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.
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
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.