To avoid "out of stack" problems it is often necessary to write the recursive predicates in a "last call optimization" or "tail recursive" form.

Here it seems the two clauses for **nim_sum/3** should be reversed (putting the "fact" clause first, which is the termination condition). Then the call **nim_sum/3** makes to itself in the clause that has a body will be made without any backtrack points open (assuming **binary/2** and **nim_add/3** are deterministic).

Try swapping those two clauses for **nim_sum** and let us know how it works.

**Added:** After thinking further about **nim_add/3**, I'm suspecting that the Prolog engine will probably not detect that it is deterministic, i.e. succeeds in only one way. This is a job for the cut ! operator. The simplest solution is to add one cut right in front of where **nim_sum/3** calls itself, so that there are definitely no backtrack points open at the time the recursive call is made. However this is more "in the spirit" of Prolog:

```
nim_sum([],Sum,Sum).
nim_sum([N|Ns],Bs,Sum):-
binary(N,Ds),
nim_add(Ds,Bs,Bs1),
nim_sum(Ns,Bs1,Sum).
nim_add(Bs,[],Bs) :- !.
nim_add([],Bs,Bs) :- !.
nim_add([B|Bs],[C|Cs],[D|Ds]):-
D is (B+C) mod 2,
nim_add(Bs,Cs,Ds).
```

Again this assumes **binary/2** is deterministic, presumably converting an integer (nonnegative?) into a list of 0's and 1's, least significant bits first.