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I have an array of strings, each one with a different length. e.g:

s[0] = "sSWXk"
s[1] = "qCk"
s[2] = "sOQQXPbk"
s[x] = "KVfdQk";

I also am given that

n = s[0].length() + s[1].length() + ... + s[x].length()

I need a sorting algorithm with time complexity O(n) for sorting these strings lexicographically, so that (for example)

a < ab < b < bbc < c < ca

Any suggestions? The time complexity is the essential requirement in the algorithm.

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Is this homework? – Louis Wasserman Jun 12 '12 at 19:37
The person who gives you an answer to this in general will get an accepted answer and a few million dollars. You can't do sorting (in general) in O(n), without making some serious CS innovations. – Oleksi Jun 12 '12 at 19:38
@Oleksi: You can do it in this instance. The OP isn't exactly asking about the general case. – Louis Wasserman Jun 12 '12 at 19:40
take care about definition of "n". here "n" is not number of elements, but number of total characters of all strings! – Ehsan Khodarahmi Jun 12 '12 at 19:40
@EhsanKhodarahmi: So you're saying that if you have m strings each 1000 characters long, you expect to be able to sort them in O(m) time? (since O(1000*m) is the same as O(m)) – NPE Jun 12 '12 at 19:44

2 Answers 2

up vote 9 down vote accepted

There is a data structure called a trie that is optimally suited for this. If you insert all the words into the trie and then do a DFS over the trie, you will get the words back in sorted order. Doing so takes time O(n) as well, where n is the total number of characters in all the strings.

Since I assume that this is homework, I'll leave the details of how to implement the trie as an exercise. :-)

Hope this helps!

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Because this is a homework problem I can only give a hint. Hint: Use a modified version of counting sort. It's practical if we assume a char is 8 bits.

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