Model Generation Theorem Proving with Finite Interval Constraints
Artikel i vetenskaplig tidskrift, 2003

Model Generation Theorem Proving (MGTP) is a class of deduction procedures for first-order logic that were successfully used to solve hard combinatorial problems. For some applications the representation of models in MGTP and its extension CMGTP causes redundancy. Here we suggest to extend members of model candidates in such a way that a predicate p can have not only terms as arguments, but at certain places also subsets of totally ordered finite domains. The ensuing language and deduction system relies on constraints based on finite intervals in totally ordered sets and is called IV-MGTP. We show soundness/completeness of the procedure, and the experimental results that show considerable potential of the method.

Författare

Reiner Hähnle

Chalmers, Institutionen för datavetenskap

R. Hasegawa

Y. Shirai

Information Processing Society of Japan

0387-5806 (ISSN)

Vol. 43 12 4059-4067

Ämneskategorier

Data- och informationsvetenskap