# Getting all string combinations by given maximal Hamming distance (number of mismatches) in Java

Is there an algorithm go generate all possible string combinations of a string (DNA Sequence) by a given number of maximal allowed positions that can variate (maximal Mismatches, maximal Hamming distance)?

The alphabet is {A,C,T,G}.

Example for a string AGCC and maximal number of Mismatches 2:

Hamming distance is 0
{AGCC}
Hamming distance is 1
{CGCC, TGCC, GGCC, AACC, ACCC, ATCC, AGAC, AGTC, ..., AGCG}
Hamming distance is 2
{?}

One possible approach would be to generate a set with all permutations of a given String, iterate over them and remove all strings with greater Hamming distance that it should be.

That approach is very ressource-eating, by a given String of 20 characters and maximal Hamming distance of 5.

Is there another, more efficient approcahes / implementations for that?

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recursively call the function that generate combinations for distance 1 for all values that was returned and put to the Set to avoid duplications – Fedor Skrynnikov Oct 9 '13 at 10:42
Thank you, I'll also try that kind of solution. – Max Wiens Oct 9 '13 at 11:07

Just use a normal permutation generation algorithm, except that you pass around the distance, decrementing it when you've got a different character.

static void permute(char[] arr, int pos, int distance, char[] candidates)
{
if (pos == arr.length)
{
System.out.println(new String(arr));
return;
}
// distance > 0 means we can change the current character,
//   so go through the candidates
if (distance > 0)
{
char temp = arr[pos];
for (int i = 0; i < candidates.length; i++)
{
arr[pos] = candidates[i];
int distanceOffset = 0;
// different character, thus decrement distance
if (temp != arr[pos])
distanceOffset = -1;
permute(arr, pos+1, distance + distanceOffset, candidates);
}
arr[pos] = temp;
}
// otherwise just stick to the same character
else
permute(arr, pos+1, distance, candidates);
}

Call with:

permute("AGCC".toCharArray(), 0, 1, "ACTG".toCharArray());

Performance note:

For a string length of 20, distance of 5 and a 5-character alphabet, there are already over 17 million candidates (assuming my code is correct).

The above code takes less than a second to go through them on my machine (without printing), but don't expect any generator to be able to generate much more than that in a reasonable amount of time, as there are simply too many possibilities.

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Thank you, that seems to work very well, unless println() is very slow :) – Max Wiens Oct 9 '13 at 11:06