What is the best algorithm to find the sets in a finite collection of sets that are a subset of a specific set?

For example, if

```
A = {1, 2}
B = {2, 3, 4}
C = {3, 5}
D = {6}
```

and X = `{1, 2, 3, 5}`

Then, A and C are subsets of X.

Is there an algorithm that I could do this in linear time complexity?

**Implementation Note:** The members of the sets are generally from a very limited range, therefore, it could be a good idea to use C++ bitset to implement the algorithm. Couldn't it?

**Edit:** The number of sets in the collection is generally very greater than The number of elements in X (in the example). Is there a way to do this linear in terms of the number of elements in X? Probably using hash or something?

butusing a hashtable will make such a problem be linear time in practice (if the sets are of a reasonable length). So the answer to your question is that the time complexity will be`M*N*Q`

, if M is the number of sets (A-D), N is the size of the largest of those sets, and Q is the size of the set X. – David Robinson Sep 24 '12 at 6:35