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 trying to evaluate different substring search (ala strstr) algorithms and implementations and looking for some well-crafted needle and haystack strings that will catch worst-case performance and possible corner-case bugs. I suppose I could work them out myself but I figure someone has to have a good collection of test cases sitting around somewhere...

share|improve this question
What's your end goal here? Just to learn about the algorithms? Or do you have an application with unusual needles/haystacks? –  Jefromi Jun 28 '10 at 17:24
In the short term, just to learn about the algorithms. In the long term, I have a C library implementation oriented towards very small size with above-average performance that's using the naive approach to strstr, and I'd like to consider replacing that with one of the O(n) time/O(1) space algorithms. SMOA looks promising but I want to see if the constant 6 in the 6n+5 upper bound on comparisons is problematic in practice (my initial tests show it being much lower on remotely sane data, and comparable in performance to glibc without all the special-casing for short/long needles). –  R.. Jun 28 '10 at 19:02

4 Answers 4

Some thoughts and a partial answer to myself:

Worst case for brute force algorithm:

a^(n+1) b in (a^n b)^m

e.g. aaab in aabaabaabaabaabaabaab

Worst case for SMOA:

Something like yxyxyxxyxyxyxx in (yxyxyxxyxyxyxy)^n. Needs further refinement. I'm trying to ensure that each advancement is only half the length of the partial match, and that maximal suffix computation requires the maximal amount of backtracking. I'm pretty sure I'm on the right track because this type of case is the only way I've found so far to make my implementation of SMOA (which is asymptotically 6n+5) run slower than glibc's Two-Way (which is asymptotically 2n-m but has moderately painful preprocessing overhead).

Worst case for anything rolling-hash based:

Whatever sequence of bytes causes hash collisions with the hash of the needle. For any reasonably-fast hash and a given needle, it should be easy to construct a haystack whose hash collides with the needle's hash at every point. However, it seems difficult to simultaneously create long partial matches, which are the only way to get the worst-case behavior. Naturally for worst-case behavior the needle must have some periodicity, and a way of emulating the hash by adjusting just the final characters.

Worst case for Two-Way:

Seems to be very short needle with nontrivial MS decomposition - something like bac - where the haystack contains repeated false positives in the right-half component of the needle - something like dacdacdacdacdacdacdac. The only way this algorithm can be slow (other than by glibc authors implementing it poorly...) is by making the outer loop iterate many times and repeatedly incur that overhead (and making the setup overhead significant).

Other algorithms:

I'm really only interested in algorithms that are O(1) in space and have low preprocessing overhead, so I haven't looked at their worst cases so much. At least Boyer-Moore (without the modifications to make it O(n)) has a nontrivial worst-case where it becomes O(nm).

share|improve this answer

Doesn't answer your question directly, but you may find the algorithms in the book - Algorithms on Strings, Trees and Sequences: Computer Science and Computational Biology - interesting (has many novel algorithms on sub-string search). Additionally, it is also a good source of special and complex cases.

share|improve this answer
Thanks, but it's really test/benchmarking ideas I'm looking for. I have a decent reference on algorithms here: www-igm.univ-mlv.fr/~lecroq/string/index.html Two Way and SMOA seem to be the only "fast" (in big-O) algorithms suitable for code that's not allowed to have failure cases, as the rest are nonconstant in space and could fail under stressed memory conditions. However the naive implementation is also very interesting and seems like it may be optimal up to extremely large needle sizes. It's roughly twice as fast as glibc's Two Way for short to moderate strings I've tried. –  R.. Jun 29 '10 at 13:22
Thanks for the link! that's a real nice compilation of exact string matching algorithms. –  tathagata Jun 29 '10 at 13:57

A procedure that might give interesting statistics, though I have no time to test right now:

Randomize over string length, then randomize over string contents of that length, then randomize over offset/length of a substring (possibly something not in the string), then randomily clobber over the substring (possibly not at all), repeat.

share|improve this answer

You can generate container strings (resp., contained test values) recursively by:

Starting with the empty string, generate all strings given by the augmentation of a string currently in the set by adding a character from an alphabet to the left or the right (both).

The alphabet for generating container strings is chosen by you.

You test 2 alphabets for contained strings. One is the one that makes up container strings, the other is its complement.

share|improve this answer

Your Answer


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

Not the answer you're looking for? Browse other questions tagged or ask your own question.