# Anyone know an example algorithm for word segmentation using dynamic programming?

If you search google for word segmentation there really are no very good descriptions of it and I'm just trying to fully understand the process a dynamic programming algorithm takes to find a segmentation of a string into individual words. Does anyone know a place where there is a good description of a word segmentation problem or can anyone describe it?

Word Segmentation is basically just taking a string of characters and deciding where to split it up into words if you didn't know and using dynamic programming it would take into account some amount of subproblems. This is pretty simple to do using recursion but I haven't been able to find anywhere online to find even just a description of an iterative algorithm for this online, so if anyone has any examples or can give an algorithm that would be great.

Thanks for any help.

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Why does this have to be harder than just splitting the string at every space character? –  David Hedlund Nov 23 '09 at 7:49
See my answer for an example, d. –  Amber Nov 23 '09 at 7:53
Yea the spaces are removed for the string of characters. Dav, what would you do if you had a list of words that were valid so you also had to check if a word was valid or not? I'm having a hard time understanding your implementation exactly. –  Bill Nov 23 '09 at 8:34

I'm going to assume that we're not talking about the trivial case here (i.e. not just splitting a string around spaces, since that'd just be a basic tokenizer problem) - but instead, we're talking about something were there isn't a clear word delimiter character, and thus we're having to "guess" what the best match for string->words would be - for instance, the case of a set of concatenated words w/o spaces, such as transforming this:

``````lotsofwordstogether
``````

into this:

``````lots, of, words, together
``````

In this case, the dynamic programming approach would probably be to calculate out a table where one dimension corresponds to the `M`th word in the sequence, and the other dimension corresponds to each `N`th character in the input string. Then the value that you fill in for each square of the table is "the best match score we can get if we end (or instead, begin) the `M`th word at position `N`.

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