Given a string s and an array of smaller strings, T, design a method to search s for each small string in T.
Thanks.

Assuming you have a significant number of smaller strings, RabinKarp is the standard way to search for multiple small strings in a very very large string. if You only have a few smaller strings, simply repeating BoyerMoore for each one might be a better alternative. 


The fastest way that I know of that solves this problem is the AhoCorasick algorithm. For large strings and large numbers of patterns to be searched, it is faster than applying a linear time search (e.g. KMP, RabinKarp, BoyerMoore) for each pattern. But are you sure you need something like this and that your strings are too long for the straightforward method of string matching? 


You can't pick a "best" algorithm without knowing more details about the data set.
Without this information, the "best" solution is the simplest one.



Could you please clarify a bit? **The algorithm would STRONGLY depend on what you mean by "Search for". **
A simplistic method (assuming search strings all start out fairly differently) is to:
You may wish to read this for advanced stuff 


Let's make it into a Java solution
You can make it faster using Falaina's recommendations, but do you really need it? 


If you have room for a table of pointers (Pointer Size * NumCharsInSource), you can sort each string in the source (the string starting at character) using something like QSort. You can then BSearch the smaller strings into the pointer table. Assuming N characters and M substrings, the sort will have O(N lg N) performance and the lookups will have O(M lg N) performance. The overall performance should be O((N+M) lg N). However, there can be degenerate cases in which the strings in the source are highly repetitive (i.e. 100,000 a's followed by a b). That will make the compare for the sort portion very slow :( to get around this, you can special case long runs of characters but that gets much more complicated. The algorithm to choose really depends on your source data and how much spare memory you have to work with. 


This sounds like a simple for loop:


