# Efficient Data Structure For Substring Search?

Assume I have a set of strings S and a query string q. I want to know if any member of S is a substring of q. (For the purpose of this question substring includes equality, e.g. "foo" is a substring of "foo".) For example assume the function that does what I want is called `anySubstring`:

``````S = ["foo", "baz"]
q = "foobar"
assert anySubstring(S, q)  # "foo" is a substring of "foobar"

S = ["waldo", "baz"]
assert not anySubstring(S, q)
``````

Is there any easy-to-implement algorithm to do this with time complexity sublinear in `len(S)`? It's ok if S has to be processed into some clever data structure first because I will be querying each S with a lot of q strings, so the amortized cost of this preprocessing might be reasonable.

EDIT: To clarify, I don't care which member of S is a substring of q, only whether at least one is. In other words, I only care about a boolean answer.

-
Are the strings in S short? How does the length of the longest string in S compare with the length of S? –  aelguindy Mar 9 '12 at 16:04

I think Aho-Corasick algorithm does what you want. I think there is another solution which is very simple to implement, it's Karp-Rabin algorithm.

-
I cannot believe I am the only person to upvote the right answer. –  Nemo Mar 10 '12 at 16:23

Create a regular expression `.*(S1|S2|...|Sn).*` and construct its minimal DFA.

Run your query string through the DFA.

-
-1 how this is efficient? –  Saeed Amiri Mar 10 '12 at 12:31
@SaeedAmiri If OP does not care at all about the efficiency of the preprocessing, then once the DFA is created, all queries run in time linear in the length of q, independent of any aspect of S. –  aelguindy Mar 10 '12 at 17:07
@aelguindy, suffix tree works in similar Order with less constant factor and less memory, in fact you should convert your DFA finally to something like trie. –  Saeed Amiri Mar 10 '12 at 17:36
@SaeedAmiri How do you check that your query string has the suffix tree string as a substring? Suffix trees should be built when the text is fixed not the patterns.. –  aelguindy Mar 10 '12 at 20:26

So if the length of S is way less then the sum of the lengths of the potential substrings your best option would be to build a suffix tree from S and then do a search in it. This is linear with respect to the length of S plus the summar length of the candidate substrings. Of course there can not be an algorithm with better complexity as you have to pass through all the input at least. If the case is opposite i.e. the length of s is more then the summar length of the substrings your best option would be aho-corasick.

Hope this helps.

-
It fits for the other way around - querying many times with a single `q`, but in here - the `S` is constant, and `q` is changing... –  amit Mar 9 '12 at 15:29
@amit I think Aho-Corasick does what OP wants.. It operates much like your solution except that the trie has failure transitions that take you to the right position in the automaton. –  aelguindy Mar 9 '12 at 16:08
@aelguindy: I was speaking only about the suffix tree approach, I am afraid I am not familiar with the mentioned algorithm, but I will read how it works later today. –  amit Mar 9 '12 at 16:11
@amit Yes, you are right regarding your comment about the suffix tree, I though you're commenting on the entire answer, sorry :-). –  aelguindy Mar 10 '12 at 17:08