# Find the index of a given permutation in the sorted list of the permutations of a given string

We're given a string and a permutation of the string.

For example, an input string `sandeep` and a permutation `psdenae`.

Find the position of the given permutation in the sorted list of the permutations of the original string.

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Nice question! What did you try? – Dr. belisarius Feb 27 '11 at 4:46
its a class room question done in 9th standard, not a nice question – Peter May 13 '12 at 17:28
Very similar question that has an implementation in its answers: stackoverflow.com/questions/12146910/… – Chronial Sep 5 '13 at 22:26

The total number of permutation of a given string of length n would be n! (if all characters are different), thus it would not be possible to explore all the combinations.

This question is actually like the mathematics P & C question

Find the rank of the word "stack" when arranged in dictionary order.

Given the input string as NILSU Take a word which we have to find the rank. Take "SUNIL" for example.

Now arrange the letter of "SUNIL" in alphabetical order.

It will be. "I L N S U".

Now take the first letter. Its "I". Now check, is the letter "I" the first letter of "SUNIL"? No. The number of words that can be formed starting with I will be 4!, so we know that there will be 4! words before "SUNIL".

I = 4! = 24

Now go for the second letter. Its "L". Now check once again if this letter we want in first position? No. So the number of words can be formed starting with "L" will be 4!.

L = 4! = 24

Now go for "N". Is this we want? No. Write down the number of words can be formed starting with "N", once again 4!

N = 4! = 24

Now go for "S". Is this what we want? Yes. Now remove the letter from the alphabetically ordered word. It will now be "I L N U"

Write S and check the word once again in the list. Is we want SI? No. So the number of words can be formed starting with SI will be 3!

[S]:I-> 3! = 6

Go for L. is we want SL? No. So it will be 3!.

[S]:L-> 3! = 6

Go for N. is we want SN? No.

[S]:N-> 3! = 6

Go for SU. Is this we want? Yes. Cut the letter U from the list and then it will be "I L N". Now try I. is we want SUI? No. So the number of words can be formed which starts from SUI will be 2!

[SU]:I-> 2! = 2 Now go for L. Do we want "SUL". No. so the number of words starting with SUL will be 2!.

[SU]:L-> 2! = 2

Now go for N. Is we want SUN? Yes, now remove that letter. and this will be "I L". Do we want "SUNI"? Yes. Remove that letter. The only letter left is "L".

Now go for L. Do we want SUNIL? Yes. SUNIL were the first options, so we have 1!. [SUN][I][L] = 1! = 1

Now add the whole numbers we get. The sum will be.

24 + 24 + 24 + 6 + 6 + 6 + 2 + 2 + 1 = 95.

So the word SUNIL will be at 95th position if we count the words that can be created using the letters of SUNIL arranged in dictionary order.

Thus through this method you could solve this problem quite easily.

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For strings containing repeated words for e.g. BOMBAY suppose we want to find the position of BOAYBM . we only need to know that BOMBAY has total 6! / 2! combinations. – Algorithmist Feb 27 '11 at 5:19

I tried to implement this in js. It works for string that have no repeated letters but I get a wrong count otherwise. Here is my code:

``````function x(str) {
var sOrdinata = str.split('').sort()
console.log('sOrdinata = '+ sOrdinata)
var str = str.split('')
console.log('str = '+str)
console.log('\n')
var pos = 1;

for(var j in str){
//console.log(j)

for(var i in sOrdinata){
if(sOrdinata[i]==str[j]){
console.log('found, position: '+ i)
sOrdinata.splice(i,1)
console.log('Nuovo sOrdinata = '+sOrdinata)
console.log('\n')
break;
}
else{
//calculate number of permutations
console.log('valore di j: '+j)

//console.log('lunghezza stringa da permutare: '+str.slice(~~j+1).length);
if(str.slice(j).length >1 ){sub = str.slice(~~j+1)}else {sub = str.slice(j)}
console.log('substring to be used for permutation: '+ sub)

prep = nrepC(sub.join(''))
console.log('prep = '+prep)

num = factorial(sub.length)
console.log('num = '+num)

den = denom(prep)
console.log('den = '+ den)

pos += num/den
console.log(num/den)
console.log('\n')
}
}
}
console.log(pos)
return pos
}

/* ------------ functions used by main --------------- */

function nrepC(str){
var obj={}
var repeats=[]
var res= [];

for(x = 0, length = str.length; x < length; x++) {
var l = str.charAt(x)
obj[l] = (isNaN(obj[l]) ? 1 : obj[l] + 1);
}
//console.log(obj)

for (var i in obj){
if(obj[i]>1) res.push(obj[i])
}
if(res.length==0){res.push(1); return res}
else return res
}

function num(vect){
var res =  1

}

function denom(vect){
var res = 1
for(var i in vect){
res*= factorial(vect[i])
}
return res
}

function factorial (n){
if (n==0 || n==1){
return 1;
}
return factorial(n-1)*n;
}
``````
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My approach to the problem is sort the given permutation. Number of swappings of the characters in the string will give us the position of the pemutation in the sorted list of permutations.

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You are out by far if you are thinking of just applying bubble swap. A string of length has 10! permutations(assuming all chars distinct). It would take at most 90 swaps to sort a string of length 10. – Shamim Hafiz Feb 27 '11 at 4:56

An inefficient solution would be to successively find the previous permutations until you reach a string that cannot be permuted anymore. The number of permutations it takes to reach this state is the position of the original string.

However, if you use combinatorics you can achieve the solution faster. The previous solution will produce a very slow output if string length exceeds 12.

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