# Order statistics on substrings of a string

I have a long string `s` of size `n` and an integer `i`. I am interested in the `i`th substring of `s` under the lexicographical order.

The naive approach is to create the set of all substrings of `s`, and then get the `i`th order statistic of that set. This approach takes `O(n^2)` time but constructing the set of all substrings of `s` is way too memory intensive.

Is there a more "memory-friendly" approach?

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If by "substring" you mean any subset of consecutive characters from your input string `s`, then there are indeed O(n^2) such strings. How many indexes `i` do you need to study? I guess that you need a fixed number of `i`s (1, for instance), because if you need all the possible indexes, then the computation time requires sorting all the substrings, which takes O(n^2 log n) instead of O(n^2). Is this a correct guess? –  EOL Feb 25 '12 at 2:11
@EOL the standard quickselect algorithm for finding an element in a list of size n is O(n), not O(n log(n)). –  btilly Feb 25 '12 at 6:51
@btilly: Indeed. O(n^2 log n) is the time complexity for sorting (naively) all the substrings–as opposed to O(n^2) for only finding the i-th string for a single i. –  EOL Feb 25 '12 at 7:37

A substring is a prefix of a suffix of a string. You can get a sorted list of suffixes in time O(n) using one of the algorithms referred to in http://en.wikipedia.org/wiki/Suffix_array. The one referred to in Juha Kärkkäinen and Peter Sanders (2003). "Simple linear work suffix array construction is reasonably simple.

From a sorted list of suffixes some sort of lazy merge scheme should get you a sorted list of prefixes of suffixes = sorted list of substrings.

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Here is a way of getting the starting character of the ith string:

``````s = "robert"

cumulative = 0
for c,num in sorted((j,i+1) for i,j in enumerate(reversed(s))):
print c,num,cumulative
cumulative+=x

b 4 0
e 3 4
o 5 7
r 2 12
r 6 14
t 1 20
``````

Now from the results above (which can be generated quickly), you can see from the cumulative value that if i is between 0 and 4, we should use 'b' as the first character. If i was between 7 and 12, we would use 'o' as the first character and so on.

To verify this we can look at the ordered sub strings (see that between 7 and 12 they all start with 'o') (starting with index 0, inclusive of the 7, exclusive of the 12):

``````print sorted([s[a:b] for a in range(n+1) for b in range(a+1,n+2)])
['b', 'be', 'ber', 'bert', 'e', 'er', 'ert', 'o', 'ob', 'obe', 'ober', 'obert', 'r', 'r', 'ro', 'rob', 'robe', 'rober', 'robert', 'rt', 't']
``````

Now You can use this technique to get the first character. Once you have the first character, You know from the cumulative value how many substrings you have gone past. We can subtract this cumulative value from i. Now we look at a new string which is from the first (previously selected) character onwards (excluding the first character). We apply the same technique again (with the new string and the new i value) to get the second character.

Hopefully this makes sense. Good luck.

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@Randomblue does this make sense to you? –  robert king Feb 25 '12 at 2:36
There is an added complication if there are duplicate characters. You have to check how much the substrings from each of the duplicate characters overlap. –  robert king Feb 25 '12 at 4:07