I haven't seen many examples of the scalaz state monad. There is this example but it is hard to understand and there is only one other question on stack overflow it seems.

I'm going to post a few examples I've played with but I would welcome additional ones. Also if somebody can provide example on why `init`, `modify`, `put` and `gets` are used for that would be great.

Edit: here is an awesome 2 hours presentation on the state monad.

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I assume the following imports:

``````import scalaz._
import Scalaz._
``````

The state type is defined as `State[S, A]` where `S` is type of the state and `A` is the type of the value being decorated. The basic syntax to create a state value makes use of the `state[S, A]` function:

``````// Create a state computation incrementing the state and returning the "str" value
val s = state[Int, String](i => (i + 1, "str"))
``````

To run the state computation on a initial value:

``````// start with state of 1, pass it to s
s ! 1
// returns result value "str"

// same but only retrieve the state
s ~> 1
// 2

// get both state and value
s(1)
// (2, "str")
``````

The state can be threaded through function calls. To do this instead of `Function[A, B]`, define `Function[A, State[S, B]]]`. Use the `state` function...

``````import java.util.Random
def dice() = state[Random, Int](r => (r, r.nextInt(6) + 1))
``````

Then the `for/yield` syntax can be use to compose functions:

``````def TwoDice() = for {
r1 <- dice()
r2 <- dice()
} yield (r1, r2)

TwoDice() ! new Random(1L)
// resulting value is (Int, Int) = (4,5)
``````

Here is another example. Fill a list with `TwoDice()` state computations.

``````val list = List.fill(10)(TwoDice())
// List[State[Random, (Int,Int)]]
``````

Use sequence to get a `State[Random, List[(Int,Int)]]`. We need to provide a type alias.

``````type StateRandom[x] = State[Random,x]
val list2 = list.sequence[StateRandom, (Int,Int)]
// list2: StateRandom[List[(Int, Int)]] = scalaz.States\$\$anon\$1@4d89ab
// run this computation starting with state new Random(1L)
val tenDoubleThrows = list2 ! new Random(1L)
// List((4,5), (2,4), (3,5), (3,5), (5,5), (2,2), (2,4), (1,5), (3,1), (1,6))
``````

Another example with `State[Map[Int, Int], Int]` to compute frequency of sums on the list above. `freqSum` computes the sum of the throws and counts frequencies.

``````def freqSum(dice: (Int, Int)) = state[Map[Int,Int], Int]{ freq =>
val s = dice._1 + dice._2
val tuple = s -> (freq.getOrElse(s, 0) + 1)
(freq + tuple, s)
}
``````

Now use traverse to apply `freqSum` over `tenDoubleThrows`. `traverse` is equivalent to `map(freqSum).sequence`.

``````type StateFreq[x] = State[Map[Int,Int],x]
// only get the state
tenDoubleThrows.traverse[StateFreq, Int](freqSum) ~> Map[Int,Int]()
// Map[Int,Int] = Map(10 -> 1, 6 -> 3, 9 -> 1, 7 -> 1, 8 -> 2, 4 -> 2)
``````

In short, it seems the key to use state is to have functions returning a function modifying the state and the actual result value desired... Disclaimer: I have never used `state` in production code, just trying to get a feel for it.

I gave up on trying using `stateT` may be someone else can show if `StateFreq` or `StateRandom` can be augmented to perform the combined computation. What I found instead is that the composition of the two state transformers can be combined like this:

``````def stateBicompose[S, T, A, B](
f: State[S, A],
g: (A) => State[T, B]) = state[(S,T), B]{ case (s, t) =>
val (newS, a) = f(s)
val (newT, b) = g(a) apply t
(newS, newT) -> b
}
``````

It's predicated on `g` being a one parameter function taking the result of the first state transformer and returning a state transformer. Then the following would work:

``````def diceAndFreqSum = stateBicompose(TwoDice, freqSum)
type St2[x] = State[(Random, Map[Int,Int]), x]
List.fill(10)(diceAndFreqSum).sequence[St2, Int] ~> (new Random(1L), Map[Int,Int]())
``````
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Isn't the `State` monad not a "state transformer" in reallity? And as a second question: Is there some nicer way to combine the dice rolling and the summing into one single State monad? How would you do that given the two monads? –  ziggystar Oct 12 '11 at 8:20
@ziggystar, technically `StateFreq` and `StateRandom` are monads. I don't think `State[S, x]` is a monad transformer since `S` does not need to be a monad. For a nicer way to combine, I'm wondering too. I don't see anything obviously readily available. May be `stateT` could help but I haven't figured it out yet. –  huynhjl Oct 13 '11 at 12:22
I didn't write "monad transformer" but "state transformer". The `State[S, x]'` objects don't hold a state but a transformation of the latter. It's just that I think the name could be chosen less confusing. That's nothing about your answer but about Scalaz. –  ziggystar Oct 13 '11 at 12:42
@ziggystar, indeed. –  huynhjl Oct 13 '11 at 12:47
@ziggystar, I figured out how to leverage `stateT` to combine rolling and summing into a single `StateT` monad! See stackoverflow.com/q/7782589/257449. Got stuck towards the end, then I figured out `traverse` eventually. –  huynhjl Oct 16 '11 at 7:05

I stumbled on an interesting blog post Grok Haskell Monad Transformers from sigfp that has an example of applying two state monads through a monad transformer. Here is a scalaz translation.

The first example shows a `State[Int, _]` monad:

``````val test1 = for {
a <- init[Int]
_ <- modify[Int](_ + 1)
b <- init[Int]
} yield (a, b)

val go1 = test1 ! 0
// (Int, Int) = (0,1)
``````

So I have here an example of using `init` and `modify`. After playing with it a bit, `init[S]` turns out to be really convenient to generate a `State[S,S]` value, but the other thing it allows is to access the state inside the for comprehension. `modify[S]` is a convenient way to transform the state inside the for comprehension. So the example above can be read as:

• `a <- init[Int]`: start with an `Int` state, set it as the value wrapped by the `State[Int, _]` monad and bind it to `a`
• `_ <- modify[Int](_ + 1)`: increment the `Int` state
• `b <- init[Int]`: take the `Int` state and bind it to `b` (same as for `a` but now the state is incremented)
• yield a `State[Int, (Int, Int)]` value using `a` and `b`.

The for comprehension syntax already makes it trivial to work on the `A` side in `State[S, A]`. `init`, `modify`, `put` and `gets` provide some tools to work on the `S` side in `State[S, A]`.

The second example in the blog post translates to:

``````val test2 = for {
a <- init[String]
_ <- modify[String](_ + "1")
b <- init[String]
} yield (a, b)

val go2 = test2 ! "0"
// (String, String) = ("0","01")
``````

Very much the same explanation as `test1`.

The third example is more tricky and I hope there is something simpler that I have yet to discover.

``````type StateString[x] = State[String, x]

val test3 = {
val stTrans = stateT[StateString, Int, String]{ i =>
for {
_ <- init[String]
_ <- modify[String](_ + "1")
s <- init[String]
} yield (i+1, s)
}
val initT = stateT[StateString, Int, Int]{ s => (s,s).pure[StateString] }
for {
b <- stTrans
a <- initT
} yield (a, b)
}

val go3 = test3 ! 0 ! "0"
// (Int, String) = (1,"01")
``````

In that code, `stTrans` takes care of the transformation of both states (increment and suffix with `"1"`) as well as pulling out the `String` state. `stateT` allows us to add state transformation on an arbitrary monad `M`. In this case the state is an `Int` that is incremented. If we called `stTrans ! 0` we would end up with `M[String]`. In our example, `M` is `StateString`, so we'll end up with `StateString[String]` which is `State[String, String]`.

The tricky part here is that we want to pull out the `Int` state value out from `stTrans`. This is what `initT` is for. It just creates an object that gives access to the state in a way we can flatMap with `stTrans`.

Edit: Turns out all of that awkwardness can be avoided if we truly reused `test1` and `test2` which conveniently store the wanted states in the `_2` element of their returned tuples:

``````// same as test3:
val test31 = stateT[StateString, Int, (Int, String)]{ i =>
val (_, a) = test1 ! i
for (t <- test2) yield (a, (a, t._2))
}
``````
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