# Grouping objects with an equal property

I have a list of some arbitrary objects, for the purpose of the example assume they're `(integer, something-else)` pairs, but they may be essentially anything:

``````[(5, a), (3, c), (2, f), (3, a), (4, c), (1, d), (5, b), (5, d)]
``````

I want to group these objects based on one of their properties so that elements sharing the same value of said property are adjacent in the resulting list. For instance, the above list grouped by the integer values:

``````[(3, a), (3, c), (1, d), (4, c), (2, f), (5, b), (5, a), (5, d)]
``````

As you see, no kind of order is necessary, nor is the operation required to be stable.

The naïve way would be to sort the list. This has the advantages of being well-known, well-tested and fast enough.

I'm being curious, though: is there an algorithm for this that doesn't involve sorting, while being competitive in terms of complexity (`O(n)` time with `O(n)` space or `O(n log n)` time with `O(1)` space)?

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There are sorting algorithms with `O(1)` space, and sorting is natural here. –  unkulunkulu Jun 26 '12 at 8:46
define "reasonable" space. is O(n) reasonable? –  amit Jun 26 '12 at 8:50
@amit: yes, it is. Edited the question. –  Fanael Jun 26 '12 at 8:51
@unkulunkulu: I'm fully aware of that. But sticking with `sort` is not enough satisfy my curiosity. –  Fanael Jun 26 '12 at 8:57

The easiest way is just to use a hashtable. This will result in a O(n) operation.

Pseudo code:

``````foreach (e in list)
hashtable[e.key].append(e.value)

; then 'flatten'

var out = new list

foreach (kv in hashtable)
foreach (v in kv.values)
worths mentioning: `O(n)` average case with a reasonable hash function, which is probably a reasonable assumption –  amit Jun 26 '12 at 8:53