Recently, I try to sovle the Haskell 99 Problems, the 66th (layout a tree compactly). I successed, but got confused by the solutions here(http://www.haskell.org/haskellwiki/99_questions/Solutions/66).
layout :: Tree a -> Tree (a, Pos) layout t = t' where (l, t', r) = layoutAux x1 1 t x1 = maximum l + 1 layoutAux :: Int -> Int -> Tree a -> ([Int], Tree (a, Pos), [Int]) layoutAux x y Empty = (, Empty, ) layoutAux x y (Branch a l r) = (ll', Branch (a, (x,y)) l' r', rr') where (ll, l', lr) = layoutAux (x-sep) (y+1) l (rl, r', rr) = layoutAux (x+sep) (y+1) r sep = maximum (0:zipWith (+) lr rl) `div` 2 + 1 ll' = 0 : overlay (map (+sep) ll) (map (subtract sep) rl) rr' = 0 : overlay (map (+sep) rr) (map (subtract sep) lr) -- overlay xs ys = xs padded out to at least the length of ys -- using any extra elements of ys overlay :: [a] -> [a] -> [a] overlay  ys = ys overlay xs  = xs overlay (x:xs) (y:ys) = x : overlay xs ys
why the caculation of 'x1' and 'sep' don't cause infinit loop? How they been calculated?