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Given a word and a text, return the count of the occurrences of anagrams of the word in the text. For eg. word is “for” and the text is “forxxorfxdofr”, anagrams of “for” will be “ofr”, “orf”,”fro”, etc. So the answer would be 3 for this particular example.

I have got the brute force approach which is getting all the permutations of the word, then compare if the text contains it, and increase the number of occurrences, but that is O(N^2) approach. I'm looking for a better complexity.

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3  
Did you write "wrod" intentionally in the title of your question? –  Rémi Sep 15 '13 at 10:53
1  
@Rémi Fixed, Thanks for pointing out. –  Ahmed Saleh Sep 15 '13 at 10:55
2  
It was fun, you should have left it :-) –  Rémi Sep 15 '13 at 10:56
    
In this text forxxorfxdofr x are separators? –  cpp Sep 15 '13 at 11:13
1  
What is the expected result for forf ? 2 or 1. –  Jarod42 Sep 15 '13 at 11:16

4 Answers 4

up vote 10 down vote accepted

You can simply look for the character count.

Say for example that you're looking for anagramms of look. So, you're looking for:

  • a 4 charachter length word,
  • with 1 l, 2 o and 1 k.

Simply process the first 4 letters, store the counts. Check whether you have a match. Add the next character (increment), remove the old character (decrement). Check again. And so on...

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+1 for giving a clear and concise idea without handing over a complete homework solution. –  us2012 Sep 15 '13 at 11:12
    
@us2012 This is not a homework solution, it was an interview problem at Amazon, and I was just thinking about it to get a better solution. –  Ahmed Saleh Sep 15 '13 at 11:13
    
@Karoly storing the count of each character would be in a hashtable for example ? otherwise it would be still O(N^2) –  Ahmed Saleh Sep 15 '13 at 11:15
    
If you can assume ASCII char set and 8-bit chars etc, you can 'cheat' and have a length 256 vector/array for occurrences. Otherwise, yeah, a hashmap std::unordered_map or similar sounds good. –  us2012 Sep 15 '13 at 11:18
    
your serch length is 3 in that case. So you will reach for, then you'll reach orf. And I don't really care how you store it, as long as the access is O(1), the overall algorithm is O(N) ;) –  Karoly Horvath Sep 15 '13 at 11:31

Essentially you can slide a window of the length of your word over your input and keep a count of how many of each letter are in the window. When the letter counts in your sliding window match the letter counts of your word, you have a match.

Let your word length be n, and your current position be curr. Create an array, or vector, windCounts of length 26. The entry windCounts[i] stores the number of occurrences of the ith letter of the alphabet seen from position curr - n - 1 to curr.

What you do is you advance curr, and keep your array windCounts up to date, by decrementing the letter that has dropped out of the back of the sliding window, and incrementing the letter count that has appeared in the front of the sliding window. (Obviously until curr > n, you only increment, you just build up your sliding window to the length of your word.)

In C++, you can use a vector for the counts of letters in your word, and for the counts of letters in your sliding window and simply use vector::operator== to do the equality.

Edit: the algorithm is O(N), where N is the length of the text to search. This can be seen from the code below where the loop body is executed for each letter that you slide the window.

#include <string>
#include <vector>
#include <algorithm> // for_each 

using std::string;
using std::vector;

#include <iostream>

int main(int argc, char* argv[])
{
    const string text = "forxxorfxdofr";
    const string word = "for"; 

    // Counts of letters in word
    vector<int> wordCounts(256); // optimization: cut down from 256 to 26 
    std::for_each(word.begin(), word.end(), 
        [&] (char c) { wordCounts[c]++; } );

    // Current position of end of sliding window
    string::const_iterator curr = text.begin() + word.size();
    // Initial sliding window counts
    vector<int> windCounts(256);
    std::for_each(text.begin(), curr,
        [&] (char c) { windCounts[c]++; } );

    // Run sliding window over text
    int numMatches = 0;
    while (1) {
        numMatches += wordCounts == windCounts;
        if (curr == text.end()) {
            break;
        }
        windCounts[*(curr - word.size())]--;
        windCounts[*curr]++;
        ++curr;
    }

    std::cout << numMatches << "\n";

    return 0;
}
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Complexity: O(#alphabet #text). (#alphabet can be see as a constant). –  Jarod42 Sep 16 '13 at 10:44
    
@Jarod42 Thanks. As you say the size of the alphabet is a constant. You're right that I didn't update the counts correctly. There were several bugs :( I only tested the original code on the original problem. I've done a bit more testing and will do a little bit more later on today. Thanks again. –  TooTone Sep 16 '13 at 11:06

TooTone's O(n) solution suffers from having to compare two 256-element vectors for each character of the input text. This can be avoided by tracking the number of positions at which the two vectors differ, and registering a match when this number goes to zero. In fact, we don't even need to store two different vectors at all, since we can just store one vector containing their difference.

Here's my version implementing these optimizations. It's written in plain old C, but should work under C++ with appropriate adjustments:

#include <stdio.h>
#include <limits.h> /* for UCHAR_MAX (usually 255) */

int find_anagrams (char *word, char *text) {
    int len = 0;           /* length of search word */
    int bin[UCHAR_MAX+1];  /* excess count of each char in last len chars of text */
    int mismatch = 0;      /* count of nonzero values in bins[] */
    int found = 0;         /* number of anagrams found */
    int i;                 /* generic loop counter */

    /* initialize bins */
    for (i = 0; i <= UCHAR_MAX; i++) bin[i] = 0;
    for (i = 0; word[i] != '\0'; i++) {
        unsigned char c = (unsigned char) word[i];
        if (bin[c] == 0) mismatch++;
        bin[c]--;
        len++;  /* who needs strlen()? */
    }

    /* iterate through text */
    for (i = 0; text[i] != '\0'; i++) {
        /* add next char in text to bins, keep track of mismatch count */
        unsigned char c = (unsigned char) text[i];
        if (bin[c] == 0) mismatch++;
        if (bin[c] == -1) mismatch--;
        bin[c]++;

        /* remove len-th previous char from bins, keep track of mismatch count */
        if (i >= len) {
            unsigned char d = (unsigned char) text[i - len];
            if (bin[d] == 0) mismatch++;
            if (bin[d] == 1) mismatch--;
            bin[d]--;
        }

        /* if mismatch count is zero, we've found an anagram */
        if (mismatch == 0) {
            found++;
#ifdef DEBUG
            /* optional: print each anagram found */
            printf("Anagram found at position %d: \"", i-len+1);
            fwrite(text+i-len+1, 1, len, stdout);
            printf("\"\n");
#endif
        }
    }
    return found;
}


int main (int argc, char *argv[]) {
    if (argc == 3) {
        int n = find_anagrams(argv[1], argv[2]);
        printf("Found %d anagrams of \"%s\" in \"%s\".\n", n, argv[1], argv[2]);
        return 0;
    } else {
        fprintf(stderr, "Usage: %s <word> <text>\n", (argc ? argv[0] : "countanagrams"));
        return 1;
    }
}
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nice one. In production code, I would have shrunk the vectors down to 26 long or maybe even used maps, but the idea of avoiding a comparison altogether by using a count of mismatched letters is really sweet! –  TooTone Sep 15 '13 at 23:45

I have taken two string namely str and occ. Str is the original strin and occ is the sting for which we have to find out the count. Using strncpy function I have copied the length of occ i.e. n chars into a temp array and then checked whether it is a permutation of the occ string or not.

#include<iostream.h>  
#include<conio.h>  
#include<string.h>

int permutate(char str1[],char str2[]);  
int permutate(char str1[],char str2[]) {  
    int c[256]={0},i,j;  
    for(i=0;i<strlen(str1);i++)  
        c[str1[i]]++;      

    for(i=0;i<strlen(str2);i++) {  
        c[str2[i]]--;      
        if(c[str2[i]]<0)   
            return 1;   //not a permutation       
    }  
    return 0;           //permutation   
}  

int main()  {
    //enter code here  
    char str[]="forxxorfxdofr",occ[]="for",temp[10];
    int n,i,x,t=0;   
    n=strlen(occ);
    for(i=0;i<strlen(str);i++) {
        strncpy(temp,str+i,n);    //copy the n char from str to temp
        x=permutate(temp,occ);
        if(x==0)                  //if string is a permutation
            t++;
    }
    cout<<"Count = " << t;
    return 0;
}  
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