Turn data type into a map

I want to turn my data type, Exp, into a map where the function names (Add, Subtract, etc) are the keys and the values are the number of times they occurred in an expression. Here is my data declaration:

``````data Exp = Number     Int
| Subtract   Exp Exp
| Multiply   Exp Exp
| Divide     Exp Exp
deriving Show
``````

I can do this problem with a BST but I can't seem to accomplish this task with a different data type. Here is my BST solution if it helps:

``````import Data.Map

data Tree a = Empty | Node a (Tree a) (Tree a) deriving (Show)
leaf x = Node x Empty Empty

foldt :: (a -> b -> b) -> b -> Tree a -> b
foldt f a Empty = a
foldt f a (Node x xl xr) = f x ar
where al = foldt f a xl
ar = foldt f al xr

insert' :: Ord a => a -> Map a Int -> Map a Int
insert' a = insertWith (+) a 1

toMap :: Ord a => Tree a -> Map a Int
toMap = foldt insert' empty
``````

It seems like it should be simple after doing the above program but I don't even know where to start. Note: I want to use as much recursion as possible. Thanks in advance!

-

Your tree function worked with trees that contained `a` to make values of type `b`, but your `Exp` data type doesn't contain anything except expressions to combine (or count). Let's make a second data type that we can count occurences of. It'd better be `Ord`, so we need `Eq`, and `Show`'ll be good for output:

``````data Term = NumberTerm | AddTerm | SubtractTerm | MultiplyTerm | DivideTerm
deriving (Eq, Ord, Show)
``````

Each of those represents a term of the `Exp` type.

I've renamed your `insert'` to `inc`:

``````inc :: Ord a => a -> Map a Int -> Map a Int
inc a = insertWith (+) a 1
``````

``````countExp :: Exp -> Map Term Int
``````

A `Number` has just one term (no subterms), so we'll start with `empty` and increment the number of `NumberTerm`s:

``````countExp (Number _) = inc NumberTerm empty
``````

`Add` terms are more complicated. Each expression has its own count, so we use `countExp` recursively on each subterm, then we `unionWith (+)` to sum the counts. After that, we `inc AddTerm` to include the current `Add` term in the totals.

``````countExp (Add e1 e2) = inc AddTerm \$ unionWith (+) (countExp e1) (countExp e2)
``````

We can do almost exactly the same for `Subtract`:

``````countExp (Subtract e1 e2) = inc SubtractTerm \$ unionWith (+) (countExp e1) (countExp e2)
``````

You get the idea now I hope so you can finish off.

-
Thank you for your answer! I was able to get it working and now I'm just breaking it down and trying to understand what is happening. Thanks again! –  user2548080 Jul 19 '13 at 15:56

Here's one option, which is a slight variation on AndrewC's answer. Rather than creating a separate data type representing the constructors of your `Exp` type as numbers, you could instead represent expressions as a free monad over a simpler base type. For example, if the base type is

``````import Control.Monad.Free
import Data.Map

data ExpT a = Number a
| Subtract a a
| Multiply a a
| Divide a a
deriving (Eq,Ord,Show)
``````

then your expressions can be defined as the free monad over `ExpT`, with `Int` as the root type

``````type Exp = Free ExpT Int
``````

Now you write `inc` as in AndrewC's post

``````inc :: Ord a => a -> Map a Int -> Map a Int
inc a = insertWith (+) a 1
``````

and the `countExp` function is again very similar

``````countExp :: Exp -> Map (ExpT ()) Int
countExp (Free (Number _)) = inc (Number ()) empty
countExp (Free (Add a b))  = inc (Add () ()) \$ unionWith (+) (countExp a) (countExp b)
``````

et cetera. You'll probably want to define some convenience functions for creating expressions

``````number :: Int -> Exp

number n = Free (Number (Pure n))
``````>>> countExp (add (number 1) (number 2))
Looking at it again, you don't actually need `Free` -- you could use `Fix` which would be just as good. –  Chris Taylor Jul 19 '13 at 22:12