# Sum of a list in prolog

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([],Sum).
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 ;
false.
``````

I was expecting X to be

``````s(s(s(s(s(s(0))))))
``````

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?

-

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

``````?- sum([0],S).

true
?- sum([],S).

true
``````

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

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

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).
no
``````

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).
``````
-
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

``````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.

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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!
``````
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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