Learn You a Haskell mentions difference lists (search for this term on that page), where a list
l is represented not directly but as a function
(l++). This allows more efficient concatenation on both left and right. Concatenation becomes function composition, and one can finally convert to a real list by
($). I was wondering what operations one can support efficiently on difference lists. For example, the equivalent of
(:) for difference lists is
\x l -> (x:) . l
Can one efficiently implement
tail for difference lists? Here is the obvious implementation:
headTailDifList :: ([a] -> [a]) -> (a, [a] -> [a]) headTailDifList dl = (head l, ((tail l)++)) where l = dl 
For real lists,
\l -> (head l, tail l) runs in constant time. What about this
headTailDifList? Perhaps due to lazy evaluation only the first element of
l will be evaluated?
- What does it even mean to ask if this runs in constant time, given that a difference list is a function and not an actual "value"?
headTailDifListrun in constant time?
Is there some other constant-time implementation? Here's a candidate:
headTailDifList dl = (head (dl ), tail.dl )
However, the tail part does not throw an exception if
id(the empty difference list).