Take the 2-minute tour ×
Stack Overflow is a question and answer site for professional and enthusiast programmers. It's 100% free, no registration required.

I'm looking for an algorithm to accomplish the following. I'm not asking for specific code or anything (because I imagine it's very complex). Just some concepts or even the name of an appropriate mathematical/programmatical algorithm would be very helpful.

I have complex situation where I need to compare 2 vectors which may be different in length. One of these vectors will be the "standard" and I need to compute a score of how closely the second one matches it. I'm primarily concerned with whether the second vector contains all of the first vector's elements, and whether they occur in the same order. It's ok if vector B contains extra elements throughout it, so long as it still contains vector A's elements and in the same order.

Furthermore, I need to compute a score of how closely the vectors match on a continuous scale (not simply a perfect or non-match). So, if only two of the mutual elements of large vectors are out of order, the score should be decreased, but not by that much. Also, if only 1 element is missing in vector B, the score should be slightly reduced. Now, the actual individual ELEMENTS can be compared on a perfect match/non-match basis, but whether the whole vectors match must be graded on a continuous scale.

I need an algorithm to do this, and it does not need to be particularly fast, just accurate. Any ideas or references to potentially helpful information would be greatly appreciated! Thanks!

P.S. If it's helpful, the actual application is that I'm trying to compare the grammatical structures two sentences. I'll have a "standard" sentence to measure against, and I need to see how closely other sentences match it. These other sentences may have a few extra words in them (such as adjectives, etc.) but still follow the same basic structure.

share|improve this question

Your Answer

 
discard

By posting your answer, you agree to the privacy policy and terms of service.

Browse other questions tagged or ask your own question.