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I have to build a function which determines if I have a conjunction of well-formed formulas built in this way :

cong ::= '(' and wff wff ...')'

Let's suppose I have the code which determines if a formula is wff. The function must first check if the first element of the list is 'and and then check recursively the rest of the sublists if they are wff. Note that p is also a wff so it doesn't neccessarily have to be a sublist.

Example : (and (or a b v) (and a b d) m n)

Here's what I tried which doesn't work for me :

(defun cong (fbf)
    (and (eq (first fbf) 'and )
        (reduce (lambda (x y) (and x y))
            (mapcar #'wff (rest fbf)))))
share|improve this question
What does it do when you run it? – ckb Feb 12 '13 at 15:24
CL-USER 27 : 7 > (cong '(and a b c d)) Error: Cannot take CAR of A. – Ester Vojkollari Feb 12 '13 at 15:28

Assuming a working wff predicate, your code will work. For example, using numberp as the predicate:

(defun cong (fbf)
  (and (eq (first fbf) 'and)
       (reduce (lambda (x y) (and x y))
               (mapcar #'numberp (rest fbf)))))

Works fine:

CL-USER> (cong '(and 1 2 3 4 5))
CL-USER> (cong '(and 1 2 3 4 foo))
CL-USER> (cong '(1 2 3 4))

Note, that this can be done more easily:

(defun cong (fbf)
  (and (eq (first fbf) 'and)
       (every #'wff (cdr fbf))))

Also, note that in CL, by convention, predicates usually should end in p.

So, your, given your comment above, your problem is the wff predicate, which doesn't seem to work for atoms. Since you mentioned that p satisfies wff, that predicate is plain wrong, but if you have to use it (assuming this is some kind of homework), just check if the element at hand is a cons:

(defun cong (fbf)
  (and (eq (first fbf) 'and)
       (every #'wff (remove-if-not #'consp (cdr fbf)))))

This assumes that every atom satisfies wff. Thus, they won't change the outcome of a conjunction and can be dropped. Otherwise, you'd have to write another predicate to check for atoms satisfying wff or, which would be the right thing to do, fix wff in the first place.

Also, note that none of this really involves recursion, since you're only asking how to apply a predicate to a list and take the conjunction of the results.

share|improve this answer
Well, I don't get it how wff can be wrong. That predicate should test if a formulae is well formed and is based on calling other functions. Here how it is defined: and here's the grammar it supports – Ester Vojkollari Feb 12 '13 at 16:19
Here, I translated the grammar a bit : – Ester Vojkollari Feb 12 '13 at 16:27
Well, in fbf-fun, predicato is evaluated after predicates that operate on lists. For example, negazione takes the car of its argument without previously checking whether it is a list at all. You'd have to check if the argument is a cons first – otherwise these tests will break. – danlei Feb 12 '13 at 16:28
I'm sorry but I do not understand. What do you mean predicato is evaluated after predicates that operate on lists. I know that negazione takes the car of its argument without previously checking whether it is a list but when negazione fails, shouldn't the operator or in fbf-fun try to evaluate the remaining predicates like cong, disg, etc ? – Ester Vojkollari Feb 12 '13 at 16:35
The thing is that this is not ML-style pattern matching. The code for negazione will be run, whether its argument is a list or not, thus it will try taking the car of an atom, if that was its argument. Applying car to an atom, however, will signal an unhandled type-error. Your predicate never returns and thus the other or branches will not execute. – danlei Feb 12 '13 at 16:44

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