# Algorithm to find next greater permutation of a given string

I want an efficient algorithm to find the next greater permutation of the given string.

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Wikipedia has a nice article on lexicographical order generation. It also describes an algorithm to generate the next permutation.

Quoting:

The following algorithm generates the next permutation lexicographically after a given permutation. It changes the given permutation in-place.

1. Find the highest index i such that s[i] < s[i+1]. If no such index exists, the permutation is the last permutation.
2. Find the highest index j > i such that s[j] > s[i]. Such a j must exist, since i+1 is such an index.
3. Swap s[i] with s[j].
4. Reverse the order of all of the elements after index i till the last element.
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for those who are wondering why the step 4 is not sort: step 1 already implies that from s[i+1] to the end it is already in the descending order, hence reverse is equivalent to sort – Ted Xu Jan 4 at 8:48

A great solution that works is described here: http://www.nayuki.io/page/next-lexicographical-permutation-algorithm. And the solution that, if next permutation exists, returns it, otherwise returns false:

function nextPermutation(array) {
var i = array.length - 1;
while (i > 0 && array[i - 1] >= array[i]) {
i--;
}

if (i <= 0) {
return false;
}

var j = array.length - 1;

while (array[j] <= array[i - 1]) {
j--;
}

var temp = array[i - 1];
array[i - 1] = array[j];
array[j] = temp;

j = array.length - 1;

while (i < j) {
temp = array[i];
array[i] = array[j];
array[j] = temp;
i++;
j--;
}

return array;
}
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We can find the next largest lexicographic string for a given string S using the following step.

1. Iterate over every character, we will get the last value i (starting from the first character) that satisfies the given condition S[i] < S[i + 1]
2. Now, we will get the last value j such that S[i] < S[j]
3. We now interchange S[i] and S[j]. And for every character from i+1 till the end, we sort the characters. i.e., sort(S[i+1]..S[len(S) - 1])

The given string is the next largest lexicographic string of S. One can also use next_permutation function call in C++.

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I hope this code might be helpful.

int main() {

char str[100];
cin>>str;
int len=strlen(len);
int f=next_permutation(str,str+len);
if(f>0) {
print the string
} else {