# String algorithm suggestion to find all the common prefixes of a list of strings

What algorithm would you suggest to find out the longest common prefixes of a list of strings?

I might have strings such as:

``````Call Mike and schedule meeting.
Call Lisa
Implement new class for iPhone project
Implement new class for Rails controller
``````

I want to find out the following prefixes:

``````"Call "
"Implement new class "
``````

I'll be using Objective C, so a ready made cocoa solution would be a plus (though not a must).

-
So you want all strings `s` such that `s` is a common prefix of two strings in the list, and `s` is not a strict substring of any other common prefix of the same two strings, and `s` is not the empty string? What about `{"a1", "a2", "ab1", "ab2"}`, do you want `"a"` or not? –  Steve Jessop Jul 11 '11 at 8:41
Yes, that's correct. And no, I don't need a. –  cfisher Jul 11 '11 at 8:44

Edit: for the clarified question:

1. Sort the strings
2. Find the longest common prefix of each adjacent pair
3. Sort and dedupe the common prefixes, then remove any that's a strict prefix of another.

Actually, step (3) only requires that you remove any that's a dupe/prefix of another, which you could do with a trie or whatever instead of sorting. In fact it may be that the whole thing can be done faster with a suitably annotated trie - if you include a "count" at each node then you're looking precisely for nodes with a count of 2+, that have no children with a count of 2+.

But sorting is built in, and once you've sorted you can detect prefixes by looking at adjacent items, so it's probably less effort.

Just a one-off operation, find the longest common prefix between all the strings?

I'd probably do it in terms of the length of the prefix. In pseudo-code, and assuming nul-terminated strings:

``````prefixlen = strlen(first_string);
foreach string in the list {
for (i = 0; i < prefixlen; ++i) {
if (string[i] != first_string[i]) {
prefixlen = i;
break;
}
}
if (prefixlen == 0) break;
}

common_prefix = substring(firststring, 0, prefixlen);
``````

]

-
+1, if it's a one time operation, using a trie incurs in a time/space penalty. –  abeln Jul 9 '11 at 16:15
Also, if the input strings happen to be in sorted order, you only need to compare the first and last strings. –  j_random_hacker Jul 10 '11 at 5:59
This is not exactly what I need. I don't need the single longest common prefix of n strings. Rather I need the m longest common prefixes for n strings. –  cfisher Jul 11 '11 at 8:17
@Fernando: could you define what it is that you need, then? –  Steve Jessop Jul 11 '11 at 8:25
I will update the question with more info. –  cfisher Jul 11 '11 at 8:28

That depends on what you are willing to consider a prefix.

I suppose the generic answer is to create a Trie (perhaps a suffix tree) that stores all strings into a n-ary tree. See http://en.wikipedia.org/wiki/Trie

Depending on your criteria for 'prefix' (say, n characters) you could select all nodes of rank `n` that have more than one children.

You'll have your list of repeated prefixes.

-

You could insert all your strings into a trie (aka prefix tree). Then traverse the trie from the root until you find a node with more than one child (or just stop inserting strings when you would have to append a second child to a node).

-
So if the first string is "a", and the second string is "b", I still have to insert the other 43 million strings into the trie? ;-p –  Steve Jessop Jul 9 '11 at 11:53
Good point, I've edited my answer. –  omz Jul 9 '11 at 11:54
Pedantically I'd say, "move on to the next string" rather than "stop inserting strings" when you reach a branch point. The latter might suggest stop altogether, as opposed to "when inserting strings, stop inserting (that string) when...". But I know what you mean. –  Steve Jessop Jul 9 '11 at 11:57
There might be hundreds of strings (though probably less), but not thousands or millions. –  cfisher Jul 9 '11 at 11:58
@Fernando: but you still might like to exit early when possible. Running over a few hundred short strings won't take long, but it's not difficult to check for differences as you go, rather than at the end. –  Steve Jessop Jul 9 '11 at 11:59

Maybe you can use a Trie.

-
1. Insert all the strings into a Trie data structure.
2. DFS from the root to find the first node which has more than 1 edge going out of it.
3. the path from root to the node computed in step 2 gives the longest common prefix for all the set of the strings.
-