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I am looking for the differences between Dynamic Time Warping and Needleman-Wunsch algorithm.

Basically, they both find an alignment score. I need to calculate alignment(similarity) score between short sequence of strings(<20 characters) and there are couple of thousands of them. I wasn't able to figure out the differences between two algorithm and decide which one to choose for my work. Can anyone please clear me the differences? Thanks.

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Why not use a simple edit distance, such as the Levenshtein distance –  Iterator Aug 5 '11 at 4:36
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Edit distance won't work for me as I need to align the string sequence first –  iinception Aug 5 '11 at 5:15
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I think this question would be more suitable on crossvalidated.com. –  Roman Luštrik Aug 5 '11 at 10:28
    
I wonder if bioconducter would be a better fit for this question? –  Brandon Bertelsen Aug 5 '11 at 18:28

2 Answers 2

up vote 5 down vote accepted

Both of these algorithms use dynamic programming to determine an alignment of sequential data. The major difference here is how the score for i,j is determined.
In Dynamic Time Warping, a cost(determined by a function of i, j) is added to the minimum value of the set(i-1,j), (i-1,j-1), (j, i-1).
In NW, the maximum of of the set(i-1,j) + weight, (i-1,j-1)+ S(Ai,Bi), (j, i-1) + weight is taken, such that S(A , B ) is determined by a look up in the similarity matrix.
If your would like to make an alignment through enumerable space and can create a similarity matrix, (such as a protein sequence or words), use NW, however, if you are aligning data where you can't make a similarity matrix(like a time series), and need to use a function, go with DTW. Alignments can be a tricky thing, and you may have to tweak parameters to get things right. good luck.

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Thanks for the answer. But still I have confusions.Do you mean that I cant use DTW for string alignment? Will DTW and NW will produce a same alignment for a given string sequence? –  iinception Aug 5 '11 at 16:32
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You could use DTW for sting alignment, as long as you can calculate cost as a function of A, B. Whether or not they produce the same alignment for a given sequence depends on 1) the content of the sequence 2) the gap penalty & similarity matrix for NW 3) the cost function for DWT. –  wespiserA Aug 5 '11 at 16:49
    
Yeah..i can compute cost as a function of A,B. How would the content of the sequence would effect the alignment given that I run both algorithms under identical conditions. –  iinception Aug 5 '11 at 17:12
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NW would disfavor gaps, becuase DTW doesn't assign a gap penalty, but rather weighs each event, insertion, deletion, gap equally. It may be that sequence N will be aligned differently under these two algorithms as a function of its sequence, but I'm not able to prove that. Two small strings, of equal length and composition would be aligned the same, but as difference in length and composition come into play, its hard to imagine that the two algos would align them the same. They way to find out is to do a side by side comparison of the alignment, and look for features that indicate a differnc –  wespiserA Aug 5 '11 at 17:43
    
hmm..thanks for the explanation :) –  iinception Aug 6 '11 at 0:02

How about using Jarowinkler for similarity measure and Levenshtein for measuring the distance (minimum number of edition)

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