# Monadic fold with State monad in constant space (heap and stack)?

Is it possible to perform a fold in the State monad in constant stack and heap space? Or is a different functional technique a better fit to my problem?

The next sections describe the problem and a motivating use case. I'm using Scala, but solutions in Haskell are welcome too.

### Fold in the `State` Monad Fills the Heap

Assume Scalaz 7. Consider a monadic fold in the State monad. To avoid stack overflows, we'll trampoline the fold.

``````import scalaz._
import Scalaz._
import scalaz.std.iterable._
import Free.Trampoline

type TrampolinedState[S, B] = StateT[Trampoline, S, B] // monad type constructor

type S = Int  // state is an integer
type M[B] = TrampolinedState[S, B] // our trampolined state monad

type R = Int  // or some other monoid

val col: Iterable[R] = largeIterableofRs() // defined elsewhere

val (count, sum): (S, R) = col.foldLeftM[M, R](Monoid[R].zero){
(acc: R, x: R) => StateT[Trampoline, S, R] {
s: S => Trampoline.done {
(s + 1, Monoid[R].append(acc, x))
}
}
} run 0 run

// In Scalaz 7, foldLeftM is implemented in terms of foldRight, which in turn
// is a reversed.foldLeft. This pulls the whole collection into memory and kills
// the heap.  Ignore this heap overflow. We could reimplement foldLeftM to avoid
// this overflow or use a foldRightM instead.
// Our real issue is the heap used by the unexecuted State mobits.
``````

For a large collection `col`, this will fill the heap.

I believe that during the fold, a closure (a State mobit) is created for each value in the collection (the `x: R` parameter), filling the heap. None of those can be evaluated until `run 0` is executed, providing the initial state.

Can this O(n) heap usage be avoided?

More specifically, can the initial state be provided before the fold so that the State monad can execute during each bind, rather than nesting closures for later evaluation?

Or can the fold be constructed such that it is executed lazily after the State monad is `run`? In this way, the next `x: R` closure would not be created until after the previous ones have been evaluated and made suitable for garbage collection.

Or is there a better functional paradigm for this sort of work?

### Example Application

But perhaps I'm using the wrong tool for the job. The evolution of an example use case follows. Am I wandering down the wrong path here?

Consider reservoir sampling, i.e., picking in one pass a uniform random `k` items from a collection too large to fit in memory. In Scala, such a function might be

``````def sample[A](col: TraversableOnce[A])(k: Int): Vector[A]
``````

and if pimped into the `TraversableOnce` type could be used like this

``````val tenRandomInts = (Int.Min to Int.Max) sample 10
``````

The work done by `sample` is essentially a `fold`:

``````def sample[A](col: Traversable[A])(k: Int): Vector[A] = {
col.foldLeft(Vector()){update(k)(_: Vector[A], _: A)}
}
``````

However, `update` is stateful; it depends on `n`, the number of items already seen. (It also depends on an RNG, but for simplicity I assume that is global and stateful. The techniques used to handle `n` would extend trivially.). So how to handle this state?

The impure solution is simple and runs with constant stack and heap.

``````/* Impure version of update function */
def update[A](k: Int) = new Function2[Vector[A], A, Vector[A]] {
var n = 0
def apply(sample: Vector[A], x: A): Vector[A] = {
n += 1
algorithmR(k, n, acc, x)
}
}

def algorithmR(k: Int, n: Int, acc: Vector[A], x: A): Vector[A] = {
if (sample.size < k) {
sample :+ x // must keep first k elements
} else {
val r = rand.nextInt(n) + 1 // for simplicity, rand is global/stateful
if (r <= k)
sample.updated(r - 1, x) // sample is 0-index
else
sample
}
}
``````

But what about a purely functional solution? `update` must take `n` as an additional parameter and return the new value along with the updated sample. We could include `n` in the implicit state, the fold accumulator, e.g.,

``````(col.foldLeft ((0, Vector())) (update(k)(_: (Int, Vector[A]), _: A)))._2
``````

But that obscures the intent; we only really intend to accumulate the sample vector. This problem seems ready made for the State monad and a monadic left fold. Let's try again.

We'll use Scalaz 7, with these imports

``````import scalaz._
import Scalaz._
import scalaz.std.iterable_
``````

and operate over an `Iterable[A]`, since Scalaz doesn't support monadic folding of a `Traversable`.

`sample` is now defined

``````// sample using State monad
def sample[A](col: Iterable[A])(k: Int): Vector[A] = {
type M[B] = State[Int, B]

// foldLeftM is implemented using foldRight, which must reverse `col`, blowing
// the heap for large `col`.  Ignore this issue for now.
// foldLeftM could be implemented differently or we could switch to
// foldRightM, implemented using foldLeft.
col.foldLeftM[M, Vector[A]](Vector())(update(k)(_: Vector[A], _: A)) eval 0
}
``````

where update is

``````// update using State monad
def update(k: Int) = {
(acc: Vector[A], x: A) => State[Int, Vector[A]] {
n => (n + 1, algorithmR(k, n + 1, acc, x)) // algR same as impure solution
}
}
``````

Unfortunately, this blows the stack on a large collection.

So let's trampoline it. `sample` is now

``````// sample using trampolined State monad
def sample[A](col: Iterable[A])(k: Int): Vector[A] = {
import Free.Trampoline

type TrampolinedState[S, B] = StateT[Trampoline, S, B]
type M[B] = TrampolinedState[Int, B]

// Same caveat about foldLeftM using foldRight and blowing the heap
// applies here.  Ignore for now. This solution blows the heap anyway;
// let's fix that issue first.
col.foldLeftM[M, Vector[A]](Vector())(update(k)(_: Vector[A], _: A)) eval 0 run
}
``````

where update is

``````// update using trampolined State monad
def update(k: Int) = {
(acc: Vector[A], x: A) => StateT[Trampoline, Int, Vector[A]] {
n => Trampoline.done { (n + 1, algorithmR(k, n + 1, acc, x) }
}
}
``````

This fixes the stack overflow, but still blows the heap for very large collections (or very small heaps). One anonymous function per value in the collection is created during the fold (I believe to close over each `x: A` parameter), consuming the heap before the trampoline is even run. (FWIW, the State version has this issue too; the stack overflow just surfaces first with smaller collections.)

• I don't think your guess is accurate, that there is "one function per value" being created on the heap and that this is what's eating your memory. The composite function is lazily created. Think about it. When you say `f = s => bigFun()` then `bigFun` does not actually occur until you pass `s`. At which point `f` can be discarded unless you are holding on to it. More likely what is happening is that your collection is overly strict. Try with an `EphemeralStream` and compare the results. – Apocalisp Dec 24 '13 at 23:27
• Lazy creation was my initial understanding, but I am seeing those closures created (using a profiler). It's after the initial state is provided and the trampoline is run, but before the trampoline actually executes each thing. See my comments on your answer. – David B. Dec 25 '13 at 5:40
• Incidentally, once my confusion is resolved, I'll edit my question to remove red herrings (e.g, whether the collection fitting in memory. That's not actually relevant; just the big-O heap usage of the monadic fold...) – David B. Dec 25 '13 at 5:48

## 2 Answers

Our real issue is the heap used by the unexecuted State mobits.

No, it is not. The real issue is that the collection doesn't fit in memory and that `foldLeftM` and `foldRightM` force the entire collection. A side effect of the impure solution is that you are freeing memory as you go. In the "purely functional" solution, you're not doing that anywhere.

Your use of `Iterable` ignores a crucial detail: what kind of collection `col` actually is, how its elements are created and how they are expected to be discarded. And so, necessarily, does `foldLeftM` on `Iterable`. It is likely too strict, and you are forcing the entire collection into memory. For example, if it is a `Stream`, then as long as you are holding on to `col` all the elements forced so far will be in memory. If it's some other kind of lazy `Iterable` that doesn't memoize its elements, then the fold is still too strict.

I tried your first example with an `EphemeralStream` did not see any significant heap pressure, even though it will clearly have the same "unexecuted State mobits". The difference is that an `EphemeralStream`'s elements are weakly referenced and its `foldRight` doesn't force the entire stream.

I suspect that if you used `Foldable.foldr`, then you would not see the problematic behaviour since it folds with a function that is lazy in its second argument. When you call the fold, you want it to return a suspension that looks something like this immediately:

``````Suspend(() => head |+| tail.foldRightM(...))
``````

When the trampoline resumes the first suspension and runs up to the next suspension, all of the allocations between suspensions will become available to be freed by the garbage collector.

Try the following:

``````def foldM[M[_]:Monad,A,B](a: A, bs: Iterable[B])(f: (A, B) => M[A]): M[A] =
if (bs.isEmpty) Monad[M].point(a)
else Monad[M].bind(f(a, bs.head))(fax => foldM(fax, bs.tail)(f))

val MS = StateT.stateTMonadState[Int, Trampoline]
import MS._

foldM[M,R,Int](Monoid[R].zero, col) {
(x, r) => modify(_ + 1) map (_ => Monoid[R].append(x, r))
} run 0 run
``````

This will run in constant heap for a trampolined monad `M`, but will overflow the stack for a non-trampolined monad.

But the real problem is that `Iterable` is not a good abstraction for data that are too large to fit in memory. Sure, you can write an imperative side-effecty program where you explicitly discard elements after each iteration or use a lazy right fold. That works well until you want to compose that program with another one. And I'm assuming that the whole reason you're investigating doing this in a `State` monad to begin with is to gain compositionality.

So what can you do? Here are some options:

1. Make use of `Reducer`, `Monoid`, and composition thereof, then run in an imperative explicitly-freeing loop (or a trampolined lazy right fold) as the last step, after which composition is not possible or expected.
2. Use `Iteratee` composition and monadic `Enumerator`s to feed them.
3. Write compositional stream transducers with Scalaz-Stream.

The last of these options is the one that I would use and recommend in the general case.

• For my tests, I used an anonymous `new Iterator{...}` (that simply incremented a `var: Int`). This doesn't hold prior elements in memory (confirmed with the stateful solution in the example application). Its behavior should be the same on the other `sample` implementations. – David B. Dec 25 '13 at 4:40
• I'm not concerned about some Iterable collections requiring all elements to be in memory---that should be considered when the collection is chosen. I am concerned about `foldLeftM[State[B]](...)(...)` using an additional `O(n)` heap space. (I should have been more specific in the question; I just thought the "too large to fit in memory" explanation was more simple to explain.) – David B. Dec 25 '13 at 4:45
• To be clear, I'm not trying to dispute your analysis (heck, I learned about `StateT[Trampoline, S, B]` from your paper on free monads and the stack overflows), just understand the root cause of my issue. Your three suggestions may be better for my problem (thanks!), but I'd like to understand why my `foldLeftM[StateT[Trampoline, S, B]` isn't using constant additional heap. – David B. Dec 25 '13 at 4:53
• With `foldLeftM` on a N element collection, I'm seeing N `scalaz.IterableInstances\$\$anonfunc\$foldRight\$1\$1\$\$anonfun\$apply\$1` functions created each referencing a `scalaz.Foldable\$\$anonfun\$foldLeftM\$2\$\$anonfun\$apply\$10` closure over the collection element. These are all created at once when `Trampoline.run` is called, before any are excuted and unwound. – David B. Dec 25 '13 at 5:32
• Updated the answer to reflect your reason why this works with `EphemeralStream`. – Apocalisp Dec 25 '13 at 14:33

Using `State`, or any similar monad, isn't a good approach to the problem. Using `State` is condemned to blow the stack/heap on large collections. Consider a value of `x: State[A,B]` constructed from a large collection (for example by folding over it). Then `x` can be evaluated on different values of the initial state `A`, yielding different results. So `x` needs to retain all information contained in the collection. An in pure settings, `x` can't forget some information not to blow stack/heap, so anything that is computed remains in memory until the whole monadic value is freed, which happens only after the result is evaluated. So the memory consumption of `x` is proportional to the size of the collection.

I believe a fitting approach to this problem is to use functional iteratees/pipes/conduits. This concept (referred to under these three names) was invented to process large collections of data with constant memory consumption, and to describe such processes using simple combinator.

I tried to use Scalaz' `Iteratees`, but it seems this part isn't mature yet, it suffers from stack overflows just as `State` does (or perhaps I'm not using it right; the code is available here, if anybody is interested).

However, it was simple using my (still a bit experimental) scala-conduit library (disclaimer: I'm the author):

``````import conduit._
import conduit.Pipe._

object Run extends App {
// Define a sampling function as a sink: It consumes
// data of type `A` and produces a vector of samples.
def sampleI[A](k: Int): Sink[A, Vector[A]] =
sampleI[A](k, 0, Vector())

// Create a sampling sink with a given state. It requests
// a value from the upstream conduit. If there is one,
// update the state and continue (the first argument to `requestF`).
// If not, return the current sample (the second argument).
// The `Finalizer` part isn't important for our problem.
private def sampleI[A](k: Int, n: Int, sample: Vector[A]):
Sink[A, Vector[A]] =
requestF((x: A) => sampleI(k, n + 1, algorithmR(k, n + 1, sample, x)),
(_: Any) => sample)(Finalizer.empty)

// The sampling algorithm copied from the question.
val rand = new scala.util.Random()

def algorithmR[A](k: Int, n: Int, sample: Vector[A], x: A): Vector[A] = {
if (sample.size < k) {
sample :+ x // must keep first k elements
} else {
val r = rand.nextInt(n) + 1 // for simplicity, rand is global/stateful
if (r <= k)
sample.updated(r - 1, x) // sample is 0-index
else
sample
}
}

// Construct an iterable of all `short` values, pipe it into our sampling
// funcition, and run the combined pipe.
{
print(runPipe(Util.fromIterable(Short.MinValue to Short.MaxValue) >->
sampleI(10)))
}
}
``````

Update: It'd be possible to solve the problem using `State`, but we need to implement a custom fold specifically for `State` that knows how to do it constant space:

``````import scala.collection._
import scala.language.higherKinds
import scalaz._
import Scalaz._
import scalaz.std.iterable._

object Run extends App {
// Folds in a state monad over a foldable
def stateFold[F[_],E,S,A](xs: F[E],
f: (A, E) => State[S,A],
z: A)(implicit F: Foldable[F]): State[S,A] =
State[S,A]((s: S) => F.foldLeft[E,(S,A)](xs, (s, z))((p, x) => f(p._2, x)(p._1)))

// Sample a lazy collection view
def sampleS[F[_],A](k: Int, xs: F[A])(implicit F: Foldable[F]):
State[Int,Vector[A]] =
stateFold[F,A,Int,Vector[A]](xs, update(k), Vector())

// update using State monad
def update[A](k: Int) = {
(acc: Vector[A], x: A) => State[Int, Vector[A]] {
n => (n + 1, algorithmR(k, n + 1, acc, x)) // algR same as impure solution
}
}

def algorithmR[A](k: Int, n: Int, sample: Vector[A], x: A): Vector[A] = ...

{
print(sampleS(10, (Short.MinValue to Short.MaxValue)).eval(0))
}
}
``````
• Your first paragraph jibes with my understanding of what is happening---the monad references the entire collection with its own O(N)-sized set of closures and can't unwind/free those until provided the initial state. I believe that @Apocalisp is saying that for an appropriate implementation of fold, the collection isn't iterated until the initial state is provided and the trampoline is run---an element can be freed when the next one is loaded. – David B. Dec 25 '13 at 21:23
• Regardless, the `Iteratee`/conduit approach suggested by both of you should avoid all this complication and fold-implementation-specific headache anyway. – David B. Dec 25 '13 at 21:24
• @DavidB. Another option (updated in the answer) is to create a specific function for folding in the `State` monad in constant space. I guess this is something half-way to the tramolined monad approach. – Petr Pudlák Dec 26 '13 at 8:35