How to work around Haskell's Int shift argument in a fold using xor?

Question

I have some code (generating the Rijndael S-box, for fun) that looks like this:

q0 = q  ⊕  shiftL q  1
q1 = q0 ⊕  shiftL q0 2
q2 = q1 ⊕  shiftL q1 4

It seems kind of silly - wouldn't it be the perfect situation for a fold? But I can't use a fold because shiftL requires an Int for the distance to shift, and of course xor requires Bits.

It seems awkward to me that a function meant to operate on Bits won't accept Bits for all its arguments. I'd be curious to hear the rational for that, but I'm more eager to know if there's any elegant way to achieve the fold I want.

Answer 1

foldl :: (b -> a -> b) -> b -> [a] -> b iteratively applies a function starting with a b to a list of as until the list is exhausted and then returns the result. In this case our as can be the shift lengths. So 1, 2, 4. We can construct such a list with iterate :: (a -> a) -> a -> [a]. Indeed:

powers2 = iterate (2*) 1

Now we can feed that list to foldl. The function foldl performs is \qi s -> xor qi (shiftL qi s). So the complete function would be:

qn :: (Num a, Foldable t, Bits [a]) => Int -> r -> t Int -> [a]
qn n q = foldl (\qi s -> xor qi (shiftL qi s)) q $ take n $ iterate (2*) 1

So if we call qn 3 q we perform the function three times on q and thus obtain the q2 in your example. For example:

Prelude Data.Bits> qn 3 15
1285

Since:

q           = 0000 0000 1111
shiftL q  1 = 0000 0001 1110
              --------------
q0          = 0000 0001 0001
shiftL q0 2 = 0000 0100 0100
              --------------
q1          = 0000 0101 0101
shiftL q1 4 = 0101 0101 0000
              --------------
q2          = 0101 0000 0101

which is the binary equivalent of 1285.

Answer 2

Jon Purdy inferred what I should have stated clearly - I wanted a point-free function to pass to fold, and he provided one: liftA2 (.) xor shiftL.