(@twinterer already gave an explanation, my answer tries to take it from a different angle)
When you enter a query to Prolog what you get back is an answer. Often an answer contains a solution, sometimes it contains several solutions and sometimes it does not contain any solution at all. Quite often these two notions are confused. Let's look at examples with GNU Prolog:
| ?- length(Vs,3), fd_domain_bool(Vs).
Vs = [_#0(0..1),_#19(0..1),_#38(0..1)]
yes
Here, we have an answer that contains 8 solutions. That is:
| ?- length(Vs,3), fd_domain_bool(Vs), fd_labeling(Vs).
Vs = [0,0,0] ? ;
Vs = [0,0,1] ? ;
...
Vs = [1,1,1]
yes
And now another query. That is the example @twinterer referred to.
| ?- length(Vs,3), fd_domain_bool(Vs), fd_all_different(Vs).
Vs = [_#0(0..1),_#19(0..1),_#38(0..1)]
yes
The answer looks the same as before. However, it does no longer contain a solution.
| ?- length(Vs,3), fd_domain_bool(Vs), fd_all_different(Vs), fd_labeling(Vs).
no
Ideally in such a case, the toplevel would not say "yes" but "maybe". In fact, CLP(R), one of the very first constraint systems, did this.
Another way to make this a little bit less mysterious is to show the actual constraints involved. SWI does this:
?- length(Vs,3), Vs ins 0..1, all_different(Vs).
Vs = [_G565,_G568,_G571],
_G565 in 0..1,
all_different([_G565,_G568,_G571]),
_G568 in 0..1,
_G571 in 0..1.
?- length(Vs,3), Vs ins 0..1, all_different(Vs), labeling([], Vs).
false.
So SWI shows you all constraints that have to be satisfied to get a concrete solution. Read SWI's answer as: Yes, there is a solution, provided all this fine print is true!
Alas, the fine print is false.
And yet another way to solve this problem is to get an implementation of all_different/1
with stronger consistency. But this only works in specific cases.
?- length(Vs,3), Vs ins 0..1, all_distinct(Vs).
false.
In the general case you cannot expect a system to maintain global consistency. Reasons:
Maintaining consistency can be very expensive. It is often better to delegate such decisions to labeling. In fact, the simple all_different/1
is often faster than all_distinct/1
.
Better consistency algorithms are often very complex.
In the general case, maintaining global consistency is an undecidable problem.