Consider the following abbreviated code from this excellent blog post:

```
import System.Random (Random, randomRIO)
newtype Stream m a = Stream { runStream :: m (Maybe (NonEmptyStream m a)) }
type NonEmptyStream m a = (a, Stream m a)
empty :: (Monad m) => Stream m a
empty = Stream $ return Nothing
cons :: (Monad m) => a -> Stream m a -> Stream m a
cons a s = Stream $ return (Just (a, s))
fromList :: (Monad m) => [a] -> NonEmptyStream m a
fromList (x:xs) = (x, foldr cons empty xs)
```

Not too bad thus far - a monadic, recursive data structure and a way to build one from a list.

Now consider this function that chooses a (uniformly) random element from a stream, using constant memory:

```
select :: NonEmptyStream IO a -> IO a
select (a, s) = select' (return a) 1 s where
select' :: IO a -> Int -> Stream IO a -> IO a
select' a n s = do
next <- runStream s
case next of
Nothing -> a
Just (a', s') -> select' someA (n + 1) s' where
someA = do i <- randomRIO (0, n)
case i of 0 -> return a'
_ -> a
```

I'm not grasping the mysterious cyclic well of infinity that's going on in the last four lines; the result `a'`

depends on a recursion on `someA`

, which itself *could* depend on `a'`

, but not necessarily.

I get the vibe that the recursive worker is somehow 'accumulating' potential values in the `IO a`

accumulator, but I obviously can't reason about it well enough.

Could anyone provide an explanation as to how this function produces the behaviour that it does?