Assume I have two lists, one is the text `t`

, one is a list of characters `c`

. I want to count how many times each character appears in the text.

This can be done easily with the following APL code.

```
+⌿t∘.=c
```

However it is slow. It take the outer product, then sum each column.

It is a O(nm) algorithm where n and m are the size of `t`

and `c`

.

Of course I can write a procedural program in APL that read `t`

character by character and solve this problem in O(n+m) (assume perfect hashing).

Are there ways to do this faster in APL without loops(or conditional)? I also accept solutions in J.

**Edit:**
Practically speaking, I'm doing this where the text is much shorter than the list of characters(the characters are non-ascii). I'm considering where text have length of 20 and character list have length in the thousands.

There is a simple optimization *given n is smaller than m*.

```
w ← (∪t)∩c
f ← +⌿t∘.=w
r ← (⍴c)⍴0
r[c⍳w] ← f
r
```

w contains only the characters in t, therefore the table size only depend on t and not c. This algorithm runs in O(n^2+m log m). Where m log m is the time for doing the intersection operation.

However, a sub-quadratic algorithm is still preferred just in case someone gave a huge text file.