The original answer is correct for: is a string `a`

a *substring* of `b`

(misread).

Using a trie, you can simply add all strings to it in a first iteration, and in the 2nd iteration, start reading each word, let it be `w`

. If you find a word that you finished your read, but did not reach the string terminator (`$`

usually), you reach some node `v`

in the trie.

By doing a DFS from `v`

, you can get all strings which `w`

is prefix of them.

high level pseudo code:

```
t <- new trie
for each word w:
t.add(w)
for each word w:
node <- t.getLastNode(w)
if node.val != $
collection<- DFS(node) (excluding w itself)
w is a prefix of each word in collection
```

Note: in order to optimize it, you might need to do some extra work: if `a`

is prefix of `b`

, and `b`

is prefix of `c`

, then `a`

is prefix of `c`

, so - when you do the DFS, if you reach some node that was already searched - just append its strings to the current prefix.

Still, since there could be quadric number of possibilities (`"a", "aa", "aaa", ....`

), getting all of them requires quadric time.

Original answer: finding if `a`

is a *substring* of `b`

:

The suggested solution runs in a quadric complexity, you will need to check each two pairs, giving you `O(n* (n-1) * |S|)`

.

You can build a suffix tree from the strings in the first iteration, and in the 2nd iteration check if each string is a non trivial entry (not itself) of another string.

This solution is `O(n*|S|)`