Keep in mind this is a *lexical* rewrite. In the generator rule x and e
are not independent: x is a pattern (which introduces a bind variable)
and e is an expression (with free variables, one of which may be bound by x)
After one application of the generator rule, we get (using a lambda
expression instead of introducing a fresh function name f):
concatMap (\a -> [(a,b) | b <- [1..2]]) [1..3]
After another:
concatMap (\a -> concatMap (\b -> [(a,b)]) [1..2]) [1..3]
Note that the "a <-" and "b <-" map into \a -> and \b -> and bind the
free variables a and b in the expression (a,b).
Dan
R J wrote:
I can calculate non-nested list comprehensions without a problem, but am
unable to calculate nested comprehensions involving, for example, the
generation of a list of pairs where the first and separate elements are
drawn from two separate lists, as in:
[(a, b) | a <- [1..3], b <- [1..2]]
How does one calculate the expansion of this list? The two rules for
expanding list comprehensions are:
1. Generator rule: [e | x <- xs, Q] = concat (map f xs)
where
f x = [e | Q]
2. Guard rule: [e | p, Q] = if p then [e | Q] else []
There is a third rule that I've seen on the Internet, not in an
authoritative text:
[e | Q1 , Q2] = concat [ [e | Q 2] | Q1 ]
I don't understand what this third rule means, or whether it's relevant.
Concat and map are defined as:
concat :: [[a]] -> [a]
concat [] = []
concat (xs:xss) = xs ++ concat xss
map :: (a -> b) -> [a] -> [b]
map f [] = []
map f (x:xs) = f x : (map f xs)
Any help is appreciated.
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