# Using scalaz state in a more complicated computation

I'm trying to understand how to use scalaz `State` to perform a complicated stateful computation. Here is the problem:

Given a `List[Int]` of potential divisors and a `List[Int]` of numbers, find a `List[(Int, Int)`] of matching pairs (divisor, number) where a divisor is allowed to match at most one number.

As a test:

``````def findMatches(divs: List[Int], nums: List[Int]): List[(Int, Int)]
``````

And with the following input:

``````findMatches( List(2, 3, 4), List(1, 6, 7, 8, 9) )
``````

We can get at most 3 matches. If we stipulate that the matches must be made in the order in which they occur traversing the lists l-r, then the matches must be:

``````List( (2, 6) ,  (3, 9) , (4, 8) )
``````

So the following two tests need to pass:

``````assert(findMatches(List(2, 3, 4), List(1, 6, 7, 8, 9)) == List((2, 6), (3, 9), (4, 8)))
assert(findMatches(List(2, 3, 4), List(1, 6, 7, 8, 11)) == List((2, 6),  (4, 8)))
``````

Here's an imperative solution:

``````scala> def findMatches(divs: List[Int], nums: List[Int]): List[(Int, Int)] = {
|   var matches = List.empty[(Int, Int)]
|   var remaining = nums
|   divs foreach { div =>
|     remaining find (_ % div == 0) foreach { n =>
|       remaining = remaining filterNot (_ ==  n)
|       matches = matches ::: List(div -> n)
|     }
|   }
|   matches
| }
findMatches: (divs: List[Int], nums: List[Int])List[(Int, Int)]
``````

Notice that I have to update the state of `remaining` as well as accumulating `matches`. It sounds like a job for scalaz traverse!

My useless working has got me this far:

``````scala> def findMatches(divs: List[Int], nums: List[Int]): List[(Int, Int)] = {
| divs.traverse[({type l[a] = State[List[Int], a]})#l, Int]( div =>
| state { (rem: List[Int]) => rem.find(_ % div == 0).map(n => rem.filterNot(_ == n) -> List(div -> n)).getOrElse(rem -> List.empty[(Int, Int)]) }
| ) ~> nums
| }
<console>:15: error: type mismatch;
found   : List[(Int, Int)]
required: Int
state { (rem: List[Int]) => rem.find(_ % div == 0).map(n => rem.filterNot(_ == n) -> List(div -> n)).getOrElse(rem -> List.empty[(Int, Int)]) }
^
``````
-

Your code only needs to be slightly modified in order to use State and Traverse:

``````// using scalaz-seven
import scalaz._
import Scalaz._

def findMatches(divs: List[Int], nums: List[Int]) = {

// the "state" we carry when traversing
case class S(matches: List[(Int, Int)], remaining: List[Int])

// initially there are no found pairs and a full list of nums
val initialState = S(List[(Int, Int)](), nums)

// a function to find a pair (div, num) given the current "state"
// we return a state transition that modifies the state
def find(div: Int) = modify((s: S) =>
s.remaining.find(_ % div == 0).map { (n: Int) =>
S(s.matches :+ div -> n, s.remaining -n)
}.getOrElse(s))

// the traversal, with no type annotation thanks to Scalaz7
// Note that we use `exec` to get the final state
// instead of `eval` that would just give us a List[Unit].
divs.traverseS(find).exec(initialState).matches
}

// List((2,6), (3,9), (4,8))
findMatches(List(2, 3, 4), List(1, 6, 7, 8, 9))
``````

You can also use `runTraverseS` to write the traversal a bit differently:

`````` divs.runTraverseS(initialState)(find)._2.matches
``````
-
Don't you have the pair the wrong way round? I though `State` took a function `S => (S, A)`. It seems you are returning `(A, S)` –  oxbow_lakes Feb 8 '12 at 14:00
Ah - seems this might have changed in scalaz7. Looks like `State` is also an alias for `StateT[Id, S, A]`. Sheesh –  oxbow_lakes Feb 8 '12 at 14:07
Eric - does this definitely work? Can you show me in a REPL? I converted it to scalaz6 and I get duplicates! The reason is that the match is being held as a `List[(Int, Int)]` rather than an `Option[(Int, Int)]` –  oxbow_lakes Feb 8 '12 at 14:20
Apologies - you already explained the "incremental list of matches" issue. I've converted your example to scalaz 6 below –  oxbow_lakes Feb 8 '12 at 14:28
Cleaned this answer up a little. –  Apocalisp Feb 8 '12 at 16:54

I have finally figured this out after much messing about:

``````scala> def findMatches(divs: List[Int], nums: List[Int]): List[(Int, Int)] = {
| (divs.traverse[({type l[a] = State[List[Int], a]})#l, Option[(Int, Int)]]( div =>
|   state { (rem: List[Int]) =>
|     rem.find(_ % div == 0).map(n => rem.filterNot(_ == n) -> Some(div -> n)).getOrElse(rem -> none[(Int, Int)])
|   }
| ) ! nums).flatten
| }
findMatches: (divs: List[Int], nums: List[Int])List[(Int, Int)]
``````

I think I'll be looking at Eric's answer for more insight into what is actually going on, though.

### Iteration #2

``````scala> def findMatches2(divs: List[Int], nums: List[Int]): List[(Int, Int)] = {
|   case class S(matches: List[(Int, Int)], remaining: List[Int])
|   val initialState = S(nil[(Int, Int)], nums)
|   def find(div: Int, s: S) = {
|     val newState = s.remaining.find(_ % div == 0).map { (n: Int) =>
|       S(s.matches :+ div -> n, s.remaining filterNot (_ ==  n))
|     }.getOrElse(s)
|     newState -> newState.matches
|   }
|   val findDivs = (div: Int) => state((s: S) => find(div, s))
|   (divs.traverse[({type l[a]=State[S, a]})#l, List[(Int, Int)]](findDivs) ! initialState).join
| }
findMatches2: (divs: List[Int], nums: List[Int])List[(Int, Int)]

scala> findMatches2(List(2, 3, 4), List(1, 6, 7, 8, 9))
res11: List[(Int, Int)] = List((2,6), (2,6), (3,9), (2,6), (3,9), (4,8))
``````

The `join` on the `List[List[(Int, Int)]]` at the end is causing grief. Instead we can replace the last line with:

``````(divs.traverse[({type l[a]=State[S, a]})#l, List[(Int, Int)]](findDivs) ~> initialState).matches
``````

### Iteration #3

In fact, you can do away with the extra output of a state computation altogether and simplify even further:

``````scala> def findMatches2(divs: List[Int], nums: List[Int]): List[(Int, Int)] = {
| case class S(matches: List[(Int, Int)], remaining: List[Int])
| def find(div: Int, s: S) =
|   s.remaining.find(_ % div == 0).map( n => S(s.matches :+ div -> n, s.remaining filterNot (_ ==  n)) ).getOrElse(s) -> ()
| (divs.traverse[({type l[a]=State[S, a]})#l, Unit](div => state((s: S) => find(div, s))) ~> S(nil[(Int, Int)], nums)).matches
| }
findMatches2: (divs: List[Int], nums: List[Int])List[(Int, Int)]
``````

### Iteration #4

`modify` described above by Apocalisp is also available in scalaz6 and removes the need to explicitly supply the `(S, ())` pair (although you do need `Unit` in the type lambda):

``````scala> def findMatches2(divs: List[Int], nums: List[Int]): List[(Int, Int)] = {
| case class S(matches: List[(Int, Int)], remaining: List[Int])
| def find(div: Int) = modify( (s: S) =>
|   s.remaining.find(_ % div == 0).map( n => S(s.matches :+ div -> n, s.remaining filterNot (_ ==  n)) ).getOrElse(s))
| (divs.traverse[({type l[a]=State[S, a]})#l, Unit](div => state(s => find(div)(s))) ~> S(nil, nums)).matches
| }
findMatches2: (divs: List[Int], nums: List[Int])List[(Int, Int)]

scala> findMatches2(List(2, 3, 4), List(1, 6, 7, 8, 9))
res0: List[(Int, Int)] = List((2,6), (3,9), (4,8))
``````
-