I have a question about recursive data structures in Haskell (language that I'm currently trying to learn).

I would like to encode in Haskell Prolog-like terms, but every solution I came up with has different drawbacks that I would really like to avoid. I would like to find a cheap and elegant way of encoding a BNF grammar in Haskell types, if you wish to see my problem from this perspective.

Just as a reminder, some prolog terms could be `male`

, `sum(2, 3.1, 5.1)`

, `btree(btree(0, 1), Variable)`

.

### Solution 1

```
data Term = SConst String
| IConst Integer
| FConst Double
| Var String
| Predicate {predName :: String, predArgs :: [Term]}
```

With this solution I can have nested predicates (since `predArgs`

are `Term`

), but I can't distinguish predicates from other terms in type signatures.

### Solution 2

```
data Term = SConst String
| IConst Integer
| FConst Double
| Var String
data Predicate = Predicate {predName :: String, predArgs ::[Either Term Predicate}
```

In this variant I can clearly distinguish predicates from basic terms, but the `Either`

type in the `predArgs`

list can be quite a nuisance to manage later in the code (I think... I'm new to Haskell).

### Solution 3

```
data Term = SConst String
| IConst Integer
| FConst Double
| Var String
| Struct String [Term]
data Predicate = Predicate String [Term]
```

With this last solution, I split terms in two different types as before, but this time I avoid `Either Term Predicate`

adding a `Struct`

constructor in `Term`

with basically the same semantics as `Predicate`

.

It's just like solution 1 with two predicate constructors for terms. One is recursion-enabled, `Struct`

, and the other one, `Predicate`

is to be able to distinguish between predicates and regular terms.

The problem with this try is that `Struct`

and `Predicate`

are structurally equivalent and have almost the same meaning, but I will not be able to write functions that works - in example - both on `(Predicate "p" [])`

and `(Struct "p" [])`

.

So again my question is: please, is there a better way to encode my predicates and terms such that:

- I'm able to distinguish between predicate and terms in type signatures;
- nested predicates like
`p(q(1), r(q(3), q(4)))`

are supported; - I can write functions that will work uniformly on predicates, without any distinction like the one in solution #3?

Please feel free to ask me for further clarifications should you need any.

Thank you very much.