Given a set of strings, I need to remove every string that is a sub-string of another in the set. The sub-string could occur in any position. I expect that at least 50% of strings will be sub-strings of others. My strings are n-grams from large natural language corpora.
For example, given ("the big car", "big car", "at the big car", "buy a big car", "buy a big", "buy a big house") then the results should be ("at the big car", "buy a big car", "buy a big house"); ordering the output is not important.
Because my set has 100,000's of strings then brute force testing each string against all others is not an option.
Does anyone know a standard solution to this problem?
Or, can anyone add to some thoughts I've had:
if I sort the strings first it should be easier to pick off sub-strings at the start of strings (and ends of strings with reverse sort)? Still need to deal with sub-strings in other places.
use a tree structure? something like the following? (i) add START and END tokens to each string; (ii) first node in tree is START; (iii) string "big car" --> new branch START-big-car-END, but then when "the big car" is added the branch becomes START-the-big-car-END; (iv) once all strings inserted then read off all paths from START to ENDs. Not sure about this given a potentially large set of words (at least 1000's). Also, problem of same word occurring more than once in a sentence.
could I add some kind of memory to the brute force, such that the next string processed can be first compared to a set of previously deleted strings?