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Haskell algebraic data type pattern matching

I have the following:

``````data Alpha a = Beta a [Alpha a]
val = Beta 1 [Beta 2 [], Beta 5 [Beta 7 []]]
``````

I'm trying to define a function that will move over a val of type Alpha Int and sum it. My desired approach is to extract all the Ints and then sum the resulting list, but I am struggling to extract all the Ints as I don't know what to do with the recursion...

a slight attempt:

``````checkAlpha :: Alpha Int -> [Int]
checkAlpha (Beta a []) = [a]
checkAlpha (Beta a b) = [a] ++ (map checkAlpha b)
``````

Obviously this doesn't quite work but I can't see a solution in sight.

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In your function, `b` has type `[Alpha Int]`. Mapping `checkAlpha` over this list gives you `[[Int]]`, but your signature says you want to return `[Int]`. That's why you have to "collapse" the list into one layer - i.e. `(concat .) . map` also known as `concatMap`. – Vitus May 4 '12 at 22:56
the minimal fix is to insert `concat \$` between `(` and `map checkAlpha b)` in your code, to flatten one level off of the list of lists. Then you notice that the first clause is an instance of the second, because `map _ [] === []`. Then you replace `[a]++` with `a:` to arrive at Daniel's solution. So you were really close. :) – Will Ness May 13 '12 at 12:44

If you used

``````concatMap :: (a -> [b]) -> [a] -> [b]
``````

instead of `map`, it would work and be elegant enough.

You don't need to treat the case of an empty list as second component specially,

``````checkAlpha :: Alpha a -> [a]
checkAlpha (Beta a alphas) = a : concatMap checkAlpha alphas
``````

does what you want, and is independent of the parameter type.

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You could consider using `Tree` instead of `Alpha`, which has many handy operations:

``````> flatten \$ Node 1 [Node 2 [], Node 5 [Node 7 []]]
[1,2,5,7]
``````
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