I am making a mobile app to find anagrams and partial matches. Mobile is important because there is not a whole lot of computational power, and efficiency is key.

The algorithm takes any number of letters, including repeats, and finds the longest words made up from its letters, using every letter only once. I am also interested in finding the top results quickly, and am not really concerned with the bottoms (shorter ones) as long as N is met. For example:

```
STACK => stack, tacks, acts, cask, cast, cats…
```

I have done some googling and have found a few algorithms, and I came up with one which I thought would be efficient, but is not as efficient as I would like.

I have a lookup dictionary pre-made that maps a sorted key to the real words that generate that key.

```
"aelpp" => ["apple", "appel", "pepla"]
```

I have further split each dictionary into different ones based on the length of the key. So keys that are 5 letters long are in one dictionary, keys that are 6 are in another. Each of these dictionaries are in an array in which the index is the length of the keys that are found in the dictionary.

```
anagramArray[5] => dictionary5
dictionary5["aelpp"] => ["apple", "appel", "pepla"]
```

My algorithm starts by taking an input word "`lappe`

", and it sorts it:

```
"lappe" => "aelpp"
```

Now, for each dictionary that has contents of at most 5 letters, I do a comparison to pull it out. Here is pseudocode:

```
word = input.sort
for (i = word.length; i > 0; i--)
dictionaryN = array[i]
for (key in dictionaryN)
if word matches key
add to returnArray
end
end
if returnArray count > N
break
end
end
returnArray.sort by longest word, alphabetize
```

The dictionary only has about 170,000 words in it, but searches are taking up to 20 seconds for 12 letter inputs. My `match`

method makes a regex out of the key:

```
"ackst" => /a.*c.*k.*s.*t.*/
```

such that, for example, a 4 letter key such as `acst`

(acts), will match `ackst`

(stack) because:

```
"ackst" matches /a.*c.*s.*t.*/
```

I have seen other apps do the same thing in much less time, and I am wondering if my approach is garbage or just needs some tweaking.

**How can I get the maximum computational efficiency for generating the top N anagrams from a word, sorted by max length?**