# how to efficiently check if the Levenshtein edit distance between two string is 1 [closed]

please note that it doesn't require to really calculate Levenshtein edit distance. just check it's 1 or not.

The signature of the method may look like this:

``````bool Is1EditDistance(string s1, string s2).
``````

for example: 1. "abc" and "ab" return true 2. "abc" and "aebc" return true 3. "abc" and "a" return false.

I've tried recursive approve, but it it not efficient.

update: got answer from a friend:

``````        for (int i = 0; i < s1.Length && i < s2.Length; i++)
{
if (s1[i] != s2[i])
{
return s1.Substring(i + 1) == s2.Substring(i + 1)   //case of change
|| s1.Substring(i + 1) == s2.Substring(i)       //case of s1 has extra
|| s1.Substring(i) == s2.Substring(i + 1);      //case of s2 has extra
}
}
return Math.Abs(s1.Length - s2.Length) == 1;
``````
-

## closed as not a real question by verdesmarald, Eugen Constantin Dinca, Baz, Sergey K., ЯegDwightSep 28 '12 at 9:57

It's difficult to tell what is being asked here. This question is ambiguous, vague, incomplete, overly broad, or rhetorical and cannot be reasonably answered in its current form. For help clarifying this question so that it can be reopened, visit the help center.If this question can be reworded to fit the rules in the help center, please edit the question.

Which edit distance? Levenshtein? Hamming? –  Bitwise Sep 28 '12 at 2:35
Could you flesh out this question a bit more? Perhaps tell us what you have tried? –  senderle Sep 28 '12 at 2:35
there are multiple types of distances defined b/w strings..Jaro–Winkler distance , Hamming , Levenshtein...which one ? –  mmhasannn Sep 28 '12 at 2:42
Uses dynamic programming algo , I know only the recursive version...lemoda.net/c/levenshtein/index.html –  mmhasannn Sep 28 '12 at 2:47

If you only care if the distance is exactly 1 or not, you can do something like this:

• If the difference of the strings' lengths is not 0 or 1, return false.
• If both strings have length `n`, loop `i = 0..n` checking `s1[i] == s2[i]` for all `i` except one.
• If the strings have length `n` and `n+1`, let `i` be the smallest index where `s1[i] != s2[i]`, then loop `j=i..n` checking `s1[j] == s2[j+1]` for all `j`.
-
This is the most efficient solution. This is far superior to running a variant of the levenshtein algorithm where a max distance is specified and you give up once it becomes apparent that the max distance has been exceeded. –  damzam Sep 28 '12 at 5:32