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I was reading about a stemming which is the problem of matching words to a common root and seems to be a standard problem in search engines.
When I first thought about this problem, I thought that this is a classic application of the longest common substring problem applied to N words.
E.g. for the words {computation, compute, computers} the longest common substring is compute and this is the stem/root.
But I read that this is not the solution to the problem. Actually it seems that this is not even a consideration and other approaches (suffix removal, stochastic etc) are the standard solutions.

My question is: why isn't the longest common substring of N words a solution to this problem?

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One thing that springs to mind is that the LCS may not be a prefix... –  Oliver Charlesworth Mar 2 '13 at 11:31
@OliCharlesworth:Hm.Then Longest Common Prefix using prefix tries? –  Cratylus Mar 2 '13 at 11:32
So you have an English word and you want to reduce it to its stem. What exactly do you apply LCS to? –  NPE Mar 2 '13 at 11:35
Yes, that would work in your example. But it wouldn't work for applications where you're interested in non-trivial morphology (e.g. "dries" --> "dry"). –  Oliver Charlesworth Mar 2 '13 at 11:36
@Cratylus: Well, then I suppose it really comes down to what you want your algorithm to do. If it's sufficient for "dry", "dries", "draw" and "drew" to have a common stem, then prefix trees would work just fine... ;) –  Oliver Charlesworth Mar 2 '13 at 11:47

1 Answer 1

In many languages, the linguistic stem is often not a common substring. For example the verb "to be" is extremely irregular in many languages.

Even for English nouns, there are exceptional examples such as { index, indexes, indices }. You really want to use "index" as the stem; if you use the much shorter "ind" as the stem, you're going to get collisions, in this case that independent politicians have their abbreviated political party as "ind".

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