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Suppose I have a list of 1 million words. I have the length of the phrase that I need to find, and I know that this word can be composed of at most 3 other words, for example Queen of England, has 14 letters, and the letters are adeeefglnnnoqu.

The problem is that, given a dictionary that big, first I'd have to search for the first word, which could have anything from 1 to 14 letters, then for the second word (if the first one doesn't have 14 letters), then the third word.

Given a dictionary size of 1 million words, the first loop would have to loop through all of them, then the second one also needs to loop through all 1 million words, because it has to eliminate the letters that were consumed by the first word, and loop through all the 1 million words for the ones that are still valid without the letters that the first word consumed. The third loop would be a little easier, since I know the exact length of the word (14 - word1.length - word2.length).

That's at the very least, only considering the first 2 loops, 1,000,000,000,000 iterations. Is there a better way to do this?

This question is language agnostic, since I don't really care about what language I need to use to solve this problem.

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up vote 1 down vote accepted

You can speed up the process by filtering out the words that clearly do not belong, i.e. the words that have letters not found in the phrase. Once you pre-filter the 1M list, you should end up with much shorter sub-list. Running your algorithm on that sub-list should be significantly faster, since it's an O(N^2) algorithm: even if you narrow down the list to ten percent of the words (I expect you to get much fewer words than that) you'd get a 100-fold improvement. It is OK for list to have "false positives", as long as potential matches are not thrown away.

Here is how you can do the pre-filtering: for each word, build its "signature", a 26-bit number with a bit set for each letter present in the word at least once (letters are numbered 0 through 25, ignoring the case). For example, the word "Queen" would have a signature with bits 4, 13, 16, and 20 set to one.

Now construct a signature for your three-word phrase, and use it to filter the list of 1M words: if a bitwise OR of the word's signature and the phrase's signature equals the phrase's signature, keep the word; otherwise, throw it away.

Your filtered list should be much shorter, so your O(N^2) algorithm should run much faster.

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