Title :
Proof procedure and answer extraction in Petri net model of logic programs
Author :
Peterka, George ; Murata, Tadao
Author_Institution :
Dept. of Electr. Eng. & Comput. Sci., Illinois Univ., Chicago, IL, USA
fDate :
2/1/1989 12:00:00 AM
Abstract :
A proof procedure and answer extraction in a high-level Petri net model of logic programs is discussed. The logic programs are restricted to the Horn clause subset of first-order predicate logic and finite problems. The logic program is modeled by a high-level Petri net and the execution of the logic program or the answer extraction process in predicate calculus corresponds to a firing sequence which fires the goal transition in the net. For the class of the programs described above, the goal transition is potentially firable if an only if there exists a nonnegative T-invariant which includes the goal transition in its support. This is the main result proved. Three examples are given to illustrate in detail the above results
Keywords :
Petri nets; logic programming; programming theory; theorem proving; Horn clause subset; Petri net model; answer extraction; firing sequence; first-order predicate logic; goal transition; logic programs; proof procedure; Artificial intelligence; Automatic logic units; Calculus; Computer science; Fires; Helium; Logic programming; Petri nets; Sufficient conditions; Terminology;
Journal_Title :
Software Engineering, IEEE Transactions on
