Find All Anagrams in a String

1. Both STR and PTR consist of English uppercase letters. 2. Length of string 'STR' will always be greater than or equal to the length of string ‘PTR’. 3. In case, there is no anagram substring, then return an empty sequence. 4. In case of more than one anagrams, return the indices in increasing order.

The first line of input contains an integer 'T' representing the number of test cases or queries to be processed. Then the test case follows. The first line of each test case contains two space-separated integers ‘N’ and ‘M’ where ‘N’ denotes the number of characters in 'STR', and ‘M’ denotes the number of characters in ‘PTR’. The second line of each test case contains the string 'STR'. The third line of each test case contains the string ‘PTR’.

Test Case 1: 'STR' is ‘CBAEBABACD’ and ‘PTR’ is ‘ABC’. 0-2 in 'STR' index 0,1,2 are ‘CBA’, and it is an anagram with ‘ABC’. 1-3 in 'STR' index 1,2,3 are ‘BAE’, and it is not anagram with ‘ABC’. 2-4 in 'STR' index 2,3,4 are ‘AEB’, and it is not anagram with ‘ABC’. 3-5 in 'STR' index 3,4,5 are ‘EBA’, and it is not anagram with ‘ABC’. 4-6 in 'STR' index 4,5,6 are ‘BAB’, and it is not anagram with ‘ABC’. 5-7 in 'STR' index 5,6,7 are ‘ABA’, and it is not anagram with ‘ABC’. 6-8 in 'STR' index 6,7,8 are ‘BAC’, and it is an anagram with ‘ABC’. 7-9 in 'STR' index 7,8,9 are ‘ACD’, and it is not anagram with ‘ABC’. Hence, there are only two substrings in the given string 'STR' that are anagram with given string ‘PTR’ which are ‘CBA’, and ‘BAC’ and starting indices of respective anagram substrings are 0 and 6. Test case 2: 'STR' is ‘ABADE’ and ‘PTR’ is ‘BA’. In the given string ‘ABADE’ the substring of length 2 starting with index 0 is ‘AB’ which is an anagram with the string ‘BA’ and a substring of length 2 starting with index 1 is ‘BA’ which is also an anagram with the string ‘BA’. Because 0 and 1 are starting indices of the substrings, we print 0 and 1.

Brute Force Approach

We have a brute force solution to this problem. We find all substrings of STR of length M (length of PTR) and store indices of those substrings in ‘ANAGRAM_INDICIES’ which are the anagrams of given string PTR.

Here is the complete algorithm -

We store the count of characters of ‘PTR’ in array ‘PTR_MAP’. Index of a character ‘CH’ is given by 'CH’ - ‘A’.
Now, we traverse ‘STR’ and find all substrings of length ‘M’.
1. For each substring, we store the count of its characters in array ‘SUB_STR_MAP’.
2. We then compare ‘PTR_MAP’and ‘SUB_STR_MAP’.
  1. If both are identical, it means the substring is an anagram of ‘PTR’. So, we store the starting index of that substring in ‘ANAGRAM_INDICIES’in which we store all the starting indices of anagram.
Finally, we return ‘ANAGRAM_INDICIES’as our answer.

Time Complexity

O(N*M), Where ‘N’ is the number of characters in the given string ‘STR’ and ‘M’ is the number of characters in the given string ‘PTR’.

STR has N-M+1 substrings of length M. We traverse over all such substrings to check if they are an anagram of PTR. This takes O(N*M) time. Therefore, the overall complexity is O(N*M).

Space Complexity

O(1), constant space is used.

The size of the ‘subStrMap’ and ‘ptrMap’ arrays/lists to store frequencies of characters is 26 (constant).Hence the overall complexity is O(1).

Find All Anagrams in a String

Problem statement

Sample Input 1 :

Sample Output 1 :

Explanation For Sample Output 1:

Sample Input 2:

Sample Output 2: