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.

`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