I have a set of variable length strings, and I would like to verify that a variable length prefix string exists in at least one of the strings in that set. And strings can be added removed between consecutive searches.

The difficulty is that I do not want to store the strings of the set, but instead a space efficient representation of the set.

As an example, consider that I have the following set of strings:

```
S = {"abcd","aaaaaaaaa","dcba"}
```

searching for `a`

should return `True`

, but searching for `b`

should return `False`

. I want to search the set without storing the strings in memory.

Without storing the strings, a possible solution is to use a finite-state automaton (fsa) to represent the sequence of chars that make each string in the set. In other words, I would build the regex that matches all strings in the set. However I am not sure that it would be more space (memory) efficient than storing the strings. I also would like to add and remove strings from the set, and re-computing the fsa is probably too costly in terms of computation time.

I was thinking in using a classification algorithm, such as K-means or an SVM, but was wondering if there are any space efficient algorithms for this problem.

somewhere: what is the source of these strings, and what is the longest prefix you might want to search for? What is this "set" you cannot iterate over (yet somehow you want to iterate over it). Perhaps a little more detail might make the solution more obvious. – Floris Feb 9 '14 at 23:38