Title :
Finite algebraic models for residuated logic
Author_Institution :
Dept. of Math. & Comput. Sci., St. Francis Xavier Univ., Antigonish, NS, Canada
Abstract :
Using finite models to direct the search of an automated theorem prover (through the strategy known as model pruning) can significantly improve the efficiency of theorem provers, which, for nonclassical logics, often suffer from combinatorial explosions. Finding models of size n>4 is itself a difficult problem, as the number of possibilities to check rapidly becomes enormous as n increases. The paper is intended as a tutorial style introduction to algebraic semantics and the problems of finding finite models. We describe an algorithm we have developed to find the finite algebraic models for residuated logic, and present results of the search (for up to n=7); we present some structure theorems for residuated algebras; finally, we discuss the strategy we are working on to find models for n>7
Keywords :
inference mechanisms; multivalued logic; search problems; theorem proving; algebraic semantics; approximate reasoning; automated theorem prover; combinatorial explosions; finite algebraic models; model pruning; nonclassical logics; residuated algebras; residuated logic; structure theorems; substructural logics; Algebra; Artificial intelligence; Computer science; Councils; Electronic mail; Explosions; Logic functions; Logic programming; Mathematical model; Mathematics;
Conference_Titel :
Multiple-Valued Logic, 1995. Proceedings., 25th International Symposium on
Conference_Location :
Bloomington, IN
Print_ISBN :
0-8186-7118-1
DOI :
10.1109/ISMVL.1995.513533
