Tabling as defined above has a serious limitation. Although the definition of connection/2 from section section 7.2 can compute the transitive closure of connected cities, it cannot provide you with a route to travel. The reason is that there are infinitely many routes if there are cycles in the network and each new route found will be added to the answer table and cause the tabled execution's completion algorithm to search for more routes, eventually running out of memory.
The solution to this problem is called mode directed tabling
or
answer subsumption.188The
term answer subsumption is used by XSB and mode directed
tabling by YAP and B-Prolog. The idea is that some arguments are
considered‘outputs’, where multiple values for the same‘input’are
combined. Possibly answer aggregation would have been a better
name. In this execution model one or more arguments are not
added to the table. Instead, we remember a single aggregated
value for these arguments. The example below is derived from
section 7.2
and returns the connection as a list of cities. This argument is defined
as a moded argument using the
lattice(PI)
mode.189This
mode is compatible to XSB Prolog. This causes the tabling
engine each time that it finds an new path to call shortest/3 and keep
the shortest route.
:- table connection(_,_,lattice(shortest/3)). shortest(P1, P2, P):- length(P1, L1), length(P2, L2), ( L1 < L2 -> P = P1 ; P = P2 ). connection(X, Y, [X,Y]) :- connection(X, Y). connection(X, Y, P) :- connection(X, Z, P0), connection(Z, Y), append(P0, [Y], P).
The mode declaration scheme is equivalent to XSB with partial
compatibility support for YAP and B-Prolog. The lattice(PI)
mode is the most general mode. The YAP all
(B-Prolog @
)
mode is not yet supported. The list below describes the supported modes
and indicates the portability.
+
index
(YAP) or a +
(B-Prolog, YAP) declare that the argument is tabled normally.Name(_,_,_)
. On each
answer, PI is called with three arguments: the current
aggregated answer and the new answer are inputs. The last argument must
be unified with a term that represents the new aggregated answer.call(PI, +Old, +Answer)
succeeds. For example, po('<'/2)
accumulates the smallest result. In SWI-Prolog the arity (2) may be
omitted, resulting in po(<)
.-
-
(B-Prolog, YAP) and first
(YAP) declare to keep the first answer for this argument.last
(YAP) declares to keep the last answer.min
(YAP) declares to keep the smallest answer
according to the standard order of terms (see @</2).
Note that in SWI-Prolog the standard order of terms orders numbers by
value.max
(YAP) declares to keep the largest answer
according to the standard order of terms (see @>/2).
Note that in SWI-Prolog the standard order of terms orders numbers by
value.sum
(YAP) declares to sum numeric answers.