I'm trying to create a function which will change a proposition into disjunctive normal form.

It will do this by reading in a list of Valuation :

```
type Valuation = [(Variable, Bool)] -- Valuation of variables to truth values
```

and using these:

```
findBool :: (Variable, Bool)->Bool
findBool (_,x) = x
findVar :: (Variable, Bool)->Variable
findVar (x,_) = x
```

Also Proposition is:

```
data Prop = Falsum -- a contradiction, or
| Var Variable -- a variable, or
| Not Prop -- a negation of a formula, or
| Or Prop Prop -- a disjunction of two formulae, or
| And Prop Prop -- a conjunction of two formulae, or
| Imp Prop Prop -- a conditional of two formulae.
deriving (Eq, Show)
```

I think what I have so far is pretty solid but I can't see what to do for the empty case. Here's what I have so far:

```
minterm :: Valuation -> Prop
minterm [] = ?
minterm (x:xs) = if (findBool x) then (And (findVar x) (minterm xs)) else (And (Not(findVar x) (minterm xs))
```

my goal is for:`minterm [("p",True),("q",False)]`

to return: `And (Var "p") (Not (Var "q"))`

**edit:**
Not Falsum works but I'd prefer if it didn't return anything. Is there anyway I can exclude cases where it would be returned so I can get something like this:

`minterm [("p",True),("q",False)]`

== `And (Var "p") (Not (Var "q"))`

`Not Falsum`

– Ingo Nov 14 '13 at 11:26