Given a positive integer (**in the form of an array of digits**). We are allowed to swap one pair of digits in the given number.
We need to return the smallest possible integer that can be obtained. Note, it should be a valid integer, i.e, should not contain leading 0's.

For example:-

- 93561 returns 13569
- 596 returns 569
- 10234 returns 10234
- 120 returns 102
- 10091 returns 10019
- 98761111 returns 18761119

Is there an `O(n)`

algorithm for this problem. I have thought of few ways for this :-

- Find the min. digit (
`minDIgit`

) in the given integer (except 0) and swap it with the MSB, if`MSB != minDigit`

. If`MSB==minDigit`

, then find the next min. digit and swap it with the most significant but 1 digit and so on. This could be`O(n^2)`

in worst case. - Make an
`array/vector`

of`std::pair`

of digit and index and sort it in increasing order (according to digit values; keep lower indices first for matching digit values). Iterate through the sorted array. Swap the MSB with the first digit. If the least digit has corresponding index as MSB, then swap the MSB but 1 place with the next min digit. If the next min digit has corresponding index of MSB but 1 place, then swap the MSB but 2 place with this next min. digit and so on. This should be`O(nlog(n))`

.

Can someone suggest a better algorithm.

**UPDATE 1:**
After thinking a bit, second algo which I proposed would work perfectly fine (probably except few corner cases, which can be handled separately). Moreover, I can sort the pair(digit, index) using **counting sort** (according to digit values), which is a stable sort in `O(n)`

time. Is there a flaw in my argument?

**UPDATE 2:**
My 2nd algo *would* work (although with more checks for corner cases and 0's) and that too in `O(n)`

time with `counting sort`

. But solution given by @GaborSch is much simpler, so I won't really bother giving a proper code for my algo.