort:

``````import numpy
a=numpy.array([1,3,4,2])
p=a.argsort()
``````

Which will give array([0,3,1,2]) as a result. This is sorted low to high.

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