Title :
Embedding-Based Methods for Trilattice Logic
Author_Institution :
Fac. of Inf. Technol. & Bus., Cyber Univ., Tokyo, Japan
Abstract :
Shramko-Wansing´s trilattice logics are sixteen-valued logics based on the algebraic structures of trilattices that can suitably represent generalized truth values. In this paper, an alternative new proof of the cut-elimination and completeness theorems for such a trilattice logic is obtained using two embedding theorems. Moreover, the Craig interpolation and Maksimova separation theorems for this logic are proved using the same embedding theorems. The results on Craig interpolation and Maksimova separation are new results of this paper.
Keywords :
interpolation; lattice theory; multivalued logic; Craig interpolation; Maksimova separation theorem; Shramko-Wansing trilattice logic; completeness theorem; cut-elimination; embedding theorems; embedding-based method; sixteen-valued logic; trilattice algebraic structures; Calculus; Cost accounting; Educational institutions; Information technology; Interpolation; Semantics; Craig interpolation theorem; Maksimova principle; completeness theorem; sixteen-valued logic; trilattice logic;
Conference_Titel :
Multiple-Valued Logic (ISMVL), 2013 IEEE 43rd International Symposium on
Conference_Location :
Toyama
Print_ISBN :
978-1-4673-6067-8
Electronic_ISBN :
0195-623X
DOI :
10.1109/ISMVL.2013.25
