# generation of positive numbers in a special case

i am searching for a possibility to transform this code

``````zero(0).
positive(X) :- \+ zero(X).
``````

so that calls like

``````?- positive(X).
``````

will generate values for X.

Actually only calls with specific values for X are tested correctly but no values can be generated.

Thanks.

-

You could write virtually straightforward

``````positive(1).
positive(X) :- positive(Y), X is Y + 1.
``````

and this indeed will work

``````?- positive(X).
X = 1 ;
X = 2 ;
X = 3 ;
X = 4 ;
etc
``````

but have in mind, that being not tail-recursive this algorithm is exponentially complex. I mean:

`````` ?- time((positive(X),X>4000)).
% 8,010,001 inferences, 3.70 CPU in 3.73 seconds (99% CPU, 2163038 Lips)
X = 4001.
``````

Note the time for generation of 4000 positives.

But if we right it like:

``````positive1(X) :- from(1,X).

from(From,From).
from(From,X):-From1 is From + 1, from(From1,X).
``````

All works fast now:

`````` ?- time((positive1(X),X>4000)).
% 8,002 inferences, 0.00 CPU in 0.00 seconds (?% CPU, Infinite Lips)
X = 4001.
``````
-
Thanks, this is quiet clear to me. But as mentioned above there seems to be no possibility to generate values for X using the negotation. Right? –  ZermeX Jul 20 '10 at 7:35
Right you are ) –  Xonix Jul 20 '10 at 9:37
I believe your first solution runs in quadratic time rather than exponential. –  larsmans Jul 20 '10 at 9:47
@larsmans Yes, you are right here –  Xonix Jul 20 '10 at 12:29

Your code as posted here won't test anything correctly, except negative numbers, and then only accidentally (even a stopped clock is right twice a day :-) ):

``````positive(X) :- \+ zero(0).
``````

The `\+/1` predicate succeeds if there is no way to satisfy its argument. In other words, it will yield true whenever `zero(0)` can't be satisfied. But `zero(0)` is always satisfied (it's a fact!). So `positive(X)` here will yield false for any X – including 0!

I assume you really meant:

``````positive(X) :- \+ zero(X).
``````

which fails too, but in a more interesting way. Remember that `\+/1` fails if there is any way to satisfy its argument. If you query:

``````?- positive(1).
``````

it will bind X to 1, and see if it's possible to satisfy `zero(X)` with the constraint that X must be 1. It's not, so `positive(1)` will yield true.

However, if you query:

``````?- positive(X).
``````

you're asking if it's possible to satisfy `zero(X)` with no constraints on X. It is possible to do this by binding X to 0, which means `zero(X)` can be satisfied for some X – which will cause `\+ zero(X)` to yield false.

A closer step is to try:

``````positive(X) :- X > 0.
``````

which takes negative numbers into account as well. This will give the right answer for `positive(1)`, `positive(0)`, and `positive(-1)`. However, it won't generate numbers. If you try this:

``````?- positive(X).
``````

you'll get:

``````ERROR: >/2: Arguments are not sufficiently instantiated
``````

because you haven't said enough about what X is for the `>/2` predicate to take effect – arithmetic operators cannot be invoked on uninstantiated objects (aka free variables, aka what X is in this case). This in general is going to be a problem with your "generate some integers" approach.

You can, however, specify a particular numeric range that you want to take values from, and have Prolog proceed from there:

``````positive(X) :- X > 0.
genPositive(X) :- between(-100, 100, X), positive(X).
``````
-
Thanks, i really meant: positive(X) :- \+ zero(X). But there seems to be no possibility to generate values for X using the negotation. Right? –  ZermeX Jul 20 '10 at 7:34
That's right, it won't work that way. –  Owen S. Jul 20 '10 at 15:36