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Assignment is to show that the time complexity is Ω(2max(n,m)) in the worst case scenario for following recursive function.

Assume the following:

  • n = w1len (length of word w1),
  • m = w2len (length of word w2)

Here is the code

int dist(String w1, String w2, int w1len, int w2len) {
    if (w1len == 0) {
        return w2len;
    if (w2len == 0) {
        return w1len;
    int res = dist(w1, w2, w1len - 1, w2len - 1) + (w1.charAt(w1len - 1) == w2.charAt(w2len - 1) ? 0 : 1);      
    int addLetter = dist(w1, w2, w1len - 1, w2len) + 1;
    if (addLetter < res)
        res = addLetter;
    int deleteLetter = dist(w1, w2, w1len, w2len - 1) + 1;
    if (deleteLetter < res)
        res = deleteLetter;

    return res;
share|improve this question
What is your question? –  chepner Sep 20 '12 at 1:14
@chepner sorry if unclear. I want to know how to show that the time complexity is O(2^(max(n,m))) –  hamohl Sep 20 '12 at 1:15
A good starting point would be to trace the number of recursive calls for inputs of various lengths. –  CollinJSimpson Sep 20 '12 at 1:33
This seems to me as standard edit distance problem. The recursive solution complexity is 2^max(m,n) can be changed to n*m, if I remember correctly, using dynamic programming. –  Nishant Sep 20 '12 at 4:08
It should read big oh, not omega. –  phant0m Sep 20 '12 at 13:18

1 Answer 1

Try to draw call tree for the function. What does it look like? Can you estimate the number of invocation of dist function?

share|improve this answer
this is a comment. –  Nishant Sep 20 '12 at 4:35
@Nishant I disagree. For a question like that, the answer would be a hint as to how to procede with solving the homework. I don't like answers to homework questions which can be just copy/pasted and submitted for grade. –  MK. Sep 20 '12 at 13:53
Perhaps you're right. To me, it's the standard way -- and the one likely the OP knows. What would be better to me is make me visualize how the recursive tree is splitting. You don't have to calculate. He will do that part. The problem is, I also have problem visualizing the tree. But I know process. Anyway. This was my reason to call it comment, because it does not add anything worth while wrt this question. it's a general comment true for any recursive algorithm. –  Nishant Sep 20 '12 at 16:06

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