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Basically Im trying to work out a solution to the problem Given a word and a text, we need to return the occurrences of anagrams . However, I wasnt able to quite understand some of the solutions posted there. So, I tried to convert the problem into the problem of finding permutations of a given text. Here's my algorithm (pseudocode), Id like some insight to see if its right and also some insight into finding its complexity.

int findAnagramOccurencesinText(String input,String find)

//generate a list of all possible permutations of the letters in find and store in a list
// eg/ if find ="dog"  then list =["god","odg","dog","gdo","ogd","dgo"]

int occurances=0;
for String (perm:list)
{
     index=-1;
     while(index<input.length)
      {
          index=input.indexOf(perm,index);
          if(index!=-1)
             occurances++;
          index+=1;

      }
}
return occurances;
}

Also is the complexity O(#inputlength)? Any insight on how to find the complexity of this particular algorithm(if its correct) would be appreciated.

EDIT : I understand this is a O(n!) solution. Is there any modification I can make to it, to make it more efficient? (Other than scrapping the entire approach and moving to the O(n) approach mentioned in the linked question)

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Isn't it just O(inputlength*listlength), because the permutation list length also varies? –  spydon Nov 4 '13 at 4:29

1 Answer 1

There are O(n!) permutations of a set of n elements.

So, assuming the string searching algorithm is linear time, the time complexity would be:

O((findLength)! inputLength)

The above assumes the find is without duplicates, if it isn't, the formula is slightly more complicated.

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you mean O(findlength! *inputlength) right? –  KodeSeeker Nov 4 '13 at 6:35
    
@KodeSeeker Oh, right, yes. Corrected. –  Dukeling Nov 4 '13 at 6:59
    
Could you take a look at the edit? Any thoughts would be really helpful. –  KodeSeeker Nov 4 '13 at 7:05
    
No, I don't see any modification that would significantly improve your current solution - I suggest you move to one of the approaches mentioned in the linked question. –  Dukeling Nov 4 '13 at 7:14

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