Take the 2-minute tour ×
Stack Overflow is a question and answer site for professional and enthusiast programmers. It's 100% free.

I'm reading 'the art of prolog' book and I found an exercise that reads 'Define the relation sum(ListOfIntegers,Sum) which holds if Sum is the sum of the ListOfIntegers, without using any auxiliary predicate' .I came up with this solution:

sum([0|Xs], Sum):-sum(Xs, Sum).
sum([s(X)|Xs], Sum):-sum([X|Xs],s(Sum)).

Which does not work exactly as I would want it to.

?- sum([s(s(0)),s(0),s(s(s(0)))],X).
true ;

I was expecting X to be


I thought that the problem is that I have to 'initialize' Sum to 0 in the first 'iteration' but that would be very procedural and unfortunately I'm not quite apt in prolog to make that work. Any ideas or suggestions?

share|improve this question

3 Answers 3

up vote 2 down vote accepted

The best way to localize the problem is to first simplify your query:

?- sum([0],S).

?- sum([],S).


Even for those, you get as an answer that any S will do. Like

?- sum([],s(s(0))).

Since [] can only be handled by your fact, an error must lie in that very fact. You stated:

sum([], Sum).

Which means that the sum of [] is just anything. You probably meant 0.

Another error hides in the last rule... After fixing the first error, we get

?- sum([0],Sum).
Sum = 0
?- sum([s(0)],Sum).

Here, the last clause is responsible. It reads:

sum([s(X)|Xs], Sum):-sum([X|Xs],s(Sum)).

Recursive rules are relatively tricky to read in Prolog. The simplest way to understand them is to look at the :- and realize that this should be an arrow ← (thus a right-to-left arrow) meaning:

provided, that the goals on the right-hand side are true
we conclude what is found on the left-hand side

So, compared to informal writing, the arrows points into the opposite direction!

For our query, we can consider the following instantiation substituting Xs with [] and X with 0.

sum([s(0)| [] ], Sum) :- sum([0| []],s(Sum)).

So this rule now reads right-to-left: Provided, sum([0],s(Sum)) is true, ... However, we do know that only sum([0],0) holds, but not that goal. Therefore, this rule never applies! What you intended was rather the opposite:

sum([s(X)|Xs], s(Sum)):-sum([X|Xs],Sum).
share|improve this answer
I never thought that I could tackle my problem that way...Thanks! –  kaiseroskilo Mar 14 '12 at 19:04
This is not the first Prolog question that took its inspiration from another language. I guess Erlang has spoiled Prolog programmers recently, or it reflects a certain rule thinking. In Erlang one could do without Peano: sum([]) -> 0; sum([X|Y]) -> X+sum(Y). And the left-right declarative reading is blurred, and the '->' is logically confused. –  j4n bur53 Mar 15 '12 at 0:02
Prolog II did have -> in place of :- this was about 1980. The intention was to underline the rewrite aspect. Erlang is about 1987. –  false Mar 15 '12 at 3:26

Your first clause should read

sum([], 0).

With that change, the vacuous true return goes away and you're left with one problem: the third clause reverses the logic of summation. It should be

sum([s(X)|Xs], s(Sum)) :- sum([X|Xs], Sum).

because the number of s/1 terms in the left argument to sum/2 should be equal to the number of them in the right argument.

share|improve this answer
Excellent! Thank you for your help! –  kaiseroskilo Mar 14 '12 at 18:59

I'm not really following your logic, what with all the seemingle extraneous s(X) structures floating about.

Wouldn't it be easier and simpler to do something like this?

First, define your solution in plain english, thus:

  • The sum of an empty list is 0.
  • The sum of a non-empty list is obtained by adding the head of the list to the sum of the tail of the list.

From that definition, the prolog follows directly:

sum( []     , 0 ) .  % the sum of an empty list is 0.
sum( [X|Xs] , T ) :- % the sum of an non-empty list is obtained by:
  sum( Xs , T1 ) ,   % - first computing the sum of the tail
  T is X + T1        % - and then, adding that the to head of the list
  .                  % Easy!
share|improve this answer
OP is learning Prolog with "The Art of Prolog", still an excellent choice. And there, in the beginning, s(X)-natural numbers are used. –  false Mar 15 '12 at 22:58

Your Answer


By posting your answer, you agree to the privacy policy and terms of service.

Not the answer you're looking for? Browse other questions tagged or ask your own question.