# Predicate to declare descending/ascending coordinates using finite domains

I'd like to write a predicate, descendo, which declares that the first given coordinate [y, x] is descending to the second given coordinate (imagine the board with [0, 0] at the left upper corner).

A very simple implementation in Prolog could look like this:

``````descending(B, A) :-
B = [B1,B2],
A = [A1,A2],
B1 is A1 + 1,
B2 is A2 + 1.
``````

I fail to implement this in core.logic though. I've tried a lot of different things already (==/=fd/conso/appendo and +fd/+). One of the things I tried:

``````(defn descendo
[b a]
(l/fresh [b1 b2 a1 a2]
(l/== b [b1 b2])
(l/== a [a1 a2])
(l/+fd b1 1 a1)
(l/+fd b2 1 a2)))
``````

Most of them just return nothing when running them like this:

``````(l/run* [q]
(l/fresh [a]
(l/infd a (l/domain [0 0] [1 0] [0 1] [1 1]))
(descendo a [0 0])
(l/== q a)))

=> () ; expected output: ([1 1])
``````

I have the feeling that thinking too much in Prolog is not good when using core.logic...any hint appreciated. Thanks in advance.

EDIT: Found a workaround, where descendo stays the same, but when running it we don't use a domain:

``````(l/run* [q]
(l/fresh [a]
(l/membero a [[0 0] [1 0] [0 1] [1 1]])
(l/membero q [[0 0] [1 0] [0 1] [1 1]])
(descendo a q)))

=> ([1 1])
``````

I'm not sure whether `domain` is meant to be used on vectors anyway, so this might not be a workaround but the actual solution.

• FD in core.logic are for natural numbers only and not for vectors etc Commented Nov 6, 2012 at 13:53
• please post your solution as a solution :-) Commented Feb 7, 2013 at 15:56

``````(l/run* [q]