# Interleave different length lists, elimating duplicates and preserve order in Python

I have two lists, lets say:

``````keys1 = ['A', 'B', 'C', 'D', 'E',           'H', 'I']
keys2 = ['A', 'B',           'E', 'F', 'G', 'H',      'J', 'K']
``````

How do I create a merged list without duplicates that preserve the order of both lists, inserting the missing elements where they belong? Like so:

``````merged = ['A', 'B', 'C', 'D', 'E', 'F', 'G', 'H', 'I', 'J', 'K']
``````

Note that the elements can be compared against equality but not ordered (they are complex strings). Update: The elements can't be ordered by comparing them, but they have a order based on their occurrence in the original lists.

Update: In case of contradiction (different order in both input lists), any output containing all elements is valid. Of course with bonus points if the solution shows 'common sense' in preserving most of the order.

Update: Again (as some comments still argue about it), the lists normally don't contradict each other in terms of the order of the common elements. In case they do, the algorithm needs to handle that error gracefully.

I started with a version that iterates over the lists with .next() to advance just the list containing the unmatched elements, but .next() just doesn't know when to stop.

``````merged = []
L = iter(keys1)
H = iter(keys2)
l = L.next()
h = H.next()

for i in range(max(len(keys1, keys2))):
if l == h:
if l not in merged:
merged.append(l)
l = L.next()
h = H.next()

elif l not in keys2:
if l not in merged:
merged.append(l)
l = L.next()

elif h not in keys1:
if h not in merged:
merged.append(h)
h = H.next()

else: # just in case the input is badly ordered
if l not in merged:
merged.append(l)
l = L.next()
if h not in merged:
merged.append(h)
h = H.next()

print merged
``````

This obviously doesn't work, as .next() will cause an exception for the shortest list. Now I could update my code to catch that exception every time I call .next(). But the code already is quite un-pythonic and this would clearly burst the bubble.

Does anyone have a better idea of how to iterate over those lists to combine the elements?

Bonus points if I can do it for three lists in one go.

-
I don't think that the list you want to compute is guaranteed to exist in general. What if `keys1 = ['A', 'B', 'D']; keys2 = ['D', 'C', 'B']`? – Ryan Thompson Jan 9 '13 at 16:21
how should an algorithm solve this case: `keys1 = ['A', '%', '*']` and `keys1 = ['A', '@', '?']` – Theodros Zelleke Jan 9 '13 at 16:22
@RyanThompson There are solutions, namely ['A', 'B', 'D', 'C', 'B'] and ['A', 'D', 'C', 'B', 'D'], but how to choose which one to return? And is an element allowed to be repeated in the output sequence? – Khaur Jan 9 '13 at 16:25
I guess that's the point. The question gives an example where the desired answer is made obvious by spacing and the use of alphabetic characters in order, but then says that the elements are unordered. So the example given doesn't fully specify the what the desired result is in the general case. – Ryan Thompson Jan 9 '13 at 18:00
Thinking some more, I wonder if the OP isn't effectively asking for a solution to the shortest common superstring problem? – Ryan Thompson Jan 9 '13 at 18:02

What you need is basically what any merge utility does: It tries to merge two sequences, while keeping the relative order of each sequence. You can use Python's `difflib` module to diff the two sequences, and merge them:

``````from difflib import SequenceMatcher

def merge_sequences(seq1,seq2):
sm=SequenceMatcher(a=seq1,b=seq2)
res = []
for (op, start1, end1, start2, end2) in sm.get_opcodes():
if op == 'equal' or op=='delete':
#This range appears in both sequences, or only in the first one.
res += seq1[start1:end1]
elif op == 'insert':
#This range appears in only the second sequence.
res += seq2[start2:end2]
elif op == 'replace':
#There are different ranges in each sequence - add both.
res += seq1[start1:end1]
res += seq2[start2:end2]
return res
``````

Example:

``````>>> keys1 = ['A', 'B', 'C', 'D', 'E',           'H', 'I']
>>> keys2 = ['A', 'B',           'E', 'F', 'G', 'H',      'J', 'K']
>>> merge_sequences(keys1, keys2)
['A', 'B', 'C', 'D', 'E', 'F', 'G', 'H', 'I', 'J', 'K']
``````

Note that the answer you expect is not necessarily the only possible one. For example, if we change the order of sequences here, we get another answer which is just as valid:

``````>>> merge_sequences(keys2, keys1)
['A', 'B', 'C', 'D', 'E', 'F', 'G', 'H', 'J', 'K', 'I']
``````
-
+1 for the J in non-alphabetical order ['A', 'B', 'C', 'D', 'E', 'F', 'G', 'H', 'J', 'K', 'I'], that's what I was trying to say in my comment. – Stephane Rolland Jan 9 '13 at 16:56
Looks very good to me. Thanks! @Stephane Rolland: You only notice the out-of-order J because those letters have a natural order. With random strings 'J', 'K' and 'I' have exactly the same property: they follow a 'K'. So the sollution is pretty valid. – Chaos_99 Jan 10 '13 at 10:00
Just checked. Works like a charm. And is reasonably fast in my case (about 1000 elements per list in 3 lists). You are the best! – Chaos_99 Jan 10 '13 at 10:51
@StephaneRolland: In that case you'll get some duplication, for example KAOSOAKING. – interjay Jan 10 '13 at 21:08
@StephaneRolland It can be useful for making file comparison tools, source control software, incremental patching, etc. I don't think I've used it myself. – interjay Jan 11 '13 at 14:16

I would use a Set (cf. python doc), that I'd fill with the elements of the two lists, one aafter the other.

And make a list from the Set when it's done.

Note that there is a contradiction/paradox in your question: you want to preserve order for elements that cannot be compared (only equality because "they are complex strings" as you said).

EDIT: the OP is right noticing that sets don't preserve order of insertion.

-
+1 for pointing out the contradiction – mgilson Jan 9 '13 at 16:13
From the example I guess the elements between matches should be inserted starting with the ones from the first list. – Khaur Jan 9 '13 at 16:19
A set is unordered. He wants to preserve the order of the two lists here. And there is no contradiction: It's possible to preserve ordering in a list without comparing the list's elements. – interjay Jan 9 '13 at 16:37
The ordering you refer about is the order of the list, not the order of the item's value ( since they are not orderly comparable). The question is biaised because it represents the two list with the implicit alphabetical order which is not applicable according to the OP (because these are complexe strings...) A + iB ? :-) – Stephane Rolland Jan 9 '13 at 16:46
+1 for getting the difference between the order of elements and orderable elements. (-1 for the set) – Chaos_99 Jan 10 '13 at 10:02

I suspect that you may be asking for a solution to the shortest common supersequence problem, which I believe is NP-hard in the general case of an arbitrary number of input sequences. I'm not aware of any libraries for solving this problem, so you might have to implement one by hand. Probably the quickest way to get to working code would be to take interjay's answer using difflib and then use `reduce` to run it on an arbitrary number of lists (make sure to specify the empty list as the 3rd argument to `reduce`).

-
Yes, the wiki definition seems about right for my problem. Thanks for pointing out the correct term and the note on using reduce for more then two input sequences. – Chaos_99 Jan 10 '13 at 10:08

By using only lists, you can achieve this with few simple `for` loops and `.copy()`:

``````def mergeLists(list1, list2):
# Exit if list2 is empty
if not len(list2):
return list1
# Copy the content of list2 into merged list
merged = list2.copy()

# Create a list for storing temporary elements
elements = []
# Create a variable for storing previous element found in both lists
previous = None

# Loop through the elements of list1
for e in list1:
# Append the element to "elements" list if it's not in list2
if e not in merged:
elements.append(e)

# If it is in list2 (is a common element)
else:

# Loop through the stored elements
for x in elements:
# Insert all the stored elements after the previous common element
merged.insert(previous and merged.index(previous) + 1 or 0, x)
# Save new common element to previous
previous = e
# Empty temporary elements
del elements[:]

# If no more common elements were found but there are elements still stored
if len(elements)
# Insert them after the previous match
for e in elements:
merged.insert(previous and merged.index(previous) + 1 or 0, e)
# Return the merged list
return merged

In [1]: keys1 = ["A", "B",      "D",      "F", "G", "H"]
In [2]: keys2 = ["A",      "C", "D", "E", "F",      "H"]
In [3]: mergeLists(keys1, keys2)
Out[3]: ["A", "B", "C", "D", "E", "F", "G", "H"]
``````

English is not my first language, and this one is pretty hard to explain, but if you care about the explanation, here's what it does:

• There's a local list called `elements` which can store temporary elements.
• There's a local variable called `previous` which stores the previous element that was in both lists.
• When ever it finds an element that is NOT in `list2` but is in `list1`, it will append that element to `elements` list and continue the loop.
• Once it hits an element that is in both lists, it loops through the `elements` list, appending all elements after `previous` element to `list2`.
• The new match is then stored into `previous` and `elements` is reset to `[]` and the loop continues.
• Beginning of the lists and end of the lists are counted as a common element, if first or last element is not a common element in both lists.

This way it will always follow this format:

1. Previous common element
2. Elements from list1, between two common elements
3. Elements in list2, between two common elements
4. New common element

So for example:

``````l1 = ["A", "B", "C",      "E"]
l2 = ["A",           "D", "E"]
``````
1. The revious common element `A` will be first in the merged list.
2. Elements from `l1` between the previous common element `A` and the new common element `E` will be inserted right after `A`.
3. Elements from `l2` between the previous common elmeent `A` and the new common elmeent `E` will be inserted right after the elements from `l1`.
4. The new common element `E` will be last element.
5. Back to step 1 if more common elements found.

["A", "B", "C", "D", "E"]

-
Neither of these solutions preserve the order of the lists. The second solution is close but can change the order of elements in the second list. – interjay Jan 10 '13 at 9:41
As interjay said: with sets, the order is not preserved. The second solutions does not interleave, but only append. – Chaos_99 Jan 10 '13 at 10:09
Fixed it, and removed the `set` option. – user1632861 Jan 10 '13 at 17:00