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.
q2
, or allqi
s?1
,2
,4
as the shift amount? Because what you wrote can be translated as a simple left fold, no?sbox q = foldl' (\ q' i -> q' `xor` shiftL q' i) q [1, 2, 4]
Bits
typeclass represents bitvectors with bitwise operations. Instances ofBits
are not necessarily meant to be interpreted as integers. On the other hand,Int
is very common as a type of indices of a vector. Hence,shiftL
accepts anInt
.xor . shiftL
isn’t the mismatch betweenBits a => a
andInt
, but rather the fact that it’s not implicitly lifted over multiple arguments; to get the behaviour of\ q -> xor q . shiftL q
point-free, you could use the(a ->)
applicative to writeliftA2 (.) xor shiftL
, or arrows to writexor &&& shiftL >>> uncurry (.)
, but neither is very readable.